The manuscript is a large plain tex file, about 1.4 megabytes. When
"tex-ed" it produces about 35 postscript files and a dvi file; the
dvi file can then be printed in the usual way on a postscript printer.

BODY
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% Jamie Stephens, jamies@math.utexas.edu, 28 Nov 94

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%%Title: (/d1/grad/strauss/Penrose6.ai)
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%%Title: (Packed Array Operators)
%%Version: 2.0
%%CreationDate: (8/2/90) ()
%%Copyright: ((C) 1987-1990 Adobe Systems Incorporated All Rights Reserved)
userdict /Adobe_packedarray 5 dict dup begin put
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{
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Adobe_packedarray
{
dup xcheck
{
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userdict 3 1 roll put
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/terminate % - terminate -
{
} def
/packedarray % arguments count packedarray array
{
array astore readonly
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/setpacking % boolean setpacking -
{
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/currentpacking % - setpacking boolean
{
false
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currentdict readonly pop end
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Adobe_packedarray /initialize get exec
%%BeginResource: procset Adobe_cmykcolor 1.1 0
%%Title: (CMYK Color Operators)
%%Version: 1.1
%%CreationDate: (1/23/89) ()
%%Copyright: ((C) 1987-1990 Adobe Systems Incorporated All Rights Reserved)
currentpacking true setpacking
userdict /Adobe_cmykcolor 4 dict dup begin put
/initialize % - initialize -
{
/setcmykcolor where
{
pop
}
{
userdict /Adobe_cmykcolor_vars 2 dict dup begin put
/_setrgbcolor
/setrgbcolor load def
/_currentrgbcolor
/currentrgbcolor load def
Adobe_cmykcolor begin
Adobe_cmykcolor
{
dup xcheck
{
bind
} if
pop pop
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end
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Adobe_cmykcolor begin
} ifelse
} def
/terminate % - terminate -
{
currentdict Adobe_cmykcolor eq
{
end
} if
} def
/setcmykcolor % cyan magenta yellow black setcmykcolor -
{
1 sub 4 1 roll
3
{
3 index add neg dup 0 lt
{
pop 0
} if
3 1 roll
} repeat
Adobe_cmykcolor_vars /_setrgbcolor get exec
pop
} def
/currentcmykcolor % - currentcmykcolor cyan magenta yellow black
{
Adobe_cmykcolor_vars /_currentrgbcolor get exec
3
{
1 sub neg 3 1 roll
} repeat
0
} def
currentdict readonly pop end
setpacking
%%EndResource
%%BeginResource: procset Adobe_cshow 1.1 0
%%Title: (cshow Operator)
%%Version: 1.1
%%CreationDate: (1/23/89) ()
%%Copyright: ((C) 1987-1990 Adobe Systems Incorporated All Rights Reserved)
currentpacking true setpacking
userdict /Adobe_cshow 3 dict dup begin put
/initialize % - initialize -
{
/cshow where
{
pop
}
{
userdict /Adobe_cshow_vars 1 dict dup begin put
/_cshow % - _cshow proc
{} def
Adobe_cshow begin
Adobe_cshow
{
dup xcheck
{
bind
} if
userdict 3 1 roll put
} forall
end
end
} ifelse
} def
/terminate % - terminate -
{
} def
/cshow % proc string cshow -
{
exch
Adobe_cshow_vars
exch /_cshow
exch put
{
0 0 Adobe_cshow_vars /_cshow get exec
} forall
} def
currentdict readonly pop end
setpacking
%%EndResource
%%BeginResource: procset Adobe_customcolor 1.0 0
%%Title: (Custom Color Operators)
%%Version: 1.0
%%CreationDate: (5/9/88) ()
%%Copyright: ((C) 1987-1990 Adobe Systems Incorporated All Rights Reserved)
currentpacking true setpacking
userdict /Adobe_customcolor 5 dict dup begin put
/initialize % - initialize -
{
/setcustomcolor where
{
pop
}
{
Adobe_customcolor begin
Adobe_customcolor
{
dup xcheck
{
bind
} if
pop pop
} forall
end
Adobe_customcolor begin
} ifelse
} def
/terminate % - terminate -
{
currentdict Adobe_customcolor eq
{
end
} if
} def
/findcmykcustomcolor % cyan magenta yellow black name findcmykcustomcolor object
{
5 packedarray
}  def
/setcustomcolor % object tint setcustomcolor -
{
exch
aload pop pop
4
{
4 index mul 4 1 roll
} repeat
5 -1 roll pop
setcmykcolor
} def
/setoverprint % boolean setoverprint -
{
pop
} def
currentdict readonly pop end
setpacking
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%%Title: (Adobe Illustrator (R) Version 3.0 Abbreviated Prolog)
%%Version: 1.0
%%CreationDate: (7/22/89) ()
%%Copyright: ((C) 1987-1990 Adobe Systems Incorporated All Rights Reserved)
currentpacking true setpacking
userdict /Adobe_IllustratorA_AI3 61 dict dup begin put
% initialization
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% 47 vars, but leave slack of 10 entries for custom Postscript fragments
userdict /Adobe_IllustratorA_AI3_vars 57 dict dup begin put
% paint operands
/_lp /none def
/_pf {} def
/_ps {} def
/_psf {} def
/_pss {} def
/_pjsf {} def
/_pjss {} def
/_pola 0 def
/_doClip 0 def
% paint operators
/cf currentflat def % - cf flatness
% typography operands
/_tm matrix def
/_renderStart [/e0 /r0 /a0 /o0 /e1 /r1 /a1 /i0] def
/_renderEnd [null null null null /i1 /i1 /i1 /i1] def
/_render -1 def
/_rise 0 def
/_ax 0 def % x character spacing (_ax, _ay, _cx, _cy follows awidthshow naming convention)
/_ay 0 def % y character spacing
/_cx 0 def % x word spacing
/_cy 0 def % y word spacing
/_leading [0 0] def
/_ctm matrix def
/_mtx matrix def
/_sp 16#020 def
/_hyphen (-) def
/_fScl 0 def
/_cnt 0 def
/_hs 1 def
/_nativeEncoding 0 def
/_useNativeEncoding 0 def
/_tempEncode 0 def
/_pntr 0 def
/_tDict 2 dict def
% typography operators
/Tx {} def
/Tj {} def
% compound path operators
/CRender {} def
% printing
/_AI3_savepage {} def
% color operands
/_gf null def
/_cf 4 array def
/_if null def
/_of false def
/_fc {} def
/_gs null def
/_cs 4 array def
/_is null def
/_os false def
/_sc {} def
/_i null def
Adobe_IllustratorA_AI3 begin
Adobe_IllustratorA_AI3
{
dup xcheck
{
bind
} if
pop pop
} forall
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end
Adobe_IllustratorA_AI3 begin
Adobe_IllustratorA_AI3_vars begin
newpath
} def
/terminate % - terminate -
{
end
end
} def
% definition operators
/_ % - _ null
null def
/ddef % key value ddef -
{
Adobe_IllustratorA_AI3_vars 3 1 roll put
} def
/xput % key value literal xput -
{
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/npop % integer npop -
{
{
pop
} repeat
} def
% marking operators
/sw % ax ay string sw x y
{
dup length exch stringwidth
exch 5 -1 roll 3 index 1 sub mul add
4 1 roll 3 1 roll 1 sub mul add
} def
/swj % cx cy fillchar ax ay string swj x y
{
dup 4 1 roll
dup length exch stringwidth
exch 5 -1 roll 3 index 1 sub mul add
4 1 roll 3 1 roll 1 sub mul add
6 2 roll /_cnt 0 ddef
{1 index eq {/_cnt _cnt 1 add ddef} if} forall pop
exch _cnt mul exch _cnt mul 2 index add 4 1 roll 2 index add 4 1 roll pop pop
} def
/ss % ax ay string matrix ss -
{
4 1 roll
{ % matrix ax ay char 0 0 {proc} -
2 npop
(0) exch 2 copy 0 exch put pop
gsave
false charpath currentpoint
4 index setmatrix
stroke
grestore
moveto
2 copy rmoveto
} exch cshow
3 npop
} def
/jss % cx cy fillchar ax ay string matrix jss -
{
4 1 roll
{ % cx cy fillchar matrix ax ay char 0 0 {proc} -
2 npop
(0) exch 2 copy 0 exch put
gsave
_sp eq
{
exch 6 index 6 index 6 index 5 -1 roll widthshow
currentpoint
}
{
false charpath currentpoint
4 index setmatrix stroke
}ifelse
grestore
moveto
2 copy rmoveto
} exch cshow
6 npop
} def
% path operators
/sp % ax ay string sp -
{
{
2 npop (0) exch
2 copy 0 exch put pop
false charpath
2 copy rmoveto
} exch cshow
2 npop
} def
/jsp % cx cy fillchar ax ay string jsp -
{
{ % cx cy fillchar ax ay char 0 0 {proc} -
2 npop
(0) exch 2 copy 0 exch put
_sp eq
{
exch 5 index 5 index 5 index 5 -1 roll widthshow
}
{
false charpath
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2 copy rmoveto
} exch cshow
5 npop
} def
% path construction operators
/pl % x y pl x y
{
transform
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itransform
} def
/setstrokeadjust where
{
pop true setstrokeadjust
/c % x1 y1 x2 y2 x3 y3 c -
{
curveto
} def
/C
/c load def
/v % x2 y2 x3 y3 v -
{
currentpoint 6 2 roll curveto
} def
/V
/v load def
/y % x1 y1 x2 y2 y -
{
2 copy curveto
} def
/Y
/y load def
/l % x y l -
{
lineto
} def
/L
/l load def
/m % x y m -
{
moveto
} def
}
{%else
/c
{
pl curveto
} def
/C
/c load def
/v
{
currentpoint 6 2 roll pl curveto
} def
/V
/v load def
/y
{
pl 2 copy curveto
} def
/Y
/y load def
/l
{
pl lineto
} def
/L
/l load def
/m
{
pl moveto
} def
}ifelse
% graphic state operators
/d % array phase d -
{
setdash
} def
/cf {} def % - cf flatness
/i % flatness i -
{
dup 0 eq
{
pop cf
} if
setflat
} def
/j % linejoin j -
{
setlinejoin
} def
/J % linecap J -
{
setlinecap
} def
/M % miterlimit M -
{
setmiterlimit
} def
/w % linewidth w -
{
setlinewidth
} def
% path painting operators
/H % - H -
{} def
/h % - h -
{
closepath
} def
/N % - N -
{
_pola 0 eq
{
_doClip 1 eq {clip /_doClip 0 ddef} if
newpath
}
{
/CRender {N} ddef
}ifelse
} def
/n % - n -
{N} def
/F % - F -
{
_pola 0 eq
{
_doClip 1 eq
{
gsave _pf grestore clip newpath /_lp /none ddef _fc
/_doClip 0 ddef
}
{
_pf
}ifelse
}
{
/CRender {F} ddef
}ifelse
} def
/f % - f -
{
closepath
F
} def
/S % - S -
{
_pola 0 eq
{
_doClip 1 eq
{
gsave _ps grestore clip newpath /_lp /none ddef _sc
/_doClip 0 ddef
}
{
_ps
}ifelse
}
{
/CRender {S} ddef
}ifelse
} def
/s % - s -
{
closepath
S
} def
/B % - B -
{
_pola 0 eq
{
_doClip 1 eq  % F clears _doClip
gsave F grestore
{
gsave S grestore clip newpath /_lp /none ddef _sc
/_doClip 0 ddef
}
{
S
}ifelse
}
{
/CRender {B} ddef
}ifelse
} def
/b % - b -
{
closepath
B
} def
/W % - W -
{
/_doClip 1 ddef
} def
/* % - [string] * -
{
count 0 ne
{
dup type (stringtype) eq {pop} if
} if
_pola 0 eq {newpath} if
} def
% group operators
/u % - u -
{} def
/U % - U -
{} def
/q % - q -
{
_pola 0 eq {gsave} if
} def
/Q % - Q -
{
_pola 0 eq {grestore} if
} def
/*u % - *u -
{
_pola 1 add /_pola exch ddef
} def
/*U % - *U -
{
_pola 1 sub /_pola exch ddef
_pola 0 eq {CRender} if
} def
/D % polarized D -
{pop} def
/*w % - *w -
{} def
/*W % - *W -
{} def
% place operators
/` % matrix llx lly urx ury string ` -
{
/_i save ddef
6 1 roll 4 npop
concat
userdict begin
/showpage {} def
false setoverprint
pop
} def
/~ % - ~ -
{
end
_i restore
} def
% color operators
/O % flag O -
{
0 ne
/_of exch ddef
/_lp /none ddef
} def
/R % flag R -
{
0 ne
/_os exch ddef
/_lp /none ddef
} def
/g % gray g -
{
/_gf exch ddef
/_fc
{
_lp /fill ne
{
_of setoverprint
_gf setgray
/_lp /fill ddef
} if
} ddef
/_pf
{
_fc
fill
} ddef
/_psf
{
_fc
ashow
} ddef
/_pjsf
{
_fc
awidthshow
} ddef
/_lp /none ddef
} def
/G % gray G -
{
/_gs exch ddef
/_sc
{
_lp /stroke ne
{
_os setoverprint
_gs setgray
/_lp /stroke ddef
} if
} ddef
/_ps
{
_sc
stroke
} ddef
/_pss
{
_sc
ss
} ddef
/_pjss
{
_sc
jss
} ddef
/_lp /none ddef
} def
/k % cyan magenta yellow black k -
{
_cf astore pop
/_fc
{
_lp /fill ne
{
_of setoverprint
_cf aload pop setcmykcolor
/_lp /fill ddef
} if
} ddef
/_pf
{
_fc
fill
} ddef
/_psf
{
_fc
ashow
} ddef
/_pjsf
{
_fc
awidthshow
} ddef
/_lp /none ddef
} def
/K % cyan magenta yellow black K -
{
_cs astore pop
/_sc
{
_lp /stroke ne
{
_os setoverprint
_cs aload pop setcmykcolor
/_lp /stroke ddef
} if
} ddef
/_ps
{
_sc
stroke
} ddef
/_pss
{
_sc
ss
} ddef
/_pjss
{
_sc
jss
} ddef
/_lp /none ddef
} def
/x % cyan magenta yellow black name gray x -
{
/_gf exch ddef
findcmykcustomcolor
/_if exch ddef
/_fc
{
_lp /fill ne
{
_of setoverprint
_if _gf 1 exch sub setcustomcolor
/_lp /fill ddef
} if
} ddef
/_pf
{
_fc
fill
} ddef
/_psf
{
_fc
ashow
} ddef
/_pjsf
{
_fc
awidthshow
} ddef
/_lp /none ddef
} def
/X % cyan magenta yellow black name gray X -
{
/_gs exch ddef
findcmykcustomcolor
/_is exch ddef
/_sc
{
_lp /stroke ne
{
_os setoverprint
_is _gs 1 exch sub setcustomcolor
/_lp /stroke ddef
} if
} ddef
/_ps
{
_sc
stroke
} ddef
/_pss
{
_sc
ss
} ddef
/_pjss
{
_sc
jss
} ddef
/_lp /none ddef
} def
% locked object operator
/A % value A -
{
pop
} def
currentdict readonly pop end
setpacking
% annotate page operator
/annotatepage
{
} def
%%EndResource
%AI3-Grid.0 18 18 3 0 0 0 3
%%EndProlog
%%BeginSetup
Adobe_cmykcolor /initialize get exec
Adobe_cshow /initialize get exec
Adobe_customcolor /initialize get exec
Adobe_IllustratorA_AI3 /initialize get exec
%%EndSetup
0 A
u
u
u
u
0 R
0 G
0 i 0 J 0 j 1 w 4 M []0 d
%AI3_Note:
0 D
103.8711 412.8662 m
134.8572 390.3529 L
103.8706 367.8406 L
111.1857 390.3537 L
103.8706 412.8666 L
103.8711 412.8662 L
s
U
u
65.5686 367.8405 m
34.5839 390.3542 L
22.7471 353.9286 L
46.4184 353.9279 L
65.5689 367.8411 L
65.5686 367.8405 L
s
U
u
84.7177 308.9012 m
115.7044 331.4135 L
84.7182 353.9268 L
77.4031 331.4137 L
84.7181 308.9008 L
84.7177 308.9012 L
s
U
u
84.7197 353.9272 m
115.7044 331.4135 L
127.5412 367.8391 L
103.8699 367.8398 L
84.7194 353.9266 L
84.7197 353.9272 L
s
U
u
46.4183 353.9272 m
84.7197 353.9272 L
72.8838 390.3536 L
65.5686 367.8405 L
46.4178 353.9271 L
46.4183 353.9272 L
s
U
u
111.1856 390.3527 m
72.8849 390.3538 L
84.7197 353.9272 L
103.8706 367.8406 L
111.1855 390.3533 L
111.1856 390.3527 L
s
U
u
84.7197 353.9272 m
46.4189 353.9283 L
58.2537 317.5017 L
77.4046 331.4151 L
84.7196 353.9278 L
84.7197 353.9272 L
s
U
u
103.8685 294.9884 m
65.5678 294.9895 L
77.4046 331.4151 L
84.7189 308.9021 L
103.8691 294.9883 L
103.8685 294.9884 L
s
U
U
u
s
U
U
u
u
u
1 w
127.5397 367.8398 m
115.7026 331.4149 L
154.0028 331.4132 L
146.6889 353.926 L
127.5391 367.8399 L
127.5397 367.8398 L
s
U
u
103.8682 367.8407 m
134.8548 390.3523 L
146.6889 353.926 L
127.5388 367.8401 L
103.8677 367.8404 L
103.8682 367.8407 L
s
U
u
158.5257 390.3513 m
196.8266 390.3507 L
184.9913 426.7769 L
177.676 404.2642 L
158.5251 390.3512 L
158.5257 390.3513 L
s
U
u
134.8548 390.3523 m
146.6889 353.926 L
177.6755 376.4375 L
158.5253 390.3517 L
134.8543 390.352 L
134.8548 390.3523 L
s
U
u
177.6759 404.2634 m
146.692 426.7772 L
134.8548 390.3523 L
158.5257 390.3513 L
177.6762 404.264 L
177.6759 404.2634 L
s
U
U
u
s
U
U
u
u
u
1 w
77.4019 258.5626 m
65.5666 294.989 L
103.8672 294.9884 L
84.7166 281.0748 L
77.402 258.562 L
77.4019 258.5626 L
s
U
u
134.8538 272.4756 m
146.6877 236.0498 L
177.6739 258.561 L
158.524 272.475 L
134.8533 272.4753 L
134.8538 272.4756 L
s
U
u
154.0052 331.4132 m
115.7046 331.4138 L
127.5398 294.9875 L
146.6905 308.9011 L
154.0051 331.4139 L
154.0052 331.4132 L
s
U
u
127.5384 294.9881 m
115.7046 331.4138 L
84.7184 308.9027 L
103.8683 294.9887 L
127.539 294.9883 L
127.5384 294.9881 L
s
U
u
158.5245 272.4755 m
127.5384 294.9881 L
115.7032 258.5619 L
134.8538 272.4756 L
158.525 272.4752 L
158.5245 272.4755 L
s
U
u
84.7173 281.0756 m
115.7022 258.5624 L
127.5384 294.9881 L
103.8672 294.9884 L
84.717 281.0751 L
84.7173 281.0756 L
s
U
u
127.5384 294.9881 m
158.5234 272.4749 L
170.3596 308.9005 L
146.6884 308.9009 L
127.5382 294.9875 L
127.5384 294.9881 L
s
U
u
146.6896 353.9252 m
177.6745 331.4121 L
146.6884 308.9009 L
154.0037 331.4133 L
146.6892 353.9256 L
146.6896 353.9252 L
s
U
U
u
s
U
U
u
u
u
1 w
77.4017 213.5386 m
84.7163 191.0258 L
S
U
u
108.388 236.0515 m
146.6877 236.0498 L
134.8538 272.4755 L
115.7032 258.5628 L
108.3881 236.0509 L
108.388 236.0515 L
s
U
u
58.2536 272.4783 m
46.4173 236.0527 L
84.7179 236.0521 L
77.4033 258.565 L
58.2529 272.4785 L
58.2536 272.4783 L
s
U
u
84.7169 236.051 m
46.4173 236.0527 L
58.2512 199.6269 L
77.4017 213.5397 L
84.7168 236.0516 L
84.7169 236.051 L
s
U
u
115.7028 258.5634 m
84.7169 236.051 L
115.7027 213.5386 L
108.388 236.0515 L
115.7033 258.5638 L
115.7028 258.5634 L
s
U
u
84.7157 191.0267 m
115.7019 213.5378 L
84.7169 236.051 L
77.4017 213.5386 L
84.7162 191.0263 L
84.7157 191.0267 L
s
U
u
84.7169 236.051 m
115.7031 258.5622 L
84.7181 281.0753 L
77.4029 258.5629 L
84.7174 236.0506 L
84.7169 236.051 L
s
U
u
34.5829 272.4776 m
65.569 294.9887 L
77.4029 258.5629 L
58.253 272.4769 L
34.5823 272.4772 L
34.5829 272.4776 L
s
U
U
u
S
U
U
u
u
u
1 w
34.5837 317.4952 m
65.5698 294.9819 L
34.5832 272.4696 L
41.8983 294.9827 L
34.5832 317.4956 L
34.5837 317.4952 L
s
U
u
15.4303 213.5302 m
46.417 236.0425 L
15.4308 258.5558 L
8.1157 236.0427 L
15.4307 213.5298 L
15.4303 213.5302 L
s
U
u
15.4323 258.5561 m
46.417 236.0425 L
58.2538 272.468 L
34.5825 272.4687 L
15.432 258.5556 L
15.4323 258.5561 L
s
U
u
-22.8691 258.5561 m
15.4323 258.5561 L
3.5963 294.9826 L
-3.7188 272.4695 L
-22.8697 258.5561 L
-22.8691 258.5561 L
s
U
u
41.8982 294.9817 m
3.5975 294.9828 L
15.4323 258.5561 L
34.5832 272.4696 L
41.8981 294.9822 L
41.8982 294.9817 L
s
U
u
15.4323 258.5561 m
-22.8685 258.5573 L
-11.0337 222.1306 L
8.1172 236.0441 L
15.4322 258.5567 L
15.4323 258.5561 L
s
U
u
34.5811 199.6174 m
-3.7196 199.6185 L
8.1172 236.0441 L
15.4315 213.5311 L
34.5817 199.6173 L
34.5811 199.6174 L
s
U
U
u
s
U
U
u
u
u
1 w
-3.7193 317.4988 m
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-3.7211 272.4744 L
3.5944 294.9867 L
-3.7198 317.4992 L
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s
U
u
-22.8695 331.4133 m
15.4312 331.4122 L
3.5944 294.9867 L
-3.7199 317.4996 L
-22.8701 331.4134 L
-22.8695 331.4133 L
s
U
u
34.5809 317.498 m
65.5667 294.985 L
77.4025 331.4111 L
58.2516 317.4977 L
34.5804 317.4983 L
34.5809 317.498 L
s
U
u
15.4312 331.4122 m
3.5944 294.9867 L
41.8952 294.9856 L
34.5808 317.4986 L
15.4306 331.4123 L
15.4312 331.4122 L
s
U
u
58.2511 317.4971 m
46.4177 353.9231 L
15.4312 331.4122 L
34.5809 317.498 L
58.2517 317.4974 L
58.2511 317.4971 L
s
U
U
u
s
U
U
u
u
u
1 w
3.5987 367.8332 m
15.4341 331.4065 L
-22.867 331.4071 L
-3.7161 345.3209 L
3.5985 367.8338 L
3.5987 367.8332 L
s
U
U
u
S
U
U
u
u
u
1 w
58.2529 199.6267 m
46.4195 236.0527 L
15.433 213.5419 L
34.5827 199.6276 L
58.2535 199.627 L
58.2529 199.6267 L
s
U
u
34.5827 199.6276 m
58.2539 199.627 L
77.4044 213.5401 L
77.4042 213.5396 L
S
U
u
34.5827 199.6276 m
S
U
U
u
S
U
U
U
u
u
u
u
u
1 w
34.5812 463.2072 m
65.5678 485.7195 L
77.4026 449.2929 L
58.252 463.207 L
34.5807 463.2069 L
34.5812 463.2072 L
s
U
u
65.5666 412.8658 m
34.5801 390.355 L
65.5648 367.8414 L
72.8804 390.3537 L
65.5662 412.8662 L
65.5666 412.8658 L
s
U
u
127.5383 412.8641 m
115.7035 449.2907 L
84.7168 426.7784 L
103.8674 412.8643 L
127.5388 412.8643 L
127.5383 412.8641 L
s
U
u
84.717 426.7799 m
115.7035 449.2907 L
84.7188 471.8044 L
77.4032 449.292 L
84.7174 426.7795 L
84.717 426.7799 L
s
U
u
72.881 390.3534 m
84.717 426.7799 L
46.416 426.7799 L
65.5666 412.8658 L
72.8809 390.3528 L
72.881 390.3534 L
s
U
u
58.253 463.2066 m
46.4162 426.781 L
84.717 426.7799 L
77.4026 449.2929 L
58.2524 463.2067 L
58.253 463.2066 L
s
U
u
84.717 426.7799 m
72.8802 390.3543 L
111.1809 390.3532 L
103.8666 412.8662 L
84.7164 426.78 L
84.717 426.7799 L
s
U
u
146.6881 426.7781 m
134.8513 390.3525 L
103.8666 412.8662 L
127.5378 412.8655 L
146.6883 426.7786 L
146.6881 426.7781 L
s
U
U
u
s
U
U
u
u
u
1 w
189.5108 485.7145 m
177.6749 449.2882 L
146.6893 471.8011 L
170.3608 471.8011 L
189.511 485.715 L
189.5108 485.7145 L
s
U
u
134.8531 508.2279 m
146.6898 544.653 L
108.3896 544.6541 L
115.7038 522.1414 L
134.8537 508.2279 L
134.8531 508.2279 L
s
U
u
84.7166 471.803 m
115.7023 449.29 L
127.5382 485.7163 L
103.8667 485.7163 L
84.7164 471.8024 L
84.7166 471.803 L
s
U
u
127.539 485.715 m
115.7023 449.29 L
154.0025 449.2889 L
146.6882 471.8015 L
127.5384 485.7151 L
127.539 485.715 L
s
U
u
115.7031 522.1412 m
127.539 485.715 L
158.5246 508.228 L
134.8531 508.2279 L
115.7029 522.1418 L
115.7031 522.1412 L
s
U
u
170.3597 471.8009 m
158.5251 508.2269 L
127.539 485.715 L
146.6893 471.8011 L
170.3602 471.8011 L
170.3597 471.8009 L
s
U
u
127.539 485.715 m
115.7044 522.1411 L
84.7182 499.6291 L
103.8685 485.7153 L
127.5395 485.7153 L
127.539 485.715 L
s
U
u
77.4029 449.2903 m
65.5683 485.7164 L
103.8685 485.7153 L
84.7179 471.8021 L
77.4031 449.2898 L
77.4029 449.2903 L
s
U
U
u
s
U
U
u
u
u
1 w
103.8679 485.7153 m
65.5671 485.716 L
77.4034 522.1417 L
84.718 499.6288 L
103.8685 485.7153 L
103.8679 485.7153 L
s
U
u
108.3899 544.6547 m
146.6898 544.653 L
134.8558 581.0789 L
115.7051 567.1661 L
108.39 544.6541 L
108.3899 544.6547 L
s
U
u
58.2552 581.0817 m
46.4188 544.6559 L
84.7196 544.6554 L
77.405 567.1683 L
58.2545 581.0818 L
58.2552 581.0817 L
s
U
u
84.7187 544.6542 m
46.4188 544.6559 L
58.2528 508.23 L
77.4034 522.1428 L
84.7186 544.6548 L
84.7187 544.6542 L
s
U
u
115.7048 567.1668 m
84.7187 544.6542 L
115.7046 522.1418 L
108.3899 544.6547 L
115.7052 567.1672 L
115.7048 567.1668 L
s
U
u
84.7175 499.6297 m
115.7038 522.141 L
84.7187 544.6542 L
77.4034 522.1417 L
84.7179 499.6293 L
84.7175 499.6297 L
s
U
u
84.7187 544.6542 m
115.7049 567.1655 L
84.7199 589.6788 L
77.4046 567.1663 L
84.7191 544.6538 L
84.7187 544.6542 L
s
U
u
34.5844 581.081 m
65.5706 603.5922 L
77.4046 567.1663 L
58.2547 581.0803 L
34.5839 581.0806 L
34.5844 581.081 L
s
U
U
u
s
U
U
u
u
u
1 w
-34.702 558.5673 m
-3.7153 581.0796 L
8.1195 544.653 L
-11.0311 558.567 L
-34.7025 558.567 L
-34.702 558.5673 L
s
U
u
-3.7165 508.2259 m
-34.7031 485.7151 L
-3.7183 463.2014 L
3.5972 485.7138 L
-3.717 508.2263 L
-3.7165 508.2259 L
s
U
u
58.2551 508.2241 m
46.4203 544.6508 L
15.4337 522.1385 L
34.5843 508.2244 L
58.2556 508.2244 L
58.2551 508.2241 L
s
U
u
15.4338 522.14 m
46.4203 544.6508 L
15.4356 567.1644 L
8.1201 544.6521 L
15.4342 522.1396 L
15.4338 522.14 L
s
U
u
3.5979 485.7135 m
15.4338 522.14 L
-22.8671 522.14 L
-3.7165 508.2259 L
3.5978 485.7129 L
3.5979 485.7135 L
s
U
u
-11.0301 558.5666 m
-22.8669 522.1411 L
15.4338 522.14 L
8.1195 544.653 L
-11.0307 558.5667 L
-11.0301 558.5666 L
s
U
u
15.4338 522.14 m
3.597 485.7144 L
41.8977 485.7133 L
34.5834 508.2263 L
15.4332 522.1401 L
15.4338 522.14 L
s
U
u
77.4049 522.1382 m
65.5681 485.7126 L
34.5834 508.2263 L
58.2546 508.2256 L
77.4051 522.1387 L
77.4049 522.1382 L
s
U
U
u
s
U
U
u
u
u
1 w
22.7455 426.7754 m
34.5789 390.3493 L
65.5654 412.8601 L
46.4157 426.7744 L
22.745 426.7751 L
22.7455 426.7754 L
s
U
u
3.5943 412.8624 m
15.431 449.288 L
46.4158 426.7744 L
22.7445 426.7751 L
3.5941 412.8619 L
3.5943 412.8624 L
s
U
u
34.5818 463.2005 m
65.5681 485.7126 L
34.5826 508.2254 L
41.8969 485.7125 L
34.5814 463.2001 L
34.5818 463.2005 L
s
U
u
15.431 449.288 m
46.4157 426.7744 L
58.2525 463.2 L
34.5812 463.2006 L
15.4308 449.2875 L
15.431 449.288 L
s
U
u
41.8973 485.7118 m
3.5976 485.714 L
15.431 449.288 L
34.5818 463.2005 L
41.8972 485.7124 L
41.8973 485.7118 L
s
U
U
u
s
U
U
u
u
u
1 w
-22.8693 449.2857 m
15.4322 449.2852 L
3.5956 412.8587 L
-3.7191 435.3721 L
-22.8699 449.2858 L
-22.8693 449.2857 L
s
U
u
22.7442 353.9178 m
34.5807 390.3442 L
-3.7207 390.3448 L
3.5941 367.8315 L
22.7448 353.9177 L
22.7442 353.9178 L
s
U
u
-3.7197 390.3459 m
34.5807 390.3442 L
22.7466 426.7707 L
3.5956 412.8577 L
-3.7196 390.3453 L
-3.7197 390.3459 L
s
U
u
-34.7063 367.833 m
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-34.7061 412.8587 L
-27.3913 390.3454 L
-34.7067 367.8326 L
-34.7063 367.833 L
s
U
u
-3.7185 435.3712 m
-34.7053 412.8595 L
-3.7197 390.3459 L
3.5956 412.8587 L
-3.719 435.3716 L
-3.7185 435.3712 L
s
U
u
-3.7197 390.3459 m
-34.7065 367.8343 L
-3.7209 345.3206 L
3.5945 367.8335 L
-3.7201 390.3463 L
-3.7197 390.3459 L
s
U
u
46.4154 353.9186 m
15.4286 331.4069 L
3.5945 367.8335 L
22.7447 353.9193 L
46.4159 353.9189 L
46.4154 353.9186 L
s
U
U
u
S
U
U
u
u
u
1 w
15.4384 567.1596 m
46.4228 544.6462 L
58.2594 581.0714 L
34.5884 581.072 L
15.4381 567.159 L
15.4384 567.1596 L
s
U
u
8.1228 544.6469 m
-3.7119 581.0731 L
34.5884 581.072 L
15.4377 567.1587 L
8.1229 544.6463 L
8.1228 544.6469 L
s
U
u
3.6035 603.5852 m
15.4393 640.0113 L
-22.8612 640.0113 L
-3.7108 626.0974 L
3.6034 603.5847 L
3.6035 603.5852 L
s
U
u
-3.7119 581.0731 m
34.5884 581.072 L
22.7537 617.4983 L
3.6031 603.5849 L
-3.7118 581.0725 L
-3.7119 581.0731 L
s
U
u
-3.7101 626.0971 m
-34.6964 603.5865 L
-3.7119 581.0731 L
3.6035 603.5852 L
-3.7106 626.0975 L
-3.7101 626.0971 L
s
U
U
u
S
U
U
u
u
u
1 w
103.8724 603.5853 m
65.572 603.5864 L
77.4087 640.0116 L
84.7229 617.4989 L
103.8729 603.5853 L
103.8724 603.5853 L
s
U
u
46.4225 617.5005 m
15.437 640.0133 L
3.6013 603.5876 L
22.752 617.5009 L
46.423 617.5002 L
46.4225 617.5005 L
s
U
u
65.572 603.5864 m
77.4087 640.0116 L
39.1083 640.0127 L
46.4226 617.5 L
65.5726 603.5863 L
65.572 603.5864 L
s
U
u
22.7525 617.5015 m
34.5858 581.0758 L
65.572 603.5864 L
46.4225 617.5005 L
22.752 617.5011 L
22.7525 617.5015 L
s
U
U
u
s
U
U
U
U
u
u
u
u
1 w
154.0026 449.2904 m
115.7027 449.2921 L
127.5367 412.8662 L
146.6873 426.779 L
154.0024 449.291 L
154.0026 449.2904 L
s
U
u
146.6885 471.8036 m
177.6736 449.2903 L
146.6873 426.779 L
154.0026 449.2915 L
146.688 471.804 L
146.6885 471.8036 L
s
U
u
184.9875 426.7778 m
196.8227 390.3516 L
227.8085 412.864 L
204.1371 412.8643 L
184.9872 426.7783 L
184.9875 426.7778 L
s
U
u
177.6736 449.2903 m
146.6873 426.779 L
177.6725 404.2658 L
184.9877 426.7783 L
177.6731 449.2907 L
177.6736 449.2903 L
s
U
u
204.1364 412.8641 m
215.9734 449.2887 L
177.6736 449.2903 L
184.9875 426.7778 L
204.137 412.864 L
204.1364 412.8641 L
s
U
U
u
s
U
U
u
u
u
1 w
196.8218 317.4999 m
227.8062 294.9865 L
239.6428 331.4116 L
215.9718 331.4123 L
196.8215 317.4993 L
196.8218 317.4999 L
s
U
u
189.5062 294.9872 m
177.6715 331.4134 L
215.9718 331.4123 L
196.8211 317.499 L
189.5063 294.9866 L
189.5062 294.9872 L
s
U
u
184.9869 353.9255 m
196.8227 390.3516 L
158.5222 390.3516 L
177.6726 376.4377 L
184.9868 353.9249 L
184.9869 353.9255 L
s
U
u
177.6715 331.4134 m
215.9718 331.4123 L
204.1371 367.8386 L
184.9864 353.9252 L
177.6716 331.4128 L
177.6715 331.4134 L
s
U
u
177.6732 376.4374 m
146.6871 353.9268 L
177.6715 331.4134 L
184.9869 353.9255 L
177.6728 376.4378 L
177.6732 376.4374 L
s
U
U
u
s
U
U
u
u
u
1 w
146.685 308.902 m
177.6714 331.414 L
189.506 294.9878 L
170.3557 308.9018 L
146.6845 308.9017 L
146.685 308.902 L
s
U
u
177.6701 258.5611 m
146.6839 236.0506 L
177.6682 213.5372 L
184.9838 236.0492 L
177.6697 258.5616 L
177.6701 258.5611 L
s
U
u
239.6411 258.5592 m
227.8065 294.9855 L
196.8202 272.4735 L
215.9706 258.5596 L
239.6417 258.5596 L
239.6411 258.5592 L
s
U
u
196.8203 272.475 m
227.8065 294.9855 L
196.8222 317.499 L
189.5066 294.9869 L
196.8207 272.4746 L
196.8203 272.475 L
s
U
u
184.9845 236.0489 m
196.8203 272.475 L
158.5198 272.4751 L
177.6701 258.5611 L
184.9843 236.0484 L
184.9845 236.0489 L
s
U
u
170.3567 308.9013 m
158.52 272.4762 L
196.8203 272.475 L
189.506 294.9878 L
170.3561 308.9014 L
170.3567 308.9013 L
s
U
u
196.8203 272.475 m
184.9836 236.0498 L
223.2839 236.0487 L
215.9697 258.5615 L
196.8197 272.4751 L
196.8203 272.475 L
s
U
u
258.7907 272.4731 m
246.954 236.048 L
215.9697 258.5615 L
239.6407 258.5607 L
258.791 272.4737 L
258.7907 272.4731 L
s
U
U
u
s
U
U
u
u
u
1 w
297.0997 463.2054 m
308.9351 426.7787 L
270.6341 426.7793 L
289.7849 440.6931 L
297.0996 463.206 L
297.0997 463.2054 L
s
U
u
239.6471 449.2924 m
227.8131 485.7185 L
196.8267 463.2071 L
215.9767 449.293 L
239.6477 449.2926 L
239.6471 449.2924 L
s
U
u
220.4956 390.354 m
258.7966 390.3535 L
246.9612 426.7802 L
227.8104 412.8664 L
220.4957 390.3535 L
220.4956 390.354 L
s
U
u
246.9626 426.7796 m
258.7966 390.3535 L
289.7831 412.8649 L
270.6331 426.779 L
246.9621 426.7793 L
246.9626 426.7796 L
s
U
u
215.9762 449.2925 m
246.9626 426.7796 L
258.798 463.2062 L
239.6471 449.2924 L
215.9757 449.2927 L
215.9762 449.2925 L
s
U
u
289.7842 440.6922 m
258.799 463.2056 L
246.9626 426.7796 L
270.6341 426.7793 L
289.7845 440.6928 L
289.7842 440.6922 L
s
U
u
246.9626 426.7796 m
215.9774 449.293 L
204.141 412.867 L
227.8124 412.8666 L
246.9629 426.7802 L
246.9626 426.7796 L
s
U
u
227.8112 367.8419 m
196.826 390.3552 L
227.8124 412.8666 L
220.4971 390.354 L
227.8116 367.8414 L
227.8112 367.8419 L
s
U
U
u
s
U
U
u
u
u
1 w
184.9888 353.9294 m
196.8247 390.3555 L
227.8101 367.8426 L
204.1388 367.8427 L
184.9886 353.9289 L
184.9888 353.9294 L
s
U
u
239.6462 331.416 m
227.8096 294.9912 L
266.1095 294.99 L
258.7954 317.5026 L
239.6456 331.4161 L
239.6462 331.416 L
s
U
u
289.7825 367.8407 m
258.7969 390.3536 L
246.9611 353.9276 L
270.6325 353.9275 L
289.7827 367.8413 L
289.7825 367.8407 L
s
U
u
246.9604 353.9289 m
258.7969 390.3536 L
220.497 390.3548 L
227.8112 367.8423 L
246.9609 353.9288 L
246.9604 353.9289 L
s
U
u
258.7961 317.5027 m
246.9604 353.9289 L
215.9748 331.416 L
239.6462 331.416 L
258.7964 317.5022 L
258.7961 317.5027 L
s
U
u
204.1398 367.8429 m
215.9743 331.417 L
246.9604 353.9289 L
227.8101 367.8426 L
204.1393 367.8427 L
204.1398 367.8429 L
s
U
u
246.9604 353.9289 m
258.7948 317.5029 L
289.7809 340.0147 L
270.6307 353.9286 L
246.9598 353.9285 L
246.9604 353.9289 L
s
U
u
297.0962 390.3532 m
308.9306 353.9274 L
270.6307 353.9286 L
289.7812 367.8417 L
297.096 390.3538 L
297.0962 390.3532 L
s
U
U
u
s
U
U
u
u
u
1 w
289.7823 412.8663 m
258.796 390.3556 L
289.7805 367.8421 L
297.096 390.3543 L
289.7819 412.8667 L
289.7823 412.8663 L
s
U
u
270.6322 426.7808 m
308.9328 426.7796 L
297.096 390.3543 L
289.7817 412.8672 L
270.6316 426.7808 L
270.6322 426.7808 L
s
U
u
328.0823 412.8655 m
359.068 390.3525 L
370.9037 426.7784 L
351.7529 412.8651 L
328.0818 412.8658 L
328.0823 412.8655 L
s
U
u
308.9328 426.7796 m
297.096 390.3543 L
335.3966 390.3532 L
328.0822 412.866 L
308.9321 426.7797 L
308.9328 426.7796 L
s
U
u
351.7525 412.8645 m
339.9191 449.2904 L
308.9328 426.7796 L
328.0823 412.8655 L
351.753 412.8648 L
351.7525 412.8645 L
s
U
U
u
s
U
U
U
u
u
u
u
1 w
258.7945 199.6245 m
239.645 213.5382 L
239.6456 213.5381 L
S
U
u
215.9743 213.5391 m
246.9605 236.0504 L
258.7945 199.6245 L
239.6446 213.5384 L
215.9738 213.5388 L
215.9743 213.5391 L
s
U
u
270.6313 236.0494 m
308.9317 236.0489 L
297.0966 272.4746 L
289.7813 249.9621 L
270.6307 236.0493 L
270.6313 236.0494 L
s
U
u
246.9605 236.0504 m
258.7945 199.6245 L
289.7808 222.1358 L
270.6308 236.0498 L
246.96 236.0501 L
246.9605 236.0504 L
s
U
u
289.7812 249.9614 m
258.7976 272.475 L
246.9605 236.0504 L
270.6313 236.0494 L
289.7815 249.9619 L
289.7812 249.9614 L
s
U
U
u
S
U
U
u
u
u
1 w
370.9033 236.0471 m
S
U
u
359.0667 199.6219 m
370.9033 236.0471 L
S
U
u
339.9172 213.536 m
308.9317 236.0489 L
297.096 199.6231 L
316.2467 213.5364 L
339.9177 213.5357 L
339.9172 213.536 L
s
U
u
359.0667 199.6219 m
370.9033 236.0471 L
332.603 236.0482 L
339.9173 213.5355 L
359.0673 199.6219 L
359.0667 199.6219 L
s
U
u
359.0667 199.6219 m
339.9172 213.536 L
316.2467 213.5367 L
316.2472 213.537 L
S
U
U
u
S
U
U
u
u
u
1 w
359.0661 199.6221 m
S
U
U
U
u
u
u
270.6318 353.9306 m
308.9328 353.93 L
297.0964 317.5041 L
289.7817 340.0171 L
270.6312 353.9307 L
270.6318 353.9306 L
s
U
u
266.1097 294.9909 m
227.8097 294.9927 L
239.6437 258.5665 L
258.7945 272.4794 L
266.1096 294.9915 L
266.1097 294.9909 L
s
U
u
316.2448 258.5637 m
328.0811 294.9897 L
289.7801 294.9903 L
297.0948 272.4772 L
316.2454 258.5636 L
316.2448 258.5637 L
s
U
u
289.7811 294.9914 m
328.0811 294.9897 L
316.2471 331.4159 L
297.0964 317.503 L
289.7812 294.9909 L
289.7811 294.9914 L
s
U
u
258.7948 272.4788 m
289.7811 294.9914 L
258.795 317.504 L
266.1097 294.9909 L
258.7944 272.4784 L
258.7948 272.4788 L
s
U
u
289.7823 340.0162 m
258.7958 317.5048 L
289.7811 294.9914 L
297.0964 317.5041 L
289.7819 340.0166 L
289.7823 340.0162 L
s
U
u
289.7811 294.9914 m
258.7946 272.48 L
289.7799 249.9666 L
297.0952 272.4792 L
289.7807 294.9918 L
289.7811 294.9914 L
s
U
u
339.9156 258.5645 m
308.9293 236.0531 L
297.0952 272.4792 L
316.2453 258.5652 L
339.9162 258.5648 L
339.9156 258.5645 L
s
U
U
u
s
U
U
u
u
u
1 w
339.9141 213.539 m
308.9286 236.052 L
339.9146 258.5637 L
332.5996 236.0511 L
339.9145 213.5386 L
339.9141 213.539 L
s
U
u
359.0672 317.5019 m
328.0811 294.9901 L
359.0666 272.4772 L
366.3816 294.9899 L
359.0667 317.5023 L
359.0672 317.5019 L
s
U
u
359.0651 272.4769 m
328.0811 294.9901 L
316.2445 258.5653 L
339.9152 258.5646 L
359.0654 272.4774 L
359.0651 272.4769 L
s
U
u
359.0651 272.4769 m
370.9008 236.0511 L
S
U
u
332.5997 236.0522 m
370.8996 236.051 L
359.0651 272.4769 L
339.9146 258.5637 L
332.5998 236.0516 L
332.5997 236.0522 L
s
U
u
366.38 294.9884 m
359.0652 272.4762 L
359.0651 272.4769 L
S
U
u
339.9167 331.4144 m
378.2166 331.4132 L
366.38 294.9884 L
359.0659 317.501 L
339.9161 331.4145 L
339.9167 331.4144 L
s
U
U
u
S
U
U
u
u
u
1 w
316.2456 331.4156 m
328.0789 294.9897 L
359.0653 317.5004 L
339.9157 331.4146 L
316.245 331.4153 L
316.2456 331.4156 L
s
U
u
297.0944 317.5028 m
308.9311 353.9281 L
339.9157 331.4146 L
316.2446 331.4153 L
297.0942 317.5022 L
297.0944 317.5028 L
s
U
u
328.0819 367.8406 m
359.068 390.3525 L
328.0827 412.8652 L
335.3969 390.3524 L
328.0814 367.8401 L
328.0819 367.8406 L
s
U
u
308.9311 353.9281 m
339.9157 331.4146 L
351.7524 367.84 L
328.0813 367.8406 L
308.9309 353.9276 L
308.9311 353.9281 L
s
U
u
335.3973 390.3517 m
297.0978 390.354 L
308.9311 353.9281 L
328.0819 367.8406 L
335.3972 390.3523 L
335.3973 390.3517 L
s
U
U
u
s
U
U
U
u
u
u
u
1 w
308.9349 617.5088 m
328.0845 603.5946 L
351.7552 603.5939 L
351.7546 603.5936 L
S
U
u
370.9058 617.5065 m
359.0691 581.0811 L
328.0845 603.5946 L
351.7557 603.5939 L
370.906 617.507 L
370.9058 617.5065 L
s
U
u
339.9183 567.1686 m
308.9322 544.6567 L
339.9175 522.144 L
332.6032 544.6569 L
339.9188 567.1691 L
339.9183 567.1686 L
s
U
u
359.0691 581.0811 m
328.0845 603.5946 L
316.2478 567.1693 L
339.9189 567.1686 L
359.0693 581.0817 L
359.0691 581.0811 L
s
U
u
332.6029 544.6575 m
370.9024 544.6553 L
359.0691 581.0811 L
339.9183 567.1686 L
332.603 544.6569 L
332.6029 544.6575 L
s
U
U
u
S
U
U
u
u
u
1 w
239.6458 522.1459 m
227.8087 485.7212 L
266.1087 485.7195 L
258.7948 508.2321 L
239.6452 522.146 L
239.6458 522.1459 L
s
U
u
215.9744 522.1468 m
246.9607 544.6583 L
258.7948 508.2321 L
239.6448 522.1462 L
215.9738 522.1465 L
215.9744 522.1468 L
s
U
u
270.6316 544.6573 m
308.9322 544.6567 L
297.097 581.0827 L
289.7817 558.5701 L
270.631 544.6572 L
270.6316 544.6573 L
s
U
u
246.9607 544.6583 m
258.7948 508.2321 L
289.7812 530.7436 L
270.6312 544.6576 L
246.9602 544.658 L
246.9607 544.6583 L
s
U
u
289.7817 558.5693 m
258.7979 581.083 L
246.9607 544.6583 L
270.6316 544.6573 L
289.7819 558.5699 L
289.7817 558.5693 L
s
U
U
u
s
U
U
u
u
u
1 w
215.9761 567.172 m
246.9613 544.6585 L
215.9749 522.1472 L
223.2903 544.6598 L
215.9757 567.1724 L
215.9761 567.172 L
s
U
u
177.6737 522.1477 m
146.6899 544.6615 L
134.8527 508.2368 L
158.5236 508.2357 L
177.674 522.1483 L
177.6737 522.1477 L
s
U
u
196.8214 463.2092 m
227.8079 485.7206 L
196.8227 508.234 L
189.5073 485.7213 L
196.8218 463.2087 L
196.8214 463.2092 L
s
U
u
196.8241 508.2343 m
227.8079 485.7206 L
239.645 522.1453 L
215.9742 522.1463 L
196.8238 508.2338 L
196.8241 508.2343 L
s
U
u
158.5235 508.2349 m
196.8241 508.2343 L
184.989 544.6603 L
177.6737 522.1477 L
158.5229 508.2349 L
158.5235 508.2349 L
s
U
u
223.2902 544.6587 m
184.9901 544.6605 L
196.8241 508.2343 L
215.9749 522.1472 L
223.2901 544.6593 L
223.2902 544.6587 L
s
U
u
196.8241 508.2343 m
158.5241 508.2361 L
170.358 471.8099 L
189.5088 485.7228 L
196.824 508.2349 L
196.8241 508.2343 L
s
U
u
215.9717 449.2963 m
177.6717 449.2981 L
189.5088 485.7228 L
196.8226 463.2101 L
215.9722 449.2963 L
215.9717 449.2963 L
s
U
U
u
s
U
U
u
u
u
1 w
378.2199 449.2877 m
366.3852 485.7143 L
S
U
u
378.2231 567.1658 m
370.9075 544.6535 L
378.2217 522.1409 L
378.2212 522.1414 L
S
U
u
316.2496 522.1432 m
328.0843 485.7166 L
359.071 508.2288 L
339.9205 522.1429 L
316.2491 522.1429 L
316.2496 522.1432 L
s
U
u
359.0709 508.2273 m
328.0843 485.7166 L
359.069 463.2029 L
366.3846 485.7152 L
359.0704 508.2277 L
359.0709 508.2273 L
s
U
u
378.2212 522.1414 m
370.907 544.6544 L
370.9069 544.6538 L
359.0709 508.2273 L
S
U
u
359.0709 508.2273 m
366.3852 485.7143 L
S
U
u
359.0709 508.2273 m
370.9078 544.6529 L
332.607 544.654 L
339.9213 522.141 L
359.0715 508.2273 L
359.0709 508.2273 L
s
U
u
297.0998 508.2292 m
308.9366 544.6547 L
339.9213 522.141 L
316.2501 522.1418 L
297.0996 508.2287 L
297.0998 508.2292 L
s
U
U
u
S
U
U
u
u
u
1 w
270.6359 544.6567 m
308.9365 544.656 L
297.1002 508.2304 L
289.7857 530.7433 L
270.6353 544.6567 L
270.6359 544.6567 L
s
U
u
266.1138 485.7176 m
227.8142 485.7194 L
239.648 449.2936 L
258.7987 463.2063 L
266.1137 485.7182 L
266.1138 485.7176 L
s
U
u
316.2483 449.2907 m
328.0846 485.7163 L
289.784 485.7169 L
297.0986 463.2041 L
316.2489 449.2906 L
316.2483 449.2907 L
s
U
u
289.785 485.7181 m
328.0846 485.7163 L
316.2507 522.1421 L
297.1002 508.2294 L
289.7851 485.7175 L
289.785 485.7181 L
s
U
u
258.799 463.2057 m
289.785 485.7181 L
258.7993 508.2305 L
266.1138 485.7176 L
258.7986 463.2053 L
258.799 463.2057 L
s
U
u
289.7862 530.7424 m
258.8001 508.2313 L
289.785 485.7181 L
297.1002 508.2304 L
289.7858 530.7428 L
289.7862 530.7424 L
s
U
u
289.785 485.7181 m
258.7988 463.2069 L
289.7837 440.6938 L
297.099 463.2061 L
289.7845 485.7185 L
289.785 485.7181 L
s
U
u
339.919 449.2915 m
308.9329 426.7804 L
297.099 463.2061 L
316.2488 449.2921 L
339.9195 449.2918 L
339.919 449.2915 L
s
U
U
u
s
U
U
u
u
u
1 w
359.0702 463.204 m
328.0862 485.7179 L
316.249 449.293 L
339.9199 449.2919 L
359.0704 463.2046 L
359.0702 463.204 L
s
U
u
366.3861 485.7165 m
378.2201 449.2902 L
339.9199 449.2919 L
359.0708 463.2048 L
366.3859 485.7171 L
366.3861 485.7165 L
s
U
u
378.2183 404.2661 m
370.9044 426.7789 L
370.9043 426.7783 L
359.068 390.3525 L
S
U
u
378.2201 449.2902 m
339.9199 449.2919 L
351.754 412.8656 L
370.9048 426.7786 L
378.22 449.2908 L
378.2201 449.2902 L
s
U
u
378.2201 449.2902 m
370.9043 426.7783 L
378.2181 404.2659 L
378.2176 404.2664 L
S
U
U
u
S
U
U
U
u
u
u
u
1 w
134.8521 199.6238 m
146.6891 236.0481 L
108.3894 236.0498 L
115.7032 213.5373 L
134.8527 199.6237 L
134.8521 199.6238 L
s
U
u
158.5233 199.6234 m
134.8521 199.6238 L
115.7023 213.5377 L
115.7025 213.5372 L
S
U
u
158.5238 199.6224 m
S
U
u
115.7038 213.537 m
84.7176 191.0258 L
S
U
U
u
S
U
U
u
u
u
1 w
215.9746 258.5585 m
246.9596 236.0453 L
215.9735 213.5342 L
223.2887 236.0465 L
215.9742 258.5589 L
215.9746 258.5585 L
s
U
u
177.6726 213.5346 m
146.6891 236.0481 L
134.8521 199.6238 L
158.5227 199.6227 L
177.6729 213.5352 L
177.6726 213.5346 L
s
U
u
196.8214 199.621 m
S
U
u
239.6434 213.5322 m
215.9728 213.5333 L
196.8226 199.6208 L
196.8229 199.6214 L
S
U
u
158.5226 199.622 m
196.8229 199.6214 L
184.9878 236.047 L
177.6726 213.5346 L
158.5221 199.6219 L
158.5226 199.622 L
s
U
u
223.2886 236.0454 m
184.989 236.0472 L
196.8229 199.6214 L
215.9735 213.5342 L
223.2885 236.046 L
223.2886 236.0454 L
s
U
u
196.8227 199.622 m
196.8229 199.6214 L
158.5232 199.6231 L
S
U
U
u
S
U
U
u
u
u
1 w
258.7977 199.6274 m
258.7981 199.627 L
S
U
U
U
u
u
u
258.7908 199.6196 m
239.6415 213.5336 L
239.6421 213.5335 L
S
U
u
215.9708 213.5348 m
246.9573 236.0456 L
258.7908 199.6196 L
239.6411 213.5338 L
215.9703 213.5345 L
215.9708 213.5348 L
s
U
u
270.628 236.0443 m
308.9283 236.0432 L
297.0937 272.4691 L
289.7782 249.9567 L
270.6274 236.0442 L
270.628 236.0443 L
s
U
u
246.9573 236.0456 m
258.7908 199.6196 L
289.7773 222.1304 L
270.6276 236.0447 L
246.9568 236.0453 L
246.9573 236.0456 L
s
U
u
289.7781 249.956 m
258.7948 272.4699 L
246.9573 236.0456 L
270.628 236.0443 L
289.7784 249.9566 L
289.7781 249.956 L
s
U
U
u
S
U
U
U
u
u
u
u
u
1 w
77.4111 567.1602 m
65.5758 603.5867 L
103.8766 603.5861 L
84.7259 589.6724 L
77.4113 567.1596 L
77.4111 567.1602 L
s
U
u
134.8634 581.0732 m
146.6973 544.6472 L
177.6836 567.1585 L
158.5337 581.0726 L
134.8628 581.0729 L
134.8634 581.0732 L
s
U
u
154.0148 640.0111 m
115.714 640.0117 L
127.5493 603.5852 L
146.7001 617.4989 L
154.0147 640.0117 L
154.0148 640.0111 L
s
U
u
127.5479 603.5858 m
115.714 640.0117 L
84.7277 617.5004 L
103.8777 603.5864 L
127.5485 603.5861 L
127.5479 603.5858 L
s
U
u
158.5342 581.0731 m
127.5479 603.5858 L
115.7126 567.1594 L
134.8634 581.0732 L
158.5347 581.0728 L
158.5342 581.0731 L
s
U
u
84.7266 589.6732 m
115.7116 567.1599 L
127.5479 603.5858 L
103.8766 603.5861 L
84.7263 589.6727 L
84.7266 589.6732 L
s
U
u
127.5479 603.5858 m
158.533 581.0725 L
170.3694 617.4983 L
146.698 617.4987 L
127.5477 603.5852 L
127.5479 603.5858 L
s
U
U
u
s
U
U
u
u
u
1 w
146.6985 617.4989 m
177.6851 640.0111 L
189.5197 603.5847 L
170.3692 617.4987 L
146.698 617.4987 L
146.6985 617.4989 L
s
U
u
177.6837 567.1578 m
146.6973 544.6472 L
177.6818 522.1336 L
184.9974 544.6458 L
177.6833 567.1582 L
177.6837 567.1578 L
s
U
u
239.655 567.1559 m
227.8203 603.5824 L
196.8339 581.0703 L
215.9843 567.1563 L
239.6556 567.1562 L
239.655 567.1559 L
s
U
u
196.834 581.0718 m
227.8203 603.5824 L
196.8359 626.096 L
189.5203 603.5838 L
196.8344 581.0714 L
196.834 581.0718 L
s
U
u
184.9981 544.6455 m
196.834 581.0718 L
158.5333 581.0718 L
177.6837 567.1578 L
184.998 544.645 L
184.9981 544.6455 L
s
U
u
170.3703 617.4982 m
158.5335 581.0729 L
196.834 581.0718 L
189.5197 603.5847 L
170.3697 617.4984 L
170.3703 617.4982 L
s
U
u
196.834 581.0718 m
184.9972 544.6464 L
223.2977 544.6452 L
215.9835 567.1582 L
196.8334 581.0718 L
196.834 581.0718 L
s
U
u
258.8047 581.0699 m
246.968 544.6446 L
215.9835 567.1582 L
239.6546 567.1574 L
258.8049 581.0705 L
258.8047 581.0699 L
s
U
U
u
s
U
U
u
u
u
1 w
289.7892 603.5829 m
258.8036 626.0966 L
282.4753 626.0962 L
S
U
u
196.8305 626.0993 m
227.8161 603.5857 L
239.6526 640.0121 L
215.9809 640.0124 L
196.8303 626.0988 L
196.8305 626.0993 L
s
U
u
239.6534 640.0108 m
227.8161 603.5857 L
266.1166 603.584 L
258.8026 626.0969 L
239.6528 640.0109 L
239.6534 640.0108 L
s
U
u
189.5164 603.5866 m
177.6823 640.0131 L
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\closepsdump

% Here is the PostScript for fig13.ps:
\message{Writing file fig13.ps}
\psdump{fig13.ps}%!PS-Adobe-3.0 EPSF-3.0
%%Creator: Tk Canvas Widget
%%For: Charles Radin,dept,fac,0000
%%Title: Window .f1.c
%%CreationDate: Thu Feb  1 09:48:44 1996
%%BoundingBox: 6 4 605 789
%%Pages: 1
%%DocumentData: Clean7Bit
%%Orientation: Landscape
%%EndComments

%%BeginProlog
50 dict begin

% This is a standard prolog for Postscript generated by Tk's canvas
% widget.
% @(#) prolog.ps 1.2 94/12/09 10:53:18

% The definitions below just define all of the variables used in
% any of the procedures here.  This is needed for obscure reasons
% explained on p. 716 of the Postscript manual (Section H.2.7,
% "Initializing Variables," in the section on Encapsulated Postscript).

/baseline 0 def
/stipimage 0 def
/height 0 def
/justify 0 def
/lineLength 0 def
/spacing 0 def
/stipple 0 def
/strings 0 def
/xoffset 0 def
/yoffset 0 def
/tmpstip null def

% Define the array ISOLatin1Encoding (which specifies how characters are
% encoded for ISO-8859-1 fonts), if it isn't already present (Postscript
% level 2 is supposed to define it, but level 1 doesn't).

systemdict /ISOLatin1Encoding known not {
    /ISOLatin1Encoding [
	/space /space /space /space /space /space /space /space
	/space /space /space /space /space /space /space /space
	/space /space /space /space /space /space /space /space
	/space /space /space /space /space /space /space /space
	/space /exclam /quotedbl /numbersign /dollar /percent /ampersand
	    /quoteright
	/parenleft /parenright /asterisk /plus /comma /minus /period /slash
	/zero /one /two /three /four /five /six /seven
	/eight /nine /colon /semicolon /less /equal /greater /question
	/at /A /B /C /D /E /F /G
	/H /I /J /K /L /M /N /O
	/P /Q /R /S /T /U /V /W
	/X /Y /Z /bracketleft /backslash /bracketright /asciicircum /underscore
	/quoteleft /a /b /c /d /e /f /g
	/h /i /j /k /l /m /n /o
	/p /q /r /s /t /u /v /w
	/x /y /z /braceleft /bar /braceright /asciitilde /space
	/space /space /space /space /space /space /space /space
	/space /space /space /space /space /space /space /space
	/dotlessi /grave /acute /circumflex /tilde /macron /breve /dotaccent
	/dieresis /space /ring /cedilla /space /hungarumlaut /ogonek /caron
	/space /exclamdown /cent /sterling /currency /yen /brokenbar /section
	/dieresis /copyright /ordfeminine /guillemotleft /logicalnot /hyphen
	    /registered /macron
	/degree /plusminus /twosuperior /threesuperior /acute /mu /paragraph
	    /periodcentered
	/cedillar /onesuperior /ordmasculine /guillemotright /onequarter
	    /onehalf /threequarters /questiondown
	/Agrave /Aacute /Acircumflex /Atilde /Adieresis /Aring /AE /Ccedilla
	/Egrave /Eacute /Ecircumflex /Edieresis /Igrave /Iacute /Icircumflex
	    /Idieresis
	/Eth /Ntilde /Ograve /Oacute /Ocircumflex /Otilde /Odieresis /multiply
	/Oslash /Ugrave /Uacute /Ucircumflex /Udieresis /Yacute /Thorn
	    /germandbls
	/agrave /aacute /acircumflex /atilde /adieresis /aring /ae /ccedilla
	/egrave /eacute /ecircumflex /edieresis /igrave /iacute /icircumflex
	    /idieresis
	/eth /ntilde /ograve /oacute /ocircumflex /otilde /odieresis /divide
	/oslash /ugrave /uacute /ucircumflex /udieresis /yacute /thorn
	    /ydieresis
    ] def
} if

% Override the setfont procedure with a new procedure that re-encodes
% the font to use the ISO Latin-1 style.  The body of this procedure
% comes from Section 5.6.1 of the Postscript book.

/realsetfont /setfont load def
/setfont {
    dup length dict begin
	{1 index /FID ne {def} {pop pop} ifelse} forall
	/Encoding ISOLatin1Encoding def
	currentdict
    end

    % I'm not sure why it's necessary to use "definefont" on this new
    % font, but it seems to be important; just use the name "Temporary"
    % for the font.

    /Temporary exch definefont
    realsetfont
} bind def

% StrokeClip
%
% This procedure converts the current path into a clip area under
% the assumption of stroking.  It's a bit tricky because some Postscript
% interpreters get errors during strokepath for dashed lines.  If
% this happens then turn off dashes and try again.

/StrokeClip {
    {strokepath} stopped {
	(This Postscript printer gets limitcheck overflows when) =
	(stippling dashed lines;  lines will be printed solid instead.) =
	[] 0 setdash strokepath} if
    clip
} bind def

% desiredSize EvenPixels closestSize
%
% The procedure below is used for stippling.  Given the optimal size
% of a dot in a stipple pattern in the current user coordinate system,
% compute the closest size that is an exact multiple of the device's
% pixel size.  This allows stipple patterns to be displayed without
% aliasing effects.

/EvenPixels {
    % Compute exact number of device pixels per stipple dot.
    dup 0 matrix currentmatrix dtransform
    dup mul exch dup mul add sqrt

    % Round to an integer, make sure the number is at least 1, and compute
    % user coord distance corresponding to this.
    dup round dup 1 lt {pop 1} if
    exch div mul
} bind def

% width height string StippleFill --
%
% Given a path already set up and a clipping region generated from
% it, this procedure will fill the clipping region with a stipple
% pattern.  "String" contains a proper image description of the
% stipple pattern and "width" and "height" give its dimensions.  Each
% stipple dot is assumed to be about one unit across in the current
% user coordinate system.  This procedure trashes the graphics state.

/StippleFill {
    % The following code is needed to work around a NeWSprint bug.

    /tmpstip 1 index def

    % Change the scaling so that one user unit in user coordinates
    % corresponds to the size of one stipple dot.
    1 EvenPixels dup scale

    % Compute the bounding box occupied by the path (which is now
    % the clipping region), and round the lower coordinates down
    % to the nearest starting point for the stipple pattern.  Be
    % careful about negative numbers, since the rounding works
    % differently on them.

    pathbbox
    4 2 roll
    5 index div dup 0 lt {1 sub} if cvi 5 index mul 4 1 roll
    6 index div dup 0 lt {1 sub} if cvi 6 index mul 3 2 roll

    % Stack now: width height string y1 y2 x1 x2
    % Below is a doubly-nested for loop to iterate across this area
    % in units of the stipple pattern size, going up columns then
    % across rows, blasting out a stipple-pattern-sized rectangle at
    % each position

    6 index exch {
	2 index 5 index 3 index {
	    % Stack now: width height string y1 y2 x y

	    gsave
	    1 index exch translate
	    5 index 5 index true matrix tmpstip imagemask
	    grestore
	} for
	pop
    } for
    pop pop pop pop pop
} bind def

% -- AdjustColor --
% Given a color value already set for output by the caller, adjusts
% that value to a grayscale or mono value if requested by the CL
% variable.

/AdjustColor {
    CL 2 lt {
	currentgray
	CL 0 eq {
	    .5 lt {0} {1} ifelse
	} if
	setgray
    } if
} bind def

% x y strings lineLength spacing xoffset yoffset justify stipple DrawText --
% This procedure does all of the real work of drawing text.  The
% color and font must already have been set by the caller, and the
% following arguments must be on the stack:
%
% x, y -	Coordinates at which to draw text.
% strings -	An array of strings, one for each line of the text item,
%		in order from top to bottom.
% lineLength -	Minimum line length:  needed to justify text properly.
% spacing -	Spacing between lines.
% xoffset -	Horizontal offset for text bbox relative to x and y: 0 for
%		nw/w/sw anchor, -0.5 for n/center/s, and -1.0 for ne/e/se.
% yoffset -	Vertical offset for text bbox relative to x and y: 0 for
%		nw/n/ne anchor, +0.5 for w/center/e, and +1.0 for sw/s/se.
% justify -	0 for left justification, 0.5 for center, 1 for right justify.
% stipple -	Boolean value indicating whether or not text is to be
%		drawn in stippled fashion.  If text is stippled,
%		procedure StippleText must have been defined to call
%		StippleFill in the right way.
%
% Also, when this procedure is invoked, the color and font must already
% have been set for the text.

/DrawText {
    /stipple exch def
    /justify exch def
    /yoffset exch def
    /xoffset exch def
    /spacing exch def
    /lineLength exch def
    /strings exch def

    % First scan through all of the text to find the widest line (if it's
    % longer than the "lineLength" argument).

    strings {
	stringwidth pop
	dup lineLength gt {/lineLength exch def} {pop} ifelse
	newpath
    } forall

    % Compute the baseline offset and the actual font height.

    0 0 moveto (TXygqPZ) false charpath
    pathbbox dup /baseline exch def
    exch pop exch sub /height exch def pop
    newpath

    % Translate coordinates first so that the origin is at the upper-left
    % corner of the text's bounding box. Remember that x and y for
    % positioning are still on the stack.

    translate
    lineLength xoffset mul
    strings length 1 sub spacing mul height add yoffset mul translate

    % Now use the baseline and justification information to translate so
    % that the origin is at the baseline and positioning point for the
    % first line of text.

    justify lineLength mul baseline neg translate

    % Iterate over each of the lines to output it.  For each line,
    % compute its width again so it can be properly justified, then
    % display it.

    strings {
	dup stringwidth pop
	justify neg mul 0 moveto
	stipple {

	    % The text is stippled, so turn it into a path and print
	    % by calling StippledText, which in turn calls StippleFill.
	    % Unfortunately, many Postscript interpreters will get
	    % overflow errors if we try to do the whole string at
	    % once, so do it a character at a time.

	    gsave
	    /char (X) def
	    {
		char 0 3 -1 roll put
		currentpoint
		gsave
		char true charpath clip StippleText
		grestore
		char stringwidth translate
		moveto
	    } forall
	    grestore
	} {show} ifelse
	0 spacing neg translate
    } forall
} bind def

%%EndProlog
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/CL 0 def
%%EndSetup

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false N /rhiSeen false N /letter{}N /note{}N /a4{}N /legal{}N}B
/@scaleunit 100 N /@hscale{@scaleunit div /hsc X}B /@vscale{@scaleunit
div /vsc X}B /@hsize{/hs X /CLIP 1 N}B /@vsize{/vs X /CLIP 1 N}B /@clip{
/CLIP 2 N}B /@hoffset{/ho X}B /@voffset{/vo X}B /@angle{/ang X}B /@rwi{
10 div /rwi X /rwiSeen true N}B /@rhi{10 div /rhi X /rhiSeen true N}B
/@llx{/llx X}B /@lly{/lly X}B /@urx{/urx X}B /@ury{/ury X}B /magscale
true def end /@MacSetUp{userdict /md known{userdict /md get type
/dicttype eq{userdict begin md length 10 add md maxlength ge{/md md dup
length 20 add dict copy def}if end md begin /letter{}N /note{}N /legal{}
N /od{txpose 1 0 mtx defaultmatrix dtransform S atan/pa X newpath
clippath mark{transform{itransform moveto}}{transform{itransform lineto}
}{6 -2 roll transform 6 -2 roll transform 6 -2 roll transform{
itransform 6 2 roll itransform 6 2 roll itransform 6 2 roll curveto}}{{
closepath}}pathforall newpath counttomark array astore /gc xdf pop ct 39
0 put 10 fz 0 fs 2 F/|______Courier fnt invertflag{PaintBlack}if}N
/txpose{pxs pys scale ppr aload pop por{noflips{pop S neg S TR pop 1 -1
scale}if xflip yflip and{pop S neg S TR 180 rotate 1 -1 scale ppr 3 get
ppr 1 get neg sub neg ppr 2 get ppr 0 get neg sub neg TR}if xflip yflip
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TR}if xflip yflip not and{TR pop pop 90 rotate ppr 3 get ppr 1 get neg
sub neg 0 TR}if yflip xflip not and{TR pop pop 270 rotate ppr 2 get ppr
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div VResolution 72 div neg scale magscale{DVImag dup scale}if 0 setgray}
N /psfts{S 65781.76 div N}N /startTexFig{/psf$SavedState save N userdict
maxlength dict begin /magscale false def normalscale currentpoint TR
/psf$ury psfts /psf$urx psfts /psf$lly psfts /psf$llx psfts /psf$y psfts
/psf$x psfts currentpoint /psf$cy X /psf$cx X /psf$sx psf$x psf$urx
psf$llx sub div N /psf$sy psf$y psf$ury psf$lly sub div N psf$sx psf$sy
scale psf$cx psf$sx div psf$llx sub psf$cy psf$sy div psf$ury sub TR
/showpage{}N /erasepage{}N /copypage{}N /p 3 def @MacSetUp}N /doclip{
psf$llx psf$lly psf$urx psf$ury currentpoint 6 2 roll newpath 4 copy 4 2
roll moveto 6 -1 roll S lineto S lineto S lineto closepath clip newpath
moveto}N /endTexFig{end psf$SavedState restore}N /@beginspecial{SDict
begin /SpecialSave save N gsave normalscale currentpoint TR
@SpecialDefaults count /ocount X /dcount countdictstack N}N /@setspecial
{CLIP 1 eq{newpath 0 0 moveto hs 0 rlineto 0 vs rlineto hs neg 0 rlineto
closepath clip}if ho vo TR hsc vsc scale ang rotate rwiSeen{rwi urx llx
sub div rhiSeen{rhi ury lly sub div}{dup}ifelse scale llx neg lly neg TR
}{rhiSeen{rhi ury lly sub div dup scale llx neg lly neg TR}if}ifelse
CLIP 2 eq{newpath llx lly moveto urx lly lineto urx ury lineto llx ury
lineto closepath clip}if /showpage{}N /erasepage{}N /copypage{}N newpath
}N /@endspecial{count ocount sub{pop}repeat countdictstack dcount sub{
end}repeat grestore SpecialSave restore end}N /@defspecial{SDict begin}
N /@fedspecial{end}B /li{lineto}B /rl{rlineto}B /rc{rcurveto}B /np{
/SaveX currentpoint /SaveY X N 1 setlinecap newpath}N /st{stroke SaveX
SaveY moveto}N /fil{fill SaveX SaveY moveto}N /ellipse{/endangle X
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TeXDict begin 40258431 52099146 1200 400 400
(/tmp_mnt/d6/faculty/radin/graphics/dots5.dvi) @start
end
%%EndProlog
%%BeginSetup
%%Feature: *Resolution 400dpi
TeXDict begin
%%EndSetup
%%Page: 1 1
1 0 bop 100 2230 a @beginspecial 140 @llx 446 @lly 384
@urx 622 @ury 4500 @rwi @setspecial
%%BeginDocument: dots4.ps
%AI3_ColorUsage: Black&White
%AI3_TemplateBox: 306 396 306 396
%AI3_TileBox: 30 31 582 761
%AI3_DocumentPreview: Header
userdict /Adobe_packedarray 5 dict dup begin put
/initialize % - initialize -
{
/packedarray where
{
pop
}
{
Adobe_packedarray begin
Adobe_packedarray
{
dup xcheck
{
bind
} if
userdict 3 1 roll put
} forall
end
} ifelse
} def
/terminate % - terminate -
{
} def
/packedarray % arguments count packedarray array
{
array astore readonly
} def
/setpacking % boolean setpacking -
{
pop
} def
/currentpacking % - setpacking boolean
{
false
} def
currentdict readonly pop end
Adobe_packedarray /initialize get exec
currentpacking true setpacking
userdict /Adobe_cmykcolor 4 dict dup begin put
/initialize % - initialize -
{
/setcmykcolor where
{
pop
}
{
userdict /Adobe_cmykcolor_vars 2 dict dup begin put
/_setrgbcolor
/setrgbcolor load def
/_currentrgbcolor
/currentrgbcolor load def
Adobe_cmykcolor begin
Adobe_cmykcolor
{
dup xcheck
{
bind
} if
pop pop
} forall
end
end
Adobe_cmykcolor begin
} ifelse
} def
/terminate % - terminate -
{
currentdict Adobe_cmykcolor eq
{
end
} if
} def
/setcmykcolor % cyan magenta yellow black setcmykcolor -
{
1 sub 4 1 roll
3
{
3 index add neg dup 0 lt
{
pop 0
} if
3 1 roll
} repeat
Adobe_cmykcolor_vars /_setrgbcolor get exec
pop
} def
/currentcmykcolor % - currentcmykcolor cyan magenta yellow black
{
Adobe_cmykcolor_vars /_currentrgbcolor get exec
3
{
1 sub neg 3 1 roll
} repeat
0
} def
currentdict readonly pop end
setpacking
currentpacking true setpacking
userdict /Adobe_cshow 3 dict dup begin put
/initialize % - initialize -
{
/cshow where
{
pop
}
{
userdict /Adobe_cshow_vars 1 dict dup begin put
/_cshow % - _cshow proc
{} def
Adobe_cshow begin
Adobe_cshow
{
dup xcheck
{
bind
} if
userdict 3 1 roll put
} forall
end
end
} ifelse
} def
/terminate % - terminate -
{
} def
/cshow % proc string cshow -
{
exch
Adobe_cshow_vars
exch /_cshow
exch put
{
0 0 Adobe_cshow_vars /_cshow get exec
} forall
} def
currentdict readonly pop end
setpacking
currentpacking true setpacking
userdict /Adobe_customcolor 5 dict dup begin put
/initialize % - initialize -
{
/setcustomcolor where
{
pop
}
{
Adobe_customcolor begin
Adobe_customcolor
{
dup xcheck
{
bind
} if
pop pop
} forall
end
Adobe_customcolor begin
} ifelse
} def
/terminate % - terminate -
{
currentdict Adobe_customcolor eq
{
end
} if
} def
/findcmykcustomcolor % cyan magenta yellow black name findcmykcustomcolor object
{
5 packedarray
}  def
/setcustomcolor % object tint setcustomcolor -
{
exch
aload pop pop
4
{
4 index mul 4 1 roll
} repeat
5 -1 roll pop
setcmykcolor
} def
/setoverprint % boolean setoverprint -
{
pop
} def
currentdict readonly pop end
setpacking
currentpacking true setpacking
userdict /Adobe_IllustratorA_AI3 61 dict dup begin put
% initialization
/initialize % - initialize -
{
% 47 vars, but leave slack of 10 entries for custom Postscript fragments
userdict /Adobe_IllustratorA_AI3_vars 57 dict dup begin put
% paint operands
/_lp /none def
/_pf {} def
/_ps {} def
/_psf {} def
/_pss {} def
/_pjsf {} def
/_pjss {} def
/_pola 0 def
/_doClip 0 def
% paint operators
/cf currentflat def % - cf flatness
% typography operands
/_tm matrix def
/_renderStart [/e0 /r0 /a0 /o0 /e1 /r1 /a1 /i0] def
/_renderEnd [null null null null /i1 /i1 /i1 /i1] def
/_render -1 def
/_rise 0 def
/_ax 0 def % x character spacing (_ax, _ay, _cx, _cy follows awidthshow naming convention)
/_ay 0 def % y character spacing
/_cx 0 def % x word spacing
/_cy 0 def % y word spacing
/_leading [0 0] def
/_ctm matrix def
/_mtx matrix def
/_sp 16#020 def
/_hyphen (-) def
/_fScl 0 def
/_cnt 0 def
/_hs 1 def
/_nativeEncoding 0 def
/_useNativeEncoding 0 def
/_tempEncode 0 def
/_pntr 0 def
/_tDict 2 dict def
% typography operators
/Tx {} def
/Tj {} def
% compound path operators
/CRender {} def
% printing
/_AI3_savepage {} def
% color operands
/_gf null def
/_cf 4 array def
/_if null def
/_of false def
/_fc {} def
/_gs null def
/_cs 4 array def
/_is null def
/_os false def
/_sc {} def
/_i null def
Adobe_IllustratorA_AI3 begin
Adobe_IllustratorA_AI3
{
dup xcheck
{
bind
} if
pop pop
} forall
end
end
Adobe_IllustratorA_AI3 begin
Adobe_IllustratorA_AI3_vars begin
newpath
} def
/terminate % - terminate -
{
end
end
} def
% definition operators
/_ % - _ null
null def
/ddef % key value ddef -
{
Adobe_IllustratorA_AI3_vars 3 1 roll put
} def
/xput % key value literal xput -
{
dup load dup length exch maxlength eq
{
dup dup load dup
length 2 mul dict copy def
} if
load begin def end
} def
/npop % integer npop -
{
{
pop
} repeat
} def
% marking operators
/sw % ax ay string sw x y
{
dup length exch stringwidth
exch 5 -1 roll 3 index 1 sub mul add
4 1 roll 3 1 roll 1 sub mul add
} def
/swj % cx cy fillchar ax ay string swj x y
{
dup 4 1 roll
dup length exch stringwidth
exch 5 -1 roll 3 index 1 sub mul add
4 1 roll 3 1 roll 1 sub mul add
6 2 roll /_cnt 0 ddef
{1 index eq {/_cnt _cnt 1 add ddef} if} forall pop
exch _cnt mul exch _cnt mul 2 index add 4 1 roll 2 index add 4 1 roll pop pop
} def
/ss % ax ay string matrix ss -
{
4 1 roll
{ % matrix ax ay char 0 0 {proc} -
2 npop
(0) exch 2 copy 0 exch put pop
gsave
false charpath currentpoint
4 index setmatrix
stroke
grestore
moveto
2 copy rmoveto
} exch cshow
3 npop
} def
/jss % cx cy fillchar ax ay string matrix jss -
{
4 1 roll
{ % cx cy fillchar matrix ax ay char 0 0 {proc} -
2 npop
(0) exch 2 copy 0 exch put
gsave
_sp eq
{
exch 6 index 6 index 6 index 5 -1 roll widthshow
currentpoint
}
{
false charpath currentpoint
4 index setmatrix stroke
}ifelse
grestore
moveto
2 copy rmoveto
} exch cshow
6 npop
} def
% path operators
/sp % ax ay string sp -
{
{
2 npop (0) exch
2 copy 0 exch put pop
false charpath
2 copy rmoveto
} exch cshow
2 npop
} def
/jsp % cx cy fillchar ax ay string jsp -
{
{ % cx cy fillchar ax ay char 0 0 {proc} -
2 npop
(0) exch 2 copy 0 exch put
_sp eq
{
exch 5 index 5 index 5 index 5 -1 roll widthshow
}
{
false charpath
}ifelse
2 copy rmoveto
} exch cshow
5 npop
} def
% path construction operators
/pl % x y pl x y
{
transform
0.25 sub round 0.25 add exch
0.25 sub round 0.25 add exch
itransform
} def
/setstrokeadjust where
{
pop true setstrokeadjust
/c % x1 y1 x2 y2 x3 y3 c -
{
curveto
} def
/C
/c load def
/v % x2 y2 x3 y3 v -
{
currentpoint 6 2 roll curveto
} def
/V
/v load def
/y % x1 y1 x2 y2 y -
{
2 copy curveto
} def
/Y
/y load def
/l % x y l -
{
lineto
} def
/L
/l load def
/m % x y m -
{
moveto
} def
}
{%else
/c
{
pl curveto
} def
/C
/c load def
/v
{
currentpoint 6 2 roll pl curveto
} def
/V
/v load def
/y
{
pl 2 copy curveto
} def
/Y
/y load def
/l
{
pl lineto
} def
/L
/l load def
/m
{
pl moveto
} def
}ifelse
% graphic state operators
/d % array phase d -
{
setdash
} def
/cf {} def % - cf flatness
/i % flatness i -
{
dup 0 eq
{
pop cf
} if
setflat
} def
/j % linejoin j -
{
setlinejoin
} def
/J % linecap J -
{
setlinecap
} def
/M % miterlimit M -
{
setmiterlimit
} def
/w % linewidth w -
{
setlinewidth
} def
% path painting operators
/H % - H -
{} def
/h % - h -
{
closepath
} def
/N % - N -
{
_pola 0 eq
{
_doClip 1 eq {clip /_doClip 0 ddef} if
newpath
}
{
/CRender {N} ddef
}ifelse
} def
/n % - n -
{N} def
/F % - F -
{
_pola 0 eq
{
_doClip 1 eq
{
gsave _pf grestore clip newpath /_lp /none ddef _fc
/_doClip 0 ddef
}
{
_pf
}ifelse
}
{
/CRender {F} ddef
}ifelse
} def
/f % - f -
{
closepath
F
} def
/S % - S -
{
_pola 0 eq
{
_doClip 1 eq
{
gsave _ps grestore clip newpath /_lp /none ddef _sc
/_doClip 0 ddef
}
{
_ps
}ifelse
}
{
/CRender {S} ddef
}ifelse
} def
/s % - s -
{
closepath
S
} def
/B % - B -
{
_pola 0 eq
{
_doClip 1 eq  % F clears _doClip
gsave F grestore
{
gsave S grestore clip newpath /_lp /none ddef _sc
/_doClip 0 ddef
}
{
S
}ifelse
}
{
/CRender {B} ddef
}ifelse
} def
/b % - b -
{
closepath
B
} def
/W % - W -
{
/_doClip 1 ddef
} def
/* % - [string] * -
{
count 0 ne
{
dup type (stringtype) eq {pop} if
} if
_pola 0 eq {newpath} if
} def
% group operators
/u % - u -
{} def
/U % - U -
{} def
/q % - q -
{
_pola 0 eq {gsave} if
} def
/Q % - Q -
{
_pola 0 eq {grestore} if
} def
/*u % - *u -
{
_pola 1 add /_pola exch ddef
} def
/*U % - *U -
{
_pola 1 sub /_pola exch ddef
_pola 0 eq {CRender} if
} def
/D % polarized D -
{pop} def
/*w % - *w -
{} def
/*W % - *W -
{} def
% place operators
/` % matrix llx lly urx ury string ` -
{
/_i save ddef
6 1 roll 4 npop
concat
userdict begin
/showpage {} def
false setoverprint
pop
} def
/~ % - ~ -
{
end
_i restore
} def
% color operators
/O % flag O -
{
0 ne
/_of exch ddef
/_lp /none ddef
} def
/R % flag R -
{
0 ne
/_os exch ddef
/_lp /none ddef
} def
/g % gray g -
{
/_gf exch ddef
/_fc
{
_lp /fill ne
{
_of setoverprint
_gf setgray
/_lp /fill ddef
} if
} ddef
/_pf
{
_fc
fill
} ddef
/_psf
{
_fc
ashow
} ddef
/_pjsf
{
_fc
awidthshow
} ddef
/_lp /none ddef
} def
/G % gray G -
{
/_gs exch ddef
/_sc
{
_lp /stroke ne
{
_os setoverprint
_gs setgray
/_lp /stroke ddef
} if
} ddef
/_ps
{
_sc
stroke
} ddef
/_pss
{
_sc
ss
} ddef
/_pjss
{
_sc
jss
} ddef
/_lp /none ddef
} def
/k % cyan magenta yellow black k -
{
_cf astore pop
/_fc
{
_lp /fill ne
{
_of setoverprint
_cf aload pop setcmykcolor
/_lp /fill ddef
} if
} ddef
/_pf
{
_fc
fill
} ddef
/_psf
{
_fc
ashow
} ddef
/_pjsf
{
_fc
awidthshow
} ddef
/_lp /none ddef
} def
/K % cyan magenta yellow black K -
{
_cs astore pop
/_sc
{
_lp /stroke ne
{
_os setoverprint
_cs aload pop setcmykcolor
/_lp /stroke ddef
} if
} ddef
/_ps
{
_sc
stroke
} ddef
/_pss
{
_sc
ss
} ddef
/_pjss
{
_sc
jss
} ddef
/_lp /none ddef
} def
/x % cyan magenta yellow black name gray x -
{
/_gf exch ddef
findcmykcustomcolor
/_if exch ddef
/_fc
{
_lp /fill ne
{
_of setoverprint
_if _gf 1 exch sub setcustomcolor
/_lp /fill ddef
} if
} ddef
/_pf
{
_fc
fill
} ddef
/_psf
{
_fc
ashow
} ddef
/_pjsf
{
_fc
awidthshow
} ddef
/_lp /none ddef
} def
/X % cyan magenta yellow black name gray X -
{
/_gs exch ddef
findcmykcustomcolor
/_is exch ddef
/_sc
{
_lp /stroke ne
{
_os setoverprint
_is _gs 1 exch sub setcustomcolor
/_lp /stroke ddef
} if
} ddef
/_ps
{
_sc
stroke
} ddef
/_pss
{
_sc
ss
} ddef
/_pjss
{
_sc
jss
} ddef
/_lp /none ddef
} def
% locked object operator
/A % value A -
{
pop
} def
currentdict readonly pop end
setpacking
% annotate page operator
/annotatepage
{
} def
%AI3-Grid.0 18 18 3 0 0 0 3
Adobe_cmykcolor /initialize get exec
Adobe_cshow /initialize get exec
Adobe_customcolor /initialize get exec
Adobe_IllustratorA_AI3 /initialize get exec
0 A
u
u
0 R
0 G
0 i 0 J 0 j 1 w 4 M []0 d
%AI3_Note:
0 D
%DVIPSCommandLine: dvips -B -o fault2.ps fault2
%DVIPSParameters: dpi=400, comments removed
%DVIPSSource:  TeX output 1994.06.23:1108
/TeXDict 250 dict def TeXDict begin /N{def}def /B{bind def}N /S{exch}N
/X{S N}B /TR{translate}N /isls false N /vsize 11 72 mul N /hsize 8.5 72
mul N /landplus90{false}def /@rigin{isls{[0 landplus90{1 -1}{-1 1}
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isls{landplus90{VResolution 72 div vsize mul 0 exch}{Resolution -72 div
hsize mul 0}ifelse TR}if Resolution VResolution vsize -72 div 1 add mul
TR[matrix currentmatrix{dup dup round sub abs 0.00001 lt{round}if}
forall round exch round exch]setmatrix}N /@landscape{/isls true N}B
/@manualfeed{statusdict /manualfeed true put}B /@copies{/#copies X}B
/FMat[1 0 0 -1 0 0]N /FBB[0 0 0 0]N /nn 0 N /IE 0 N /ctr 0 N /df-tail{
/nn 8 dict N nn begin /FontType 3 N /FontMatrix fntrx N /FontBBox FBB N
string /base X array /BitMaps X /BuildChar{CharBuilder}N /Encoding IE N
end dup{/foo setfont}2 array copy cvx N load 0 nn put /ctr 0 N[}B /df{
/sf 1 N /fntrx FMat N df-tail}B /dfs{div /sf X /fntrx[sf 0 0 sf neg 0 0]
N df-tail}B /E{pop nn dup definefont setfont}B /ch-width{ch-data dup
length 5 sub get}B /ch-height{ch-data dup length 4 sub get}B /ch-xoff{
128 ch-data dup length 3 sub get sub}B /ch-yoff{ch-data dup length 2 sub
get 127 sub}B /ch-dx{ch-data dup length 1 sub get}B /ch-image{ch-data
dup type /stringtype ne{ctr get /ctr ctr 1 add N}if}B /id 0 N /rw 0 N
/rc 0 N /gp 0 N /cp 0 N /G 0 N /sf 0 N /CharBuilder{save 3 1 roll S dup
/base get 2 index get S /BitMaps get S get /ch-data X pop /ctr 0 N ch-dx
0 ch-xoff ch-yoff ch-height sub ch-xoff ch-width add ch-yoff
setcachedevice ch-width ch-height true[1 0 0 -1 -.1 ch-xoff sub ch-yoff
.1 sub]{ch-image}imagemask restore}B /D{/cc X dup type /stringtype ne{]}
if nn /base get cc ctr put nn /BitMaps get S ctr S sf 1 ne{dup dup
length 1 sub dup 2 index S get sf div put}if put /ctr ctr 1 add N}B /I{
cc 1 add D}B /bop{userdict /bop-hook known{bop-hook}if /SI save N @rigin
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0 0 moveto /V matrix currentmatrix dup 1 get dup mul exch 0 get dup mul
add .99 lt{/QV}{/RV}ifelse load def pop pop}N /eop{SI restore showpage
userdict /eop-hook known{eop-hook}if}N /@start{userdict /start-hook
known{start-hook}if pop /VResolution X /Resolution X 1000 div /DVImag X
/IE 256 array N 0 1 255{IE S 1 string dup 0 3 index put cvn put}for
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{}B /RV statusdict begin /product where{pop product dup length 7 ge{0 7
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rlineto rulex neg 0 rlineto fill grestore}B /a{moveto}B /delta 0 N /tail
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%1 0 bop eop
%%Page: 2 2
2 1 bop 200 4822 a @beginspecial 173 @llx 273 @lly 418
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%%BeginDocument: junk7.ps
%AI3_ColorUsage: Black&White
%AI3_TemplateBox: 306 396 306 396
%AI3_TileBox: 30 31 582 761
%AI3_DocumentPreview: Header
userdict /Adobe_packedarray 5 dict dup begin put
/initialize % - initialize -
{
/packedarray where
{
pop
}
{
Adobe_packedarray begin
Adobe_packedarray
{
dup xcheck
{
bind
} if
userdict 3 1 roll put
} forall
end
} ifelse
} def
/terminate % - terminate -
{
} def
/packedarray % arguments count packedarray array
{
array astore readonly
} def
/setpacking % boolean setpacking -
{
pop
} def
/currentpacking % - setpacking boolean
{
false
} def
currentdict readonly pop end
Adobe_packedarray /initialize get exec
currentpacking true setpacking
userdict /Adobe_cmykcolor 4 dict dup begin put
/initialize % - initialize -
{
/setcmykcolor where
{
pop
}
{
userdict /Adobe_cmykcolor_vars 2 dict dup begin put
/_setrgbcolor
/setrgbcolor load def
/_currentrgbcolor
/currentrgbcolor load def
Adobe_cmykcolor begin
Adobe_cmykcolor
{
dup xcheck
{
bind
} if
pop pop
} forall
end
end
Adobe_cmykcolor begin
} ifelse
} def
/terminate % - terminate -
{
currentdict Adobe_cmykcolor eq
{
end
} if
} def
/setcmykcolor % cyan magenta yellow black setcmykcolor -
{
1 sub 4 1 roll
3
{
3 index add neg dup 0 lt
{
pop 0
} if
3 1 roll
} repeat
Adobe_cmykcolor_vars /_setrgbcolor get exec
pop
} def
/currentcmykcolor % - currentcmykcolor cyan magenta yellow black
{
Adobe_cmykcolor_vars /_currentrgbcolor get exec
3
{
1 sub neg 3 1 roll
} repeat
0
} def
currentdict readonly pop end
setpacking
currentpacking true setpacking
userdict /Adobe_cshow 3 dict dup begin put
/initialize % - initialize -
{
/cshow where
{
pop
}
{
userdict /Adobe_cshow_vars 1 dict dup begin put
/_cshow % - _cshow proc
{} def
Adobe_cshow begin
Adobe_cshow
{
dup xcheck
{
bind
} if
userdict 3 1 roll put
} forall
end
end
} ifelse
} def
/terminate % - terminate -
{
} def
/cshow % proc string cshow -
{
exch
Adobe_cshow_vars
exch /_cshow
exch put
{
0 0 Adobe_cshow_vars /_cshow get exec
} forall
} def
currentdict readonly pop end
setpacking
currentpacking true setpacking
userdict /Adobe_customcolor 5 dict dup begin put
/initialize % - initialize -
{
/setcustomcolor where
{
pop
}
{
Adobe_customcolor begin
Adobe_customcolor
{
dup xcheck
{
bind
} if
pop pop
} forall
end
Adobe_customcolor begin
} ifelse
} def
/terminate % - terminate -
{
currentdict Adobe_customcolor eq
{
end
} if
} def
/findcmykcustomcolor % cyan magenta yellow black name findcmykcustomcolor object
{
5 packedarray
}  def
/setcustomcolor % object tint setcustomcolor -
{
exch
aload pop pop
4
{
4 index mul 4 1 roll
} repeat
5 -1 roll pop
setcmykcolor
} def
/setoverprint % boolean setoverprint -
{
pop
} def
currentdict readonly pop end
setpacking
currentpacking true setpacking
userdict /Adobe_IllustratorA_AI3 61 dict dup begin put
% initialization
/initialize % - initialize -
{
% 47 vars, but leave slack of 10 entries for custom Postscript fragments
userdict /Adobe_IllustratorA_AI3_vars 57 dict dup begin put
% paint operands
/_lp /none def
/_pf {} def
/_ps {} def
/_psf {} def
/_pss {} def
/_pjsf {} def
/_pjss {} def
/_pola 0 def
/_doClip 0 def
% paint operators
/cf currentflat def % - cf flatness
% typography operands
/_tm matrix def
/_renderStart [/e0 /r0 /a0 /o0 /e1 /r1 /a1 /i0] def
/_renderEnd [null null null null /i1 /i1 /i1 /i1] def
/_render -1 def
/_rise 0 def
/_ax 0 def % x character spacing (_ax, _ay, _cx, _cy follows awidthshow naming convention)
/_ay 0 def % y character spacing
/_cx 0 def % x word spacing
/_cy 0 def % y word spacing
/_leading [0 0] def
/_ctm matrix def
/_mtx matrix def
/_sp 16#020 def
/_hyphen (-) def
/_fScl 0 def
/_cnt 0 def
/_hs 1 def
/_nativeEncoding 0 def
/_useNativeEncoding 0 def
/_tempEncode 0 def
/_pntr 0 def
/_tDict 2 dict def
% typography operators
/Tx {} def
/Tj {} def
% compound path operators
/CRender {} def
% printing
/_AI3_savepage {} def
% color operands
/_gf null def
/_cf 4 array def
/_if null def
/_of false def
/_fc {} def
/_gs null def
/_cs 4 array def
/_is null def
/_os false def
/_sc {} def
/_i null def
Adobe_IllustratorA_AI3 begin
Adobe_IllustratorA_AI3
{
dup xcheck
{
bind
} if
pop pop
} forall
end
end
Adobe_IllustratorA_AI3 begin
Adobe_IllustratorA_AI3_vars begin
newpath
} def
/terminate % - terminate -
{
end
end
} def
% definition operators
/_ % - _ null
null def
/ddef % key value ddef -
{
Adobe_IllustratorA_AI3_vars 3 1 roll put
} def
/xput % key value literal xput -
{
dup load dup length exch maxlength eq
{
dup dup load dup
length 2 mul dict copy def
} if
load begin def end
} def
/npop % integer npop -
{
{
pop
} repeat
} def
% marking operators
/sw % ax ay string sw x y
{
dup length exch stringwidth
exch 5 -1 roll 3 index 1 sub mul add
4 1 roll 3 1 roll 1 sub mul add
} def
/swj % cx cy fillchar ax ay string swj x y
{
dup 4 1 roll
dup length exch stringwidth
exch 5 -1 roll 3 index 1 sub mul add
4 1 roll 3 1 roll 1 sub mul add
6 2 roll /_cnt 0 ddef
{1 index eq {/_cnt _cnt 1 add ddef} if} forall pop
exch _cnt mul exch _cnt mul 2 index add 4 1 roll 2 index add 4 1 roll pop pop
} def
/ss % ax ay string matrix ss -
{
4 1 roll
{ % matrix ax ay char 0 0 {proc} -
2 npop
(0) exch 2 copy 0 exch put pop
gsave
false charpath currentpoint
4 index setmatrix
stroke
grestore
moveto
2 copy rmoveto
} exch cshow
3 npop
} def
/jss % cx cy fillchar ax ay string matrix jss -
{
4 1 roll
{ % cx cy fillchar matrix ax ay char 0 0 {proc} -
2 npop
(0) exch 2 copy 0 exch put
gsave
_sp eq
{
exch 6 index 6 index 6 index 5 -1 roll widthshow
currentpoint
}
{
false charpath currentpoint
4 index setmatrix stroke
}ifelse
grestore
moveto
2 copy rmoveto
} exch cshow
6 npop
} def
% path operators
/sp % ax ay string sp -
{
{
2 npop (0) exch
2 copy 0 exch put pop
false charpath
2 copy rmoveto
} exch cshow
2 npop
} def
/jsp % cx cy fillchar ax ay string jsp -
{
{ % cx cy fillchar ax ay char 0 0 {proc} -
2 npop
(0) exch 2 copy 0 exch put
_sp eq
{
exch 5 index 5 index 5 index 5 -1 roll widthshow
}
{
false charpath
}ifelse
2 copy rmoveto
} exch cshow
5 npop
} def
% path construction operators
/pl % x y pl x y
{
transform
0.25 sub round 0.25 add exch
0.25 sub round 0.25 add exch
itransform
} def
/setstrokeadjust where
{
pop true setstrokeadjust
/c % x1 y1 x2 y2 x3 y3 c -
{
curveto
} def
/C
/c load def
/v % x2 y2 x3 y3 v -
{
currentpoint 6 2 roll curveto
} def
/V
/v load def
/y % x1 y1 x2 y2 y -
{
2 copy curveto
} def
/Y
/y load def
/l % x y l -
{
lineto
} def
/L
/l load def
/m % x y m -
{
moveto
} def
}
{%else
/c
{
pl curveto
} def
/C
/c load def
/v
{
currentpoint 6 2 roll pl curveto
} def
/V
/v load def
/y
{
pl 2 copy curveto
} def
/Y
/y load def
/l
{
pl lineto
} def
/L
/l load def
/m
{
pl moveto
} def
}ifelse
% graphic state operators
/d % array phase d -
{
setdash
} def
/cf {} def % - cf flatness
/i % flatness i -
{
dup 0 eq
{
pop cf
} if
setflat
} def
/j % linejoin j -
{
setlinejoin
} def
/J % linecap J -
{
setlinecap
} def
/M % miterlimit M -
{
setmiterlimit
} def
/w % linewidth w -
{
setlinewidth
} def
% path painting operators
/H % - H -
{} def
/h % - h -
{
closepath
} def
/N % - N -
{
_pola 0 eq
{
_doClip 1 eq {clip /_doClip 0 ddef} if
newpath
}
{
/CRender {N} ddef
}ifelse
} def
/n % - n -
{N} def
/F % - F -
{
_pola 0 eq
{
_doClip 1 eq
{
gsave _pf grestore clip newpath /_lp /none ddef _fc
/_doClip 0 ddef
}
{
_pf
}ifelse
}
{
/CRender {F} ddef
}ifelse
} def
/f % - f -
{
closepath
F
} def
/S % - S -
{
_pola 0 eq
{
_doClip 1 eq
{
gsave _ps grestore clip newpath /_lp /none ddef _sc
/_doClip 0 ddef
}
{
_ps
}ifelse
}
{
/CRender {S} ddef
}ifelse
} def
/s % - s -
{
closepath
S
} def
/B % - B -
{
_pola 0 eq
{
_doClip 1 eq  % F clears _doClip
gsave F grestore
{
gsave S grestore clip newpath /_lp /none ddef _sc
/_doClip 0 ddef
}
{
S
}ifelse
}
{
/CRender {B} ddef
}ifelse
} def
/b % - b -
{
closepath
B
} def
/W % - W -
{
/_doClip 1 ddef
} def
/* % - [string] * -
{
count 0 ne
{
dup type (stringtype) eq {pop} if
} if
_pola 0 eq {newpath} if
} def
% group operators
/u % - u -
{} def
/U % - U -
{} def
/q % - q -
{
_pola 0 eq {gsave} if
} def
/Q % - Q -
{
_pola 0 eq {grestore} if
} def
/*u % - *u -
{
_pola 1 add /_pola exch ddef
} def
/*U % - *U -
{
_pola 1 sub /_pola exch ddef
_pola 0 eq {CRender} if
} def
/D % polarized D -
{pop} def
/*w % - *w -
{} def
/*W % - *W -
{} def
% place operators
/` % matrix llx lly urx ury string ` -
{
/_i save ddef
6 1 roll 4 npop
concat
userdict begin
/showpage {} def
false setoverprint
pop
} def
/~ % - ~ -
{
end
_i restore
} def
% color operators
/O % flag O -
{
0 ne
/_of exch ddef
/_lp /none ddef
} def
/R % flag R -
{
0 ne
/_os exch ddef
/_lp /none ddef
} def
/g % gray g -
{
/_gf exch ddef
/_fc
{
_lp /fill ne
{
_of setoverprint
_gf setgray
/_lp /fill ddef
} if
} ddef
/_pf
{
_fc
fill
} ddef
/_psf
{
_fc
ashow
} ddef
/_pjsf
{
_fc
awidthshow
} ddef
/_lp /none ddef
} def
/G % gray G -
{
/_gs exch ddef
/_sc
{
_lp /stroke ne
{
_os setoverprint
_gs setgray
/_lp /stroke ddef
} if
} ddef
/_ps
{
_sc
stroke
} ddef
/_pss
{
_sc
ss
} ddef
/_pjss
{
_sc
jss
} ddef
/_lp /none ddef
} def
/k % cyan magenta yellow black k -
{
_cf astore pop
/_fc
{
_lp /fill ne
{
_of setoverprint
_cf aload pop setcmykcolor
/_lp /fill ddef
} if
} ddef
/_pf
{
_fc
fill
} ddef
/_psf
{
_fc
ashow
} ddef
/_pjsf
{
_fc
awidthshow
} ddef
/_lp /none ddef
} def
/K % cyan magenta yellow black K -
{
_cs astore pop
/_sc
{
_lp /stroke ne
{
_os setoverprint
_cs aload pop setcmykcolor
/_lp /stroke ddef
} if
} ddef
/_ps
{
_sc
stroke
} ddef
/_pss
{
_sc
ss
} ddef
/_pjss
{
_sc
jss
} ddef
/_lp /none ddef
} def
/x % cyan magenta yellow black name gray x -
{
/_gf exch ddef
findcmykcustomcolor
/_if exch ddef
/_fc
{
_lp /fill ne
{
_of setoverprint
_if _gf 1 exch sub setcustomcolor
/_lp /fill ddef
} if
} ddef
/_pf
{
_fc
fill
} ddef
/_psf
{
_fc
ashow
} ddef
/_pjsf
{
_fc
awidthshow
} ddef
/_lp /none ddef
} def
/X % cyan magenta yellow black name gray X -
{
/_gs exch ddef
findcmykcustomcolor
/_is exch ddef
/_sc
{
_lp /stroke ne
{
_os setoverprint
_is _gs 1 exch sub setcustomcolor
/_lp /stroke ddef
} if
} ddef
/_ps
{
_sc
stroke
} ddef
/_pss
{
_sc
ss
} ddef
/_pjss
{
_sc
jss
} ddef
/_lp /none ddef
} def
% locked object operator
/A % value A -
{
pop
} def
currentdict readonly pop end
setpacking
% annotate page operator
/annotatepage
{
} def
%AI3-Grid.0 18 18 3 0 0 0 3
Adobe_cmykcolor /initialize get exec
Adobe_cshow /initialize get exec
Adobe_customcolor /initialize get exec
Adobe_IllustratorA_AI3 /initialize get exec
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0 R
0 G
0 i 0 J 0 j 1 w 4 M []0 d
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  setrgbcolor newpath moveto lineto lineto
  closepath fill
} bind def
/l {
  setrgbcolor newpath moveto lineto stroke
} bind def

0 0 moveto 928 0 lineto 928 698 lineto 0 698 lineto
1 1 1 setrgbcolor closepath fill
1 0 0 0 466.71 219.002 485.78 224.276 461.922 233.879 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 466.71 219.002 461.922 233.879 451.68 230.142 456.513 215.078 0.494118 0.494118 0.494118 epoly
1 0 0 0 461.359 199.974 471.511 204.086 466.711 219.002 456.513 215.078 0.498039 0.498039 0.498039 epoly
1 0 0 0 473.732 229.126 475.985 254.54 461.921 233.879 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 473.732 229.126 461.921 233.879 451.679 230.142 463.531 225.292 0.780392 0.780392 0.780392 epoly
1 0 0 0 416.893 201.895 403.826 182.11 421.714 186.688 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 475.985 254.54 465.735 250.992 451.679 230.142 461.921 233.879 0.537255 0.537255 0.537255 epoly
1 0 0 0 466.711 219.002 475.625 220.342 456.513 215.078 0.8 0.8 0.8 epoly
1 0 0 0 432.404 190.984 450.955 195.761 427.628 206 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 432.404 190.984 427.628 206 416.893 201.895 421.714 186.688 0.498039 0.498039 0.498039 epoly
1 0 0 0 485.78 224.276 475.625 220.342 451.68 230.142 461.922 233.879 0.780392 0.780392 0.780392 epoly
1 0 0 0 461.359 199.974 480.589 204.956 471.511 204.086 0.8 0.8 0.8 epoly
1 0 0 0 392.858 177.734 403.826 182.11 416.893 201.895 405.892 197.687 0.537255 0.537255 0.537255 epoly
1 0 0 0 485.78 224.276 466.71 219.002 456.513 215.078 475.625 220.342 0.8 0.8 0.8 epoly
1 0 0 0 439.174 200.933 441.184 226.314 427.628 206 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 392.858 177.734 410.757 182.285 421.714 186.688 403.826 182.11 0.8 0.8 0.8 epoly
1 0 0 0 480.589 204.956 475.625 220.342 466.711 219.002 471.511 204.086 0.172549 0.172549 0.172549 epoly
1 0 0 0 468.429 210.068 451.679 230.143 461.358 199.974 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 439.174 200.933 427.628 206 416.893 201.895 428.473 196.722 0.788235 0.788235 0.788235 epoly
1 0 0 0 451.68 230.142 475.625 220.342 456.513 215.078 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 475.985 254.54 473.732 229.126 463.531 225.292 465.735 250.992 0.478431 0.478431 0.478431 epoly
1 0 0 0 473.731 229.126 465.735 250.992 463.531 225.292 0.478431 0.478431 0.478431 epoly
1 0 0 0 451.679 230.143 441.184 226.314 450.954 195.761 461.358 199.974 0.494118 0.494118 0.494118 epoly
1 0 0 0 441.184 226.314 430.427 222.389 416.893 201.895 427.628 206 0.537255 0.537255 0.537255 epoly
1 0 0 0 475.625 220.342 485.781 224.276 473.731 229.126 463.531 225.292 0.780392 0.780392 0.780392 epoly
1 0 0 0 451.679 230.142 465.735 250.992 463.531 225.292 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 450.955 195.761 440.291 191.442 416.893 201.895 427.628 206 0.788235 0.788235 0.788235 epoly
1 0 0 0 475.625 220.343 451.679 230.143 468.429 210.068 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 450.955 195.761 432.404 190.984 421.714 186.688 440.291 191.442 0.8 0.8 0.8 epoly
1 0 0 0 465.736 250.991 451.68 230.142 470.674 235.687 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 450.956 195.761 441.185 226.314 439.174 200.933 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 480.589 204.956 461.359 199.974 456.513 215.078 475.625 220.342 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 441.184 226.314 458.02 205.944 468.429 210.068 451.679 230.143 0.709804 0.709804 0.709804 epoly
1 0 0 0 451.679 230.143 468.429 210.068 458.02 205.944 441.184 226.314 0.709804 0.709804 0.709804 epoly
1 0 0 0 477.944 246.271 465.735 250.992 473.731 229.126 485.781 224.276 0.278431 0.278431 0.278431 epoly
1 0 0 0 470.674 235.687 451.68 230.142 475.625 220.342 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 410.757 182.285 392.858 177.734 405.892 197.687 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 468.429 210.068 461.358 199.974 450.954 195.761 458.02 205.944 0.533333 0.533333 0.533333 epoly
1 0 0 0 475.625 220.343 461.359 199.974 480.59 204.956 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 441.185 226.312 451.68 230.142 465.736 250.991 455.229 247.354 0.537255 0.537255 0.537255 epoly
1 0 0 0 488.148 249.911 490.55 275.936 475.985 254.538 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 416.893 201.895 440.291 191.442 421.714 186.688 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 410.757 182.285 405.892 197.687 416.893 201.895 421.714 186.688 0.501961 0.501961 0.501961 epoly
1 0 0 0 441.185 226.312 460.214 231.853 470.674 235.687 451.68 230.142 0.8 0.8 0.8 epoly
1 0 0 0 451.68 230.142 470.674 235.687 460.214 231.853 441.185 226.312 0.8 0.8 0.8 epoly
1 0 0 0 430.427 222.389 428.473 196.722 439.174 200.933 441.185 226.314 0.482353 0.482353 0.482353 epoly
1 0 0 0 441.184 226.314 439.174 200.933 428.473 196.722 430.427 222.389 0.482353 0.482353 0.482353 epoly
1 0 0 0 441.184 226.314 451.679 230.143 475.625 220.343 465.214 216.31 0.784314 0.784314 0.784314 epoly
1 0 0 0 451.68 230.142 441.185 226.312 465.214 216.31 475.625 220.342 0.784314 0.784314 0.784314 epoly
1 0 0 0 490.698 209.084 510.624 214.276 485.781 224.276 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 490.698 209.084 485.781 224.276 475.625 220.342 480.59 204.956 0.494118 0.494118 0.494118 epoly
1 0 0 0 428.473 196.722 440.292 191.443 450.956 195.761 439.174 200.933 0.792157 0.792157 0.792157 epoly
1 0 0 0 416.893 201.895 430.427 222.389 428.473 196.722 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 488.148 249.911 475.985 254.538 465.735 250.991 477.944 246.269 0.776471 0.776471 0.776471 epoly
1 0 0 0 450.956 195.761 461.359 199.974 475.625 220.343 465.214 216.31 0.537255 0.537255 0.537255 epoly
1 0 0 0 421.714 186.688 440.291 191.442 435.353 206.936 416.893 201.895 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 450.956 195.761 470.227 200.724 480.59 204.956 461.359 199.974 0.8 0.8 0.8 epoly
1 0 0 0 450.954 195.761 441.184 226.314 458.02 205.944 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 475.625 220.342 477.944 246.271 485.781 224.276 0.478431 0.478431 0.478431 epoly
1 0 0 0 430.427 222.387 416.893 201.895 435.353 206.936 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 477.944 246.271 475.625 220.342 463.531 225.292 465.735 250.992 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 490.55 275.936 480.299 272.595 465.735 250.991 475.985 254.538 0.537255 0.537255 0.537255 epoly
1 0 0 0 430.427 222.389 441.185 226.314 450.956 195.761 440.292 191.443 0.498039 0.498039 0.498039 epoly
1 0 0 0 405.892 197.687 416.893 201.895 430.427 222.387 419.398 218.362 0.537255 0.537255 0.537255 epoly
1 0 0 0 405.892 197.687 424.37 202.71 435.353 206.936 416.893 201.895 0.8 0.8 0.8 epoly
1 0 0 0 424.37 202.71 416.893 201.895 435.353 206.936 0.8 0.8 0.8 epoly
1 0 0 0 458.02 205.944 465.214 216.31 475.625 220.343 468.429 210.068 0.537255 0.537255 0.537255 epoly
1 0 0 0 421.714 186.688 416.893 201.895 424.37 202.71 429.357 187.014 0.172549 0.172549 0.172549 epoly
1 0 0 0 458.02 205.944 441.184 226.314 465.214 216.31 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 465.735 250.991 475.625 220.341 477.944 246.269 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 440.291 191.442 421.714 186.688 429.357 187.014 0.8 0.8 0.8 epoly
1 0 0 0 510.624 214.276 500.572 210.133 475.625 220.342 485.781 224.276 0.780392 0.780392 0.780392 epoly
1 0 0 0 460.214 231.853 441.185 226.312 455.229 247.354 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 428.473 196.722 430.427 222.389 440.292 191.443 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 450.956 195.761 470.227 200.724 465.214 216.31 446.064 211.057 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 510.624 214.276 490.698 209.084 480.59 204.956 500.572 210.133 0.8 0.8 0.8 epoly
1 0 0 0 465.214 216.31 441.185 226.312 460.214 231.853 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 460.214 231.853 455.229 247.354 465.736 250.991 470.674 235.687 0.494118 0.494118 0.494118 epoly
1 0 0 0 490.55 275.936 488.148 249.911 477.944 246.269 480.299 272.595 0.478431 0.478431 0.478431 epoly
1 0 0 0 465.214 216.308 475.625 220.341 465.735 250.991 455.228 247.354 0.494118 0.494118 0.494118 epoly
1 0 0 0 470.227 200.724 450.956 195.761 465.214 216.31 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 470.674 235.687 475.625 220.342 465.214 216.31 460.214 231.853 0.494118 0.494118 0.494118 epoly
1 0 0 0 465.735 250.991 480.299 272.595 477.944 246.269 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 475.625 220.342 500.572 210.133 480.59 204.956 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 470.227 200.724 465.214 216.31 475.625 220.343 480.59 204.956 0.494118 0.494118 0.494118 epoly
1 0 0 0 454.537 212.175 446.064 211.057 465.214 216.31 0.8 0.8 0.8 epoly
1 0 0 0 467.482 242.534 455.228 247.354 465.735 250.991 477.944 246.269 0.780392 0.780392 0.780392 epoly
1 0 0 0 450.956 195.761 446.064 211.057 454.537 212.175 459.599 196.384 0.172549 0.172549 0.172549 epoly
1 0 0 0 470.227 200.724 450.956 195.761 459.599 196.384 0.8 0.8 0.8 epoly
1 0 0 0 465.214 216.308 467.482 242.534 477.944 246.269 475.625 220.341 0.478431 0.478431 0.478431 epoly
1 0 0 0 495.548 260.582 515.878 266.863 490.55 275.935 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 495.548 260.582 490.55 275.935 480.299 272.593 485.346 257.042 0.490196 0.490196 0.490196 epoly
1 0 0 0 424.37 202.71 405.892 197.687 419.398 218.362 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 490.407 241.449 500.56 245.189 495.548 260.582 485.346 257.042 0.490196 0.490196 0.490196 epoly
1 0 0 0 503.083 271.446 505.645 298.11 490.55 275.935 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 424.37 202.71 419.398 218.362 430.427 222.387 435.353 206.936 0.498039 0.498039 0.498039 epoly
1 0 0 0 440.291 191.442 429.357 187.014 424.37 202.71 435.353 206.936 0.498039 0.498039 0.498039 epoly
1 0 0 0 503.083 271.446 490.55 275.935 480.299 272.593 492.885 268.012 0.772549 0.772549 0.772549 epoly
1 0 0 0 500.571 210.133 510.624 214.275 505.585 229.753 495.482 225.812 0.494118 0.494118 0.494118 epoly
1 0 0 0 467.482 242.534 465.214 216.308 455.228 247.354 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 444.454 243.625 430.428 222.387 449.489 227.922 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 505.645 298.11 495.399 294.992 480.299 272.593 490.55 275.935 0.537255 0.537255 0.537255 epoly
1 0 0 0 495.548 260.582 505.736 263.334 485.346 257.042 0.8 0.8 0.8 epoly
1 0 0 0 460.214 231.853 479.995 237.613 455.229 247.354 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 460.214 231.853 455.229 247.354 444.454 243.625 449.489 227.922 0.494118 0.494118 0.494118 epoly
1 0 0 0 515.878 266.863 505.736 263.334 480.299 272.593 490.55 275.935 0.772549 0.772549 0.772549 epoly
1 0 0 0 505.587 229.754 500.561 245.189 479.995 237.613 485.12 221.77 0.490196 0.490196 0.490196 epoly
1 0 0 0 490.407 241.449 510.926 247.439 500.56 245.189 0.8 0.8 0.8 epoly
1 0 0 0 419.398 218.362 430.428 222.387 444.454 243.625 433.402 239.8 0.537255 0.537255 0.537255 epoly
1 0 0 0 460.214 231.853 449.489 227.922 454.537 212.175 465.214 216.31 0.494118 0.494118 0.494118 epoly
1 0 0 0 515.878 266.863 495.548 260.582 485.346 257.042 505.736 263.334 0.8 0.8 0.8 epoly
1 0 0 0 467.482 242.534 469.786 269.168 455.228 247.354 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 419.398 218.362 438.486 223.888 449.489 227.922 430.428 222.387 0.8 0.8 0.8 epoly
1 0 0 0 510.926 247.439 505.736 263.334 495.548 260.582 500.56 245.189 0.172549 0.172549 0.172549 epoly
1 0 0 0 505.587 229.754 500.572 226.618 495.407 242.509 500.561 245.189 0.466667 0.466667 0.466667 epoly
1 0 0 0 500.561 245.189 495.407 242.509 500.572 226.618 505.587 229.754 0.466667 0.466667 0.466667 epoly
1 0 0 0 505.585 229.753 516.131 231.5 495.482 225.812 0.8 0.8 0.8 epoly
1 0 0 0 470.227 200.724 459.599 196.384 454.537 212.175 465.214 216.31 0.494118 0.494118 0.494118 epoly
1 0 0 0 500.561 245.189 505.587 229.754 516.132 231.5 510.927 247.439 0.172549 0.172549 0.172549 epoly
1 0 0 0 479.995 237.613 500.561 245.189 495.407 242.509 0.8 0.8 0.8 epoly
1 0 0 0 498.002 252.291 480.299 272.595 490.408 241.449 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 467.482 242.534 455.228 247.354 444.453 243.625 456.751 238.704 0.780392 0.780392 0.780392 epoly
1 0 0 0 460.214 231.853 479.995 237.613 449.489 227.922 0.8 0.8 0.8 epoly
1 0 0 0 500.571 210.133 521.35 215.516 510.624 214.275 0.8 0.8 0.8 epoly
1 0 0 0 479.995 237.613 460.214 231.853 465.214 216.31 485.121 221.77 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 521.35 215.516 516.131 231.5 505.585 229.753 510.624 214.275 0.172549 0.172549 0.172549 epoly
1 0 0 0 500.572 226.618 505.587 229.754 485.12 221.77 0.8 0.8 0.8 epoly
1 0 0 0 495.407 242.509 500.561 245.189 510.927 247.439 0.8 0.8 0.8 epoly
1 0 0 0 454.537 212.175 485.121 221.77 465.214 216.31 0.8 0.8 0.8 epoly
1 0 0 0 480.299 272.593 505.736 263.334 485.346 257.042 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 505.645 298.11 503.083 271.446 492.885 268.012 495.399 294.992 0.478431 0.478431 0.478431 epoly
1 0 0 0 503.082 271.446 495.398 294.992 492.884 268.012 0.478431 0.478431 0.478431 epoly
1 0 0 0 480.299 272.595 469.786 269.168 479.995 237.613 490.408 241.449 0.490196 0.490196 0.490196 epoly
1 0 0 0 516.132 231.5 505.587 229.754 500.572 226.618 0.8 0.8 0.8 epoly
1 0 0 0 469.786 269.168 459 265.652 444.453 243.625 455.228 247.354 0.537255 0.537255 0.537255 epoly
1 0 0 0 505.736 263.334 515.878 266.863 503.082 271.446 492.884 268.012 0.772549 0.772549 0.772549 epoly
1 0 0 0 480.299 272.593 495.399 294.992 492.885 268.012 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 485.12 221.77 465.213 216.31 490.26 205.884 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 479.995 237.613 469.312 233.677 444.454 243.625 455.229 247.354 0.780392 0.780392 0.780392 epoly
1 0 0 0 505.737 263.334 480.299 272.595 498.002 252.291 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 479.995 237.613 460.214 231.853 449.489 227.922 469.312 233.677 0.8 0.8 0.8 epoly
1 0 0 0 500.571 210.133 516.131 231.5 495.482 225.812 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 495.399 294.991 480.299 272.593 500.56 279.184 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 479.995 237.613 469.786 269.168 467.482 242.534 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 510.926 247.439 490.407 241.449 485.346 257.042 505.736 263.334 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 485.12 221.77 490.26 205.884 500.571 210.133 495.482 225.812 0.494118 0.494118 0.494118 epoly
1 0 0 0 469.786 269.168 487.591 248.56 498.002 252.291 480.299 272.595 0.705882 0.705882 0.705882 epoly
1 0 0 0 480.299 272.595 498.002 252.291 487.591 248.56 469.786 269.168 0.705882 0.705882 0.705882 epoly
1 0 0 0 508.379 290.566 495.398 294.992 503.082 271.446 515.878 266.863 0.282353 0.282353 0.282353 epoly
1 0 0 0 500.561 279.184 480.3 272.593 505.736 263.334 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 465.213 216.31 485.12 221.77 474.489 217.623 454.536 212.174 0.8 0.8 0.8 epoly
1 0 0 0 464.689 232.75 449.488 227.921 454.536 212.174 469.776 216.956 0.231373 0.231373 0.231373 epoly
1 0 0 0 465.213 216.31 454.536 212.174 479.68 201.524 490.26 205.884 0.784314 0.784314 0.784314 epoly
1 0 0 0 438.486 223.888 419.398 218.362 433.402 239.8 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 498.002 252.291 490.408 241.449 479.995 237.613 487.591 248.56 0.533333 0.533333 0.533333 epoly
1 0 0 0 479.995 237.613 485.121 221.77 454.537 212.175 449.489 227.922 0.231373 0.231373 0.231373 epoly
1 0 0 0 505.736 263.334 490.408 241.449 510.926 247.439 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 469.786 269.166 480.299 272.593 495.399 294.991 484.887 291.791 0.537255 0.537255 0.537255 epoly
1 0 0 0 521.35 215.516 500.571 210.133 495.482 225.812 516.131 231.5 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 518.567 293.772 521.297 321.104 505.644 298.108 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 444.454 243.625 469.312 233.677 449.489 227.922 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 438.486 223.888 433.402 239.8 444.454 243.625 449.489 227.922 0.494118 0.494118 0.494118 epoly
1 0 0 0 480.3 272.593 500.561 279.184 490.1 275.775 469.786 269.166 0.8 0.8 0.8 epoly
1 0 0 0 469.786 269.166 490.1 275.775 500.56 279.184 480.299 272.593 0.8 0.8 0.8 epoly
1 0 0 0 469.786 269.168 467.482 242.534 456.751 238.704 459 265.652 0.478431 0.478431 0.478431 epoly
1 0 0 0 459 265.652 456.751 238.704 467.482 242.534 469.786 269.168 0.482353 0.482353 0.482353 epoly
1 0 0 0 480.3 272.593 469.786 269.166 495.329 259.712 505.736 263.334 0.772549 0.772549 0.772549 epoly
1 0 0 0 469.786 269.168 480.299 272.595 505.737 263.334 495.33 259.713 0.776471 0.776471 0.776471 epoly
1 0 0 0 521.016 251.176 542.292 257.403 515.878 266.863 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 521.016 251.176 515.878 266.863 505.736 263.334 510.926 247.439 0.490196 0.490196 0.490196 epoly
1 0 0 0 469.776 216.956 485.121 221.77 479.996 237.613 464.689 232.75 0.231373 0.231373 0.231373 epoly
1 0 0 0 456.751 238.704 469.312 233.678 479.995 237.613 467.482 242.534 0.780392 0.780392 0.780392 epoly
1 0 0 0 444.453 243.625 459 265.652 456.751 238.704 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 518.567 293.772 505.644 298.108 495.398 294.99 508.379 290.564 0.768627 0.768627 0.768627 epoly
1 0 0 0 479.995 237.613 490.408 241.449 505.736 263.334 495.329 259.712 0.533333 0.533333 0.533333 epoly
1 0 0 0 449.488 227.921 469.311 233.677 464.148 249.686 444.454 243.625 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 479.995 237.613 500.572 243.604 510.926 247.439 490.408 241.449 0.8 0.8 0.8 epoly
1 0 0 0 479.995 237.613 469.786 269.168 487.591 248.56 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 505.736 263.334 508.379 290.566 515.878 266.863 0.478431 0.478431 0.478431 epoly
1 0 0 0 459 265.65 444.454 243.625 464.148 249.686 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 505.83 227.451 485.12 221.77 495.482 225.812 516.131 231.5 0.8 0.8 0.8 epoly
1 0 0 0 500.572 226.618 485.12 221.77 479.995 237.613 495.407 242.509 0.231373 0.231373 0.231373 epoly
1 0 0 0 464.689 232.75 458.346 229.638 449.488 227.921 0.8 0.8 0.8 epoly
1 0 0 0 508.379 290.566 505.736 263.334 492.884 268.012 495.398 294.992 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 521.297 321.104 511.064 318.229 495.398 294.99 505.644 298.108 0.537255 0.537255 0.537255 epoly
1 0 0 0 505.83 227.451 516.131 231.5 500.571 210.133 490.26 205.884 0.533333 0.533333 0.533333 epoly
1 0 0 0 459.598 196.384 479.68 201.524 474.488 217.623 454.536 212.174 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 479.995 237.613 485.121 221.77 516.131 231.5 510.926 247.439 0.231373 0.231373 0.231373 epoly
1 0 0 0 459 265.652 469.786 269.168 479.995 237.613 469.312 233.678 0.494118 0.494118 0.494118 epoly
1 0 0 0 454.536 212.174 463.576 213.366 469.776 216.956 0.8 0.8 0.8 epoly
1 0 0 0 501.871 275.178 515.881 266.866 508.379 290.565 0.478431 0.478431 0.478431 epoly
1 0 0 0 433.402 239.8 444.454 243.625 459 265.65 447.932 262.042 0.537255 0.537255 0.537255 epoly
1 0 0 0 479.996 237.613 458.346 229.638 464.689 232.75 0.8 0.8 0.8 epoly
1 0 0 0 479.68 201.524 454.536 212.174 474.489 217.623 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 433.402 239.8 453.132 245.863 464.148 249.686 444.454 243.625 0.8 0.8 0.8 epoly
1 0 0 0 453.132 245.863 444.454 243.625 464.148 249.686 0.8 0.8 0.8 epoly
1 0 0 0 495.329 259.711 515.88 266.865 501.87 275.177 0.478431 0.478431 0.478431 epoly
1 0 0 0 487.591 248.56 495.33 259.713 505.737 263.334 498.002 252.291 0.533333 0.533333 0.533333 epoly
1 0 0 0 515.881 266.866 528.948 262.186 521.641 286.043 508.379 290.565 0.286275 0.286275 0.286275 epoly
1 0 0 0 449.488 227.921 444.454 243.625 453.132 245.863 458.347 229.638 0.172549 0.172549 0.172549 epoly
1 0 0 0 495.407 242.509 510.927 247.439 516.132 231.5 500.572 226.618 0.231373 0.231373 0.231373 epoly
1 0 0 0 487.591 248.56 469.786 269.168 495.33 259.713 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 469.776 216.956 463.576 213.366 485.121 221.77 0.8 0.8 0.8 epoly
1 0 0 0 495.398 294.99 505.736 263.332 508.379 290.564 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 469.311 233.677 449.488 227.921 458.347 229.638 0.8 0.8 0.8 epoly
1 0 0 0 528.947 262.186 515.096 270.477 501.87 275.177 515.88 266.865 0.54902 0.54902 0.54902 epoly
1 0 0 0 515.881 266.866 501.871 275.178 515.097 270.477 528.948 262.186 0.545098 0.545098 0.545098 epoly
1 0 0 0 542.292 257.403 532.277 253.673 505.736 263.334 515.878 266.863 0.768627 0.768627 0.768627 epoly
1 0 0 0 500.572 243.604 479.995 237.613 510.926 247.439 0.8 0.8 0.8 epoly
1 0 0 0 458.346 229.638 463.576 213.366 454.536 212.174 449.488 227.921 0.172549 0.172549 0.172549 epoly
1 0 0 0 485.12 221.77 505.83 227.451 490.26 205.884 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 490.1 275.775 469.786 269.166 484.887 291.791 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 456.751 238.704 459 265.652 469.312 233.678 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 485.12 221.77 490.26 205.884 479.68 201.524 474.489 217.623 0.494118 0.494118 0.494118 epoly
1 0 0 0 542.292 257.403 521.016 251.176 510.926 247.439 532.277 253.673 0.8 0.8 0.8 epoly
1 0 0 0 528.947 262.186 515.88 266.865 495.329 259.711 508.518 254.83 0.768627 0.768627 0.768627 epoly
1 0 0 0 495.329 259.712 469.786 269.166 490.1 275.775 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 463.576 213.367 454.536 212.174 474.488 217.623 0.8 0.8 0.8 epoly
1 0 0 0 516.131 231.5 485.121 221.77 505.83 227.451 0.8 0.8 0.8 epoly
1 0 0 0 459.598 196.384 454.536 212.174 463.576 213.367 468.821 197.049 0.172549 0.172549 0.172549 epoly
1 0 0 0 490.1 275.775 484.887 291.791 495.399 294.991 500.56 279.184 0.490196 0.490196 0.490196 epoly
1 0 0 0 479.995 237.613 500.572 243.604 505.83 227.451 485.121 221.77 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 521.297 321.104 518.567 293.772 508.379 290.564 511.064 318.229 0.478431 0.478431 0.478431 epoly
1 0 0 0 463.576 213.366 469.776 216.956 464.689 232.75 458.346 229.638 0.466667 0.466667 0.466667 epoly
1 0 0 0 458.346 229.638 464.689 232.75 469.776 216.956 463.576 213.366 0.466667 0.466667 0.466667 epoly
1 0 0 0 479.68 201.524 459.598 196.384 468.821 197.049 0.8 0.8 0.8 epoly
1 0 0 0 495.329 259.711 505.736 263.332 495.398 294.99 484.886 291.791 0.490196 0.490196 0.490196 epoly
1 0 0 0 500.572 243.604 479.995 237.613 495.329 259.712 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 500.561 279.184 505.736 263.334 495.329 259.712 490.1 275.775 0.490196 0.490196 0.490196 epoly
1 0 0 0 495.398 294.99 511.064 318.229 508.379 290.564 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 463.576 213.366 458.346 229.638 479.996 237.613 485.121 221.77 0.494118 0.494118 0.494118 epoly
1 0 0 0 505.736 263.334 532.277 253.673 510.926 247.439 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 500.572 243.604 495.329 259.712 505.736 263.334 510.926 247.439 0.490196 0.490196 0.490196 epoly
1 0 0 0 528.945 262.183 521.64 286.043 518.864 258.555 0.47451 0.47451 0.47451 epoly
1 0 0 0 497.924 287.272 484.886 291.791 495.398 294.99 508.379 290.564 0.768627 0.768627 0.768627 epoly
1 0 0 0 500.572 243.604 510.926 247.439 516.131 231.5 505.83 227.451 0.490196 0.490196 0.490196 epoly
1 0 0 0 532.278 253.673 542.292 257.403 528.945 262.183 518.864 258.555 0.772549 0.772549 0.772549 epoly
1 0 0 0 495.329 259.711 497.924 287.272 508.379 290.564 505.736 263.332 0.478431 0.478431 0.478431 epoly
1 0 0 0 511.104 211.251 521.35 215.516 516.131 231.5 505.83 227.451 0.494118 0.494118 0.494118 epoly
1 0 0 0 453.132 245.863 433.402 239.8 447.932 262.042 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 521.641 286.043 528.948 262.186 515.097 270.477 0.478431 0.478431 0.478431 epoly
1 0 0 0 487.591 248.56 505.831 227.449 495.33 259.713 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 515.096 270.477 528.947 262.186 508.518 254.83 0.478431 0.478431 0.478431 epoly
1 0 0 0 534.63 316.933 537.54 344.966 521.297 321.103 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 453.132 245.863 447.932 262.042 459 265.65 464.148 249.686 0.494118 0.494118 0.494118 epoly
1 0 0 0 535.192 281.423 521.64 286.043 528.945 262.183 542.292 257.403 0.290196 0.290196 0.290196 epoly
1 0 0 0 469.311 233.677 458.347 229.638 453.132 245.863 464.148 249.686 0.494118 0.494118 0.494118 epoly
1 0 0 0 534.63 316.933 521.297 321.103 511.065 318.227 524.463 313.971 0.764706 0.764706 0.764706 epoly
1 0 0 0 497.924 287.272 495.329 259.711 508.379 290.564 0.478431 0.478431 0.478431 epoly
1 0 0 0 487.591 248.56 495.33 259.713 484.647 255.995 476.907 244.731 0.533333 0.533333 0.533333 epoly
1 0 0 0 484.647 255.995 459 265.652 476.907 244.731 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 501.871 275.178 508.379 290.565 521.641 286.043 515.097 270.477 0.341176 0.341176 0.341176 epoly
1 0 0 0 497.924 287.272 495.329 259.711 484.886 291.791 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 505.831 227.449 487.591 248.56 476.907 244.731 495.257 223.293 0.701961 0.701961 0.701961 epoly
1 0 0 0 547.578 241.366 569.862 247.529 542.292 257.403 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 547.578 241.366 542.292 257.403 532.278 253.673 537.619 237.419 0.490196 0.490196 0.490196 epoly
1 0 0 0 495.329 259.711 508.518 254.83 521.641 286.042 508.379 290.564 0.337255 0.337255 0.337255 epoly
1 0 0 0 474.097 288.508 459.001 265.651 479.364 272.275 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 516.131 231.5 527.393 233.365 505.83 227.451 0.8 0.8 0.8 epoly
1 0 0 0 479.68 201.524 468.821 197.049 463.576 213.367 474.488 217.623 0.494118 0.494118 0.494118 epoly
1 0 0 0 447.932 262.044 465.939 240.801 476.907 244.731 459 265.652 0.709804 0.709804 0.709804 epoly
1 0 0 0 545.249 284.818 542.292 257.402 559.027 280.194 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 532.278 253.673 521.64 286.043 518.864 258.555 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 537.54 344.966 527.329 342.354 511.065 318.227 521.297 321.103 0.537255 0.537255 0.537255 epoly
1 0 0 0 542.975 221.118 552.878 225.284 547.578 241.366 537.619 237.419 0.490196 0.490196 0.490196 epoly
1 0 0 0 511.104 211.251 532.806 216.841 521.35 215.516 0.8 0.8 0.8 epoly
1 0 0 0 515.096 270.477 508.518 254.83 495.329 259.711 501.87 275.177 0.341176 0.341176 0.341176 epoly
1 0 0 0 490.1 275.775 511.247 282.654 484.887 291.791 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 490.1 275.775 484.887 291.791 474.097 288.508 479.364 272.275 0.490196 0.490196 0.490196 epoly
1 0 0 0 532.806 216.841 527.393 233.365 516.131 231.5 521.35 215.516 0.172549 0.172549 0.172549 epoly
1 0 0 0 542.292 257.402 545.249 284.818 535.193 281.421 532.278 253.671 0.47451 0.47451 0.47451 epoly
1 0 0 0 532.278 253.673 535.192 281.423 542.292 257.403 0.47451 0.47451 0.47451 epoly
1 0 0 0 447.932 262.043 459.001 265.651 474.097 288.508 463.018 285.137 0.537255 0.537255 0.537255 epoly
1 0 0 0 497.924 287.272 508.379 290.564 521.641 286.042 511.248 282.654 0.768627 0.768627 0.768627 epoly
1 0 0 0 497.924 287.272 500.56 315.278 484.886 291.791 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 447.932 262.043 468.34 268.681 479.364 272.275 459.001 265.651 0.8 0.8 0.8 epoly
1 0 0 0 535.192 281.423 532.278 253.673 518.864 258.555 521.64 286.043 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 447.932 262.044 459 265.652 484.647 255.995 473.678 252.178 0.776471 0.776471 0.776471 epoly
1 0 0 0 500.572 243.604 521.995 249.842 495.329 259.712 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 500.572 243.604 495.329 259.712 484.646 255.995 489.944 239.668 0.490196 0.490196 0.490196 epoly
1 0 0 0 511.246 282.655 508.517 254.831 518.864 258.555 521.64 286.043 0.478431 0.478431 0.478431 epoly
1 0 0 0 505.831 227.449 495.257 223.293 484.647 255.995 495.33 259.713 0.490196 0.490196 0.490196 epoly
1 0 0 0 497.924 287.272 484.886 291.791 474.096 288.508 487.189 283.892 0.768627 0.768627 0.768627 epoly
1 0 0 0 505.83 227.451 521.995 249.842 500.572 243.604 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 495.256 223.294 479.681 201.524 500.584 206.874 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 489.944 239.668 495.256 223.294 505.83 227.451 500.572 243.604 0.494118 0.494118 0.494118 epoly
1 0 0 0 508.517 254.831 521.996 249.842 532.278 253.673 518.864 258.555 0.772549 0.772549 0.772549 epoly
1 0 0 0 495.329 259.711 497.924 287.272 511.248 282.654 508.518 254.83 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 542.292 257.402 532.278 253.671 549.045 276.698 559.027 280.194 0.533333 0.533333 0.533333 epoly
1 0 0 0 547.578 241.366 559.997 243.583 537.619 237.419 0.8 0.8 0.8 epoly
1 0 0 0 511.104 211.251 532.806 216.841 505.83 227.451 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 511.104 211.251 505.83 227.451 495.256 223.294 500.584 206.874 0.494118 0.494118 0.494118 epoly
1 0 0 0 537.54 344.966 534.63 316.933 524.463 313.971 527.329 342.354 0.478431 0.478431 0.478431 epoly
1 0 0 0 534.629 316.932 527.328 342.354 524.462 313.971 0.478431 0.478431 0.478431 epoly
1 0 0 0 484.647 255.995 495.257 223.293 476.907 244.731 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 569.862 247.529 559.997 243.583 532.278 253.673 542.292 257.403 0.768627 0.768627 0.768627 epoly
1 0 0 0 542.975 221.118 565.497 226.953 552.878 225.284 0.8 0.8 0.8 epoly
1 0 0 0 500.56 315.278 489.773 312.247 474.096 288.508 484.886 291.791 0.537255 0.537255 0.537255 epoly
1 0 0 0 468.822 197.049 479.681 201.524 495.256 223.294 484.398 219.026 0.533333 0.533333 0.533333 epoly
1 0 0 0 538.155 309.62 548.252 312.672 534.629 316.932 524.462 313.971 0.764706 0.764706 0.764706 epoly
1 0 0 0 569.862 247.529 547.578 241.366 537.619 237.419 559.997 243.583 0.8 0.8 0.8 epoly
1 0 0 0 511.065 318.227 527.329 342.354 524.463 313.971 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 521.641 286.042 508.518 254.83 511.248 282.654 0.478431 0.478431 0.478431 epoly
1 0 0 0 519.171 222.204 521.995 249.844 505.83 227.451 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 468.822 197.049 489.782 202.378 500.584 206.874 479.681 201.524 0.8 0.8 0.8 epoly
1 0 0 0 565.497 226.953 559.997 243.583 547.578 241.366 552.878 225.284 0.176471 0.176471 0.176471 epoly
1 0 0 0 511.247 282.654 500.573 279.174 474.097 288.508 484.887 291.791 0.768627 0.768627 0.768627 epoly
1 0 0 0 532.806 216.841 511.104 211.251 505.83 227.451 527.393 233.365 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 511.247 282.654 490.1 275.775 479.364 272.275 500.573 279.174 0.8 0.8 0.8 epoly
1 0 0 0 511.246 282.655 521.64 286.043 532.278 253.673 521.996 249.842 0.490196 0.490196 0.490196 epoly
1 0 0 0 551.404 232.243 532.277 253.674 542.974 221.118 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 476.907 244.733 495.256 223.294 503.269 234.493 484.646 255.996 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 519.171 222.204 505.83 227.451 495.255 223.294 508.659 217.931 0.776471 0.776471 0.776471 epoly
1 0 0 0 527.329 342.353 511.065 318.228 532.734 326.01 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 511.248 282.654 500.56 315.278 497.924 287.272 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 465.939 240.801 473.678 252.178 484.647 255.995 476.907 244.731 0.537255 0.537255 0.537255 epoly
1 0 0 0 545.249 284.818 559.027 280.194 549.045 276.698 535.193 281.421 0.764706 0.764706 0.764706 epoly
1 0 0 0 465.939 240.801 447.932 262.044 473.678 252.178 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 495.256 223.294 476.907 244.733 484.398 219.026 0.705882 0.705882 0.705882 epoly
1 0 0 0 541.166 338.283 527.328 342.354 534.629 316.932 548.252 312.672 0.286275 0.286275 0.286275 epoly
1 0 0 0 532.734 326.01 511.065 318.228 538.155 309.62 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 521.995 249.842 511.435 245.908 484.646 255.995 495.329 259.712 0.772549 0.772549 0.772549 epoly
1 0 0 0 521.64 286.042 514.021 310.931 511.247 282.653 0.478431 0.478431 0.478431 epoly
1 0 0 0 532.278 253.673 559.997 243.583 537.619 237.419 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 468.34 268.681 447.932 262.043 463.018 285.137 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 457.672 192.454 468.821 197.049 463.576 213.367 452.373 208.996 0.498039 0.498039 0.498039 epoly
1 0 0 0 521.995 249.842 500.572 243.604 489.944 239.668 511.435 245.908 0.8 0.8 0.8 epoly
1 0 0 0 511.435 245.908 489.944 239.668 500.572 243.604 521.995 249.842 0.8 0.8 0.8 epoly
1 0 0 0 532.277 253.674 521.995 249.844 532.805 216.84 542.974 221.118 0.490196 0.490196 0.490196 epoly
1 0 0 0 549.045 276.698 532.278 253.671 535.193 281.421 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 524.866 277.933 535.193 281.421 521.64 286.042 511.247 282.653 0.768627 0.768627 0.768627 epoly
1 0 0 0 508.517 254.831 511.246 282.655 521.996 249.842 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 500.561 315.276 511.065 318.228 527.329 342.353 516.842 339.67 0.537255 0.537255 0.537255 epoly
1 0 0 0 521.995 249.844 511.435 245.91 495.255 223.294 505.83 227.451 0.533333 0.533333 0.533333 epoly
1 0 0 0 511.435 245.908 521.995 249.842 505.83 227.451 495.256 223.294 0.533333 0.533333 0.533333 epoly
1 0 0 0 551.306 340.976 554.408 369.744 537.541 344.964 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 538.155 309.62 535.193 281.419 548.252 312.672 0.47451 0.47451 0.47451 epoly
1 0 0 0 474.097 288.508 500.573 279.174 479.364 272.275 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 468.34 268.681 463.018 285.137 474.097 288.508 479.364 272.275 0.490196 0.490196 0.490196 epoly
1 0 0 0 500.561 315.276 522.305 323.103 532.734 326.01 511.065 318.228 0.662745 0.662745 0.662745 epoly
1 0 0 0 511.065 318.228 532.734 326.01 522.305 323.103 500.561 315.276 0.662745 0.662745 0.662745 epoly
1 0 0 0 489.773 312.247 487.189 283.892 497.924 287.272 500.56 315.278 0.478431 0.478431 0.478431 epoly
1 0 0 0 500.56 315.278 497.924 287.272 487.189 283.892 489.773 312.247 0.478431 0.478431 0.478431 epoly
1 0 0 0 511.065 318.228 500.561 315.276 527.784 306.486 538.155 309.62 0.764706 0.764706 0.764706 epoly
1 0 0 0 532.806 216.841 522.362 212.447 495.256 223.294 505.83 227.451 0.776471 0.776471 0.776471 epoly
1 0 0 0 559.997 243.583 532.277 253.674 551.404 232.243 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 447.933 262.043 440.9 259.743 446.249 243.063 453.133 245.864 0.466667 0.466667 0.466667 epoly
1 0 0 0 487.189 283.892 500.573 279.174 511.248 282.654 497.924 287.272 0.772549 0.772549 0.772549 epoly
1 0 0 0 532.806 216.841 511.104 211.251 500.584 206.874 522.362 212.447 0.8 0.8 0.8 epoly
1 0 0 0 476.907 244.733 484.646 255.996 492.414 230.335 484.398 219.026 0.286275 0.286275 0.286275 epoly
1 0 0 0 474.096 288.508 489.773 312.247 487.189 283.892 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 535.193 281.419 549.045 276.696 562.176 308.317 548.252 312.672 0.341176 0.341176 0.341176 epoly
1 0 0 0 551.306 340.976 537.541 344.964 527.329 342.353 541.167 338.282 0.760784 0.760784 0.760784 epoly
1 0 0 0 532.806 216.841 521.995 249.844 519.171 222.204 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 527.783 306.488 514.021 310.931 521.64 286.042 535.193 281.421 0.286275 0.286275 0.286275 epoly
1 0 0 0 447.933 262.043 453.133 245.864 462.41 248.257 457.017 264.99 0.172549 0.172549 0.172549 epoly
1 0 0 0 463.578 213.367 458.348 229.639 435.528 221.232 440.866 204.508 0.494118 0.494118 0.494118 epoly
1 0 0 0 565.497 226.953 542.975 221.118 537.619 237.419 559.997 243.583 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 532.277 253.674 551.404 232.243 541.251 228.075 521.995 249.844 0.701961 0.701961 0.701961 epoly
1 0 0 0 521.995 249.844 541.251 228.075 551.404 232.243 532.277 253.674 0.701961 0.701961 0.701961 epoly
1 0 0 0 484.646 255.995 511.435 245.908 489.944 239.668 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 479.364 272.275 500.573 279.174 495.166 295.734 474.097 288.508 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 519.436 294.455 500.56 315.278 511.247 282.653 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 538.155 309.62 541.166 338.283 548.252 312.672 0.47451 0.47451 0.47451 epoly
1 0 0 0 463.578 213.367 456.996 209.556 451.615 226.334 458.348 229.639 0.466667 0.466667 0.466667 epoly
1 0 0 0 458.348 229.639 451.615 226.334 456.996 209.556 463.578 213.367 0.466667 0.466667 0.466667 epoly
1 0 0 0 489.944 239.668 511.435 245.908 495.256 223.294 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 489.774 312.246 474.097 288.508 495.166 295.734 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 489.782 202.378 468.822 197.049 484.398 219.026 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 551.404 232.243 542.974 221.118 532.805 216.84 541.251 228.075 0.533333 0.533333 0.533333 epoly
1 0 0 0 440.9 259.743 447.933 262.043 457.017 264.99 0.8 0.8 0.8 epoly
1 0 0 0 463.576 213.367 473.243 214.641 452.373 208.996 0.8 0.8 0.8 epoly
1 0 0 0 562.176 308.317 559.027 280.192 576.409 303.866 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 538.155 309.62 548.252 312.672 562.176 308.317 552.154 305.173 0.764706 0.764706 0.764706 epoly
1 0 0 0 559.996 243.583 542.974 221.118 565.496 226.952 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 541.166 338.283 538.155 309.62 524.462 313.971 527.328 342.354 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 549.045 276.698 538.155 309.622 535.193 281.421 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 554.408 369.744 544.228 367.419 527.329 342.353 537.541 344.964 0.537255 0.537255 0.537255 epoly
1 0 0 0 458.348 229.639 463.578 213.367 473.244 214.642 467.819 231.474 0.172549 0.172549 0.172549 epoly
1 0 0 0 435.528 221.232 458.348 229.639 451.615 226.334 0.8 0.8 0.8 epoly
1 0 0 0 511.436 245.908 484.645 255.996 503.268 234.493 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 495.256 223.294 522.362 212.447 500.584 206.874 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 489.782 202.378 484.398 219.026 495.256 223.294 500.584 206.874 0.494118 0.494118 0.494118 epoly
1 0 0 0 462.41 248.257 453.133 245.864 446.249 243.063 0.8 0.8 0.8 epoly
1 0 0 0 457.672 192.454 478.684 197.759 468.821 197.049 0.8 0.8 0.8 epoly
1 0 0 0 511.434 245.91 508.659 217.931 519.171 222.204 521.995 249.844 0.47451 0.47451 0.47451 epoly
1 0 0 0 521.995 249.844 519.171 222.204 508.659 217.931 511.435 245.91 0.47451 0.47451 0.47451 epoly
1 0 0 0 500.56 315.278 489.774 312.247 500.572 279.174 511.247 282.653 0.486275 0.486275 0.486275 epoly
1 0 0 0 489.773 312.247 500.56 315.278 511.248 282.654 500.573 279.174 0.490196 0.490196 0.490196 epoly
1 0 0 0 521.995 249.844 532.277 253.674 559.997 243.583 549.862 239.529 0.772549 0.772549 0.772549 epoly
1 0 0 0 492.414 230.335 484.646 255.996 503.269 234.493 0.705882 0.705882 0.705882 epoly
1 0 0 0 559.027 280.192 562.176 308.317 552.154 305.173 549.045 276.696 0.47451 0.47451 0.47451 epoly
1 0 0 0 575.302 231.126 598.665 237.213 569.861 247.529 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 478.684 197.759 473.243 214.641 463.576 213.367 468.821 197.049 0.172549 0.172549 0.172549 epoly
1 0 0 0 575.302 231.126 569.861 247.529 559.996 243.582 565.496 226.952 0.490196 0.490196 0.490196 epoly
1 0 0 0 456.996 209.556 463.578 213.367 440.866 204.508 0.8 0.8 0.8 epoly
1 0 0 0 463.018 285.137 474.097 288.508 489.774 312.246 478.693 309.132 0.537255 0.537255 0.537255 epoly
1 0 0 0 549.044 276.697 559.026 280.194 567.634 291.916 557.672 288.545 0.533333 0.533333 0.533333 epoly
1 0 0 0 508.659 217.931 522.362 212.447 532.806 216.841 519.171 222.204 0.780392 0.780392 0.780392 epoly
1 0 0 0 451.615 226.334 458.348 229.639 467.819 231.474 0.8 0.8 0.8 epoly
1 0 0 0 473.676 252.179 492.413 230.335 503.268 234.493 484.645 255.996 0.705882 0.705882 0.705882 epoly
1 0 0 0 495.255 223.294 511.435 245.91 508.659 217.931 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 463.018 285.137 484.142 292.39 495.166 295.734 474.097 288.508 0.662745 0.662745 0.662745 epoly
1 0 0 0 484.142 292.39 474.097 288.508 495.166 295.734 0.662745 0.662745 0.662745 epoly
1 0 0 0 549.044 276.697 568.756 255.141 559.026 280.194 0.698039 0.698039 0.698039 epoly
1 0 0 0 535.193 281.419 538.155 309.62 552.154 305.173 549.045 276.696 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 532.806 216.841 542.974 221.118 559.996 243.583 549.861 239.528 0.533333 0.533333 0.533333 epoly
1 0 0 0 479.364 272.275 474.097 288.508 484.142 292.39 489.607 275.599 0.172549 0.172549 0.172549 epoly
1 0 0 0 527.785 306.486 500.56 315.278 519.436 294.455 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 500.585 206.874 522.362 212.447 516.891 229.202 495.257 223.295 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 473.244 214.642 463.578 213.367 456.996 209.556 0.8 0.8 0.8 epoly
1 0 0 0 532.806 216.841 555.421 222.665 565.496 226.952 542.974 221.118 0.8 0.8 0.8 epoly
1 0 0 0 527.783 306.488 524.866 277.933 535.193 281.421 538.155 309.622 0.478431 0.478431 0.478431 epoly
1 0 0 0 495.256 223.294 484.398 219.026 492.414 230.335 503.269 234.493 0.533333 0.533333 0.533333 epoly
1 0 0 0 527.329 342.353 538.156 309.619 541.167 338.282 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 524.866 277.933 527.783 306.488 535.193 281.421 0.47451 0.47451 0.47451 epoly
1 0 0 0 500.573 279.174 479.364 272.275 489.607 275.599 0.8 0.8 0.8 epoly
1 0 0 0 377.511 184.679 396.789 189.808 372.341 201.191 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 377.511 184.679 372.341 201.191 359.783 196.609 365.004 179.866 0.501961 0.501961 0.501961 epoly
1 0 0 0 532.805 216.84 521.995 249.844 541.251 228.075 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 522.305 323.103 500.561 315.276 516.842 339.67 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 511.436 245.908 495.257 223.295 516.891 229.202 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 487.189 283.892 489.773 312.247 500.573 279.174 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 524.866 277.933 538.791 273.106 549.045 276.698 535.193 281.421 0.768627 0.768627 0.768627 epoly
1 0 0 0 500.56 315.278 519.436 294.455 508.769 291.102 489.774 312.247 0.701961 0.701961 0.701961 epoly
1 0 0 0 489.774 312.247 508.769 291.102 519.436 294.455 500.56 315.278 0.701961 0.701961 0.701961 epoly
1 0 0 0 524.866 277.933 527.783 306.488 511.247 282.653 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 527.783 306.488 524.866 277.933 511.247 282.653 514.021 310.931 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 527.784 306.486 500.561 315.276 522.305 323.103 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 562.176 308.317 549.045 276.696 552.154 305.173 0.47451 0.47451 0.47451 epoly
1 0 0 0 370.241 163.074 382.696 168.118 377.511 184.679 365.004 179.866 0.505882 0.505882 0.505882 epoly
1 0 0 0 559.027 280.192 549.045 276.696 566.469 300.625 576.409 303.866 0.533333 0.533333 0.533333 epoly
1 0 0 0 384.429 195.563 386.191 223.461 372.34 201.191 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 473.676 252.179 484.645 255.996 511.436 245.908 500.586 241.867 0.776471 0.776471 0.776471 epoly
1 0 0 0 522.305 323.103 516.842 339.67 527.329 342.353 532.734 326.01 0.486275 0.486275 0.486275 epoly
1 0 0 0 457.672 192.454 473.243 214.641 452.373 208.996 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 554.408 369.744 551.306 340.976 541.167 338.282 544.228 367.419 0.47451 0.47451 0.47451 epoly
1 0 0 0 519.436 294.455 511.247 282.653 500.572 279.174 508.769 291.102 0.533333 0.533333 0.533333 epoly
1 0 0 0 440.866 204.508 446.22 187.734 457.672 192.454 452.373 208.996 0.498039 0.498039 0.498039 epoly
1 0 0 0 527.785 306.485 538.156 309.619 527.329 342.353 516.842 339.67 0.486275 0.486275 0.486275 epoly
1 0 0 0 511.434 245.91 521.995 249.844 532.806 216.841 522.362 212.447 0.490196 0.490196 0.490196 epoly
1 0 0 0 568.756 255.141 577.688 266.929 567.634 291.916 559.026 280.194 0.286275 0.286275 0.286275 epoly
1 0 0 0 524.866 277.933 511.247 282.653 500.572 279.174 514.258 274.349 0.768627 0.768627 0.768627 epoly
1 0 0 0 484.398 219.026 495.257 223.295 511.436 245.908 500.586 241.867 0.533333 0.533333 0.533333 epoly
1 0 0 0 532.734 326.01 538.155 309.62 527.784 306.486 522.305 323.103 0.486275 0.486275 0.486275 epoly
1 0 0 0 567.634 291.916 587.505 270.635 576.409 303.866 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 527.329 342.353 544.228 367.419 541.167 338.282 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 535.774 244.743 538.79 273.107 521.995 249.842 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 384.429 195.563 372.34 201.191 359.782 196.609 371.895 190.852 0.796078 0.796078 0.796078 epoly
1 0 0 0 484.398 219.026 506.1 224.925 516.891 229.202 495.257 223.295 0.8 0.8 0.8 epoly
1 0 0 0 506.1 224.925 495.257 223.295 516.891 229.202 0.8 0.8 0.8 epoly
1 0 0 0 541.251 228.075 549.862 239.529 559.997 243.583 551.404 232.243 0.533333 0.533333 0.533333 epoly
1 0 0 0 489.774 312.247 500.56 315.278 527.785 306.486 517.128 303.266 0.768627 0.768627 0.768627 epoly
1 0 0 0 500.585 206.874 495.257 223.295 506.1 224.925 511.63 207.933 0.172549 0.172549 0.172549 epoly
1 0 0 0 541.251 228.075 521.995 249.844 549.862 239.529 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 543.591 293.183 566.467 300.624 538.155 309.62 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 543.591 293.183 538.155 309.62 527.784 306.486 533.279 289.82 0.486275 0.486275 0.486275 epoly
1 0 0 0 478.684 197.759 457.672 192.454 452.373 208.996 473.243 214.641 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 522.362 212.447 500.585 206.874 511.63 207.933 0.8 0.8 0.8 epoly
1 0 0 0 527.783 306.488 538.155 309.622 549.045 276.698 538.791 273.106 0.486275 0.486275 0.486275 epoly
1 0 0 0 598.665 237.213 588.973 233.035 559.996 243.582 569.861 247.529 0.768627 0.768627 0.768627 epoly
1 0 0 0 320.498 165.027 307.877 143.834 325.702 148.108 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 530.751 335.514 516.842 339.67 527.329 342.353 541.167 338.282 0.760784 0.760784 0.760784 epoly
1 0 0 0 535.774 244.743 521.995 249.842 511.435 245.908 525.283 240.695 0.772549 0.772549 0.772549 epoly
1 0 0 0 549.044 276.697 566.467 300.624 543.591 293.183 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 508.659 217.931 511.434 245.91 522.362 212.447 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 527.783 306.488 517.127 303.267 500.572 279.174 511.247 282.653 0.533333 0.533333 0.533333 epoly
1 0 0 0 533.279 289.82 538.79 273.106 549.044 276.697 543.591 293.183 0.486275 0.486275 0.486275 epoly
1 0 0 0 562.176 308.317 576.409 303.866 566.469 300.625 552.154 305.173 0.760784 0.760784 0.760784 epoly
1 0 0 0 598.665 237.213 575.302 231.126 565.496 226.952 588.973 233.035 0.803922 0.803922 0.803922 epoly
1 0 0 0 578.598 258.972 598.667 237.211 587.505 270.637 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 386.191 223.461 373.576 219.095 359.782 196.609 372.34 201.191 0.537255 0.537255 0.537255 epoly
1 0 0 0 489.773 312.245 500.574 279.172 503.297 307.806 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 567.634 291.916 576.409 303.866 566.469 300.625 557.672 288.545 0.533333 0.533333 0.533333 epoly
1 0 0 0 377.511 184.679 384.282 184.964 365.004 179.866 0.8 0.8 0.8 epoly
1 0 0 0 338.833 153.384 357.444 157.892 333.68 170.069 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 500.572 279.174 489.774 312.247 508.769 291.102 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 338.833 153.384 333.68 170.069 320.498 165.027 325.702 148.108 0.509804 0.509804 0.509804 epoly
1 0 0 0 527.785 306.485 530.751 335.514 541.167 338.282 538.156 309.619 0.478431 0.478431 0.478431 epoly
1 0 0 0 484.142 292.39 463.018 285.137 478.693 309.132 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 567.634 291.916 577.688 266.929 557.672 288.545 0.698039 0.698039 0.698039 epoly
1 0 0 0 396.789 189.808 384.282 184.964 359.783 196.609 372.341 201.191 0.796078 0.796078 0.796078 epoly
1 0 0 0 587.505 270.635 567.634 291.916 557.672 288.545 577.688 266.929 0.698039 0.698039 0.698039 epoly
1 0 0 0 566.469 300.625 549.045 276.696 552.154 305.173 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 370.241 163.074 389.659 167.822 382.696 168.118 0.8 0.8 0.8 epoly
1 0 0 0 294.423 138.467 307.877 143.834 320.498 165.027 306.953 159.846 0.541176 0.541176 0.541176 epoly
1 0 0 0 555.421 222.665 532.806 216.841 549.861 239.528 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 524.866 277.933 527.783 306.488 538.791 273.106 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 396.789 189.808 377.511 184.679 365.004 179.866 384.282 184.964 0.8 0.8 0.8 epoly
1 0 0 0 492.413 230.335 500.586 241.867 511.436 245.908 503.268 234.493 0.533333 0.533333 0.533333 epoly
1 0 0 0 538.79 273.107 528.253 269.417 511.435 245.908 521.995 249.842 0.533333 0.533333 0.533333 epoly
1 0 0 0 345.429 164.049 346.88 191.903 333.68 170.069 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 563.206 271.868 566.467 300.626 549.044 276.697 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 294.423 138.467 312.208 142.686 325.702 148.108 307.877 143.834 0.8 0.8 0.8 epoly
1 0 0 0 492.413 230.335 473.676 252.179 500.586 241.867 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 524.866 277.933 527.783 306.488 514.258 274.349 0.47451 0.47451 0.47451 epoly
1 0 0 0 389.659 167.822 384.282 184.964 377.511 184.679 382.696 168.118 0.172549 0.172549 0.172549 epoly
1 0 0 0 484.142 292.39 478.693 309.132 489.774 312.246 495.166 295.734 0.490196 0.490196 0.490196 epoly
1 0 0 0 500.572 279.174 511.436 245.907 514.258 274.349 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 461.78 210.135 440.866 204.508 452.373 208.996 473.243 214.641 0.8 0.8 0.8 epoly
1 0 0 0 578.598 258.972 587.505 270.637 577.688 266.93 568.756 255.143 0.533333 0.533333 0.533333 epoly
1 0 0 0 489.607 275.597 500.574 279.172 489.773 312.245 478.692 309.132 0.490196 0.490196 0.490196 epoly
1 0 0 0 456.996 209.556 440.866 204.508 435.528 221.232 451.615 226.334 0.231373 0.231373 0.231373 epoly
1 0 0 0 577.688 266.93 549.044 276.699 568.756 255.143 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 559.996 243.582 588.973 233.035 565.496 226.952 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 568.756 255.141 549.044 276.697 557.672 288.545 577.688 266.929 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 555.421 222.665 549.861 239.528 559.996 243.583 565.496 226.952 0.490196 0.490196 0.490196 epoly
1 0 0 0 461.78 210.135 473.243 214.641 457.672 192.454 446.22 187.734 0.533333 0.533333 0.533333 epoly
1 0 0 0 500.573 279.174 489.607 275.599 484.142 292.39 495.166 295.734 0.490196 0.490196 0.490196 epoly
1 0 0 0 440.9 259.743 457.017 264.99 462.41 248.257 446.249 243.063 0.227451 0.227451 0.227451 epoly
1 0 0 0 377.193 173.912 359.782 196.61 370.24 163.074 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 598.667 237.211 578.598 258.972 568.756 255.143 588.974 233.033 0.698039 0.698039 0.698039 epoly
1 0 0 0 345.429 164.049 333.68 170.069 320.498 165.027 332.26 158.867 0.803922 0.803922 0.803922 epoly
1 0 0 0 563.206 271.868 549.044 276.697 538.79 273.106 553.03 268.17 0.764706 0.764706 0.764706 epoly
1 0 0 0 527.783 306.488 524.866 277.933 538.791 273.106 541.857 301.944 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 435.529 221.232 440.867 204.508 473.243 214.641 467.818 231.474 0.227451 0.227451 0.227451 epoly
1 0 0 0 435.528 221.232 446.221 187.733 448.507 215.746 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 508.769 291.102 517.128 303.266 527.785 306.486 519.436 294.455 0.533333 0.533333 0.533333 epoly
1 0 0 0 538.79 273.108 558.642 251.208 568.756 255.143 549.044 276.699 0.701961 0.701961 0.701961 epoly
1 0 0 0 508.769 291.102 489.774 312.247 517.128 303.266 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 451.615 226.334 467.819 231.474 462.41 248.257 446.249 243.063 0.231373 0.231373 0.231373 epoly
1 0 0 0 527.783 306.488 524.866 277.933 514.258 274.349 517.127 303.267 0.478431 0.478431 0.478431 epoly
1 0 0 0 530.751 335.514 527.785 306.485 516.842 339.67 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 500.586 241.865 511.436 245.907 500.572 279.174 489.606 275.599 0.490196 0.490196 0.490196 epoly
1 0 0 0 566.467 300.624 556.252 297.294 527.784 306.486 538.155 309.62 0.764706 0.764706 0.764706 epoly
1 0 0 0 359.783 196.609 384.282 184.964 365.004 179.866 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 492.277 304.596 478.692 309.132 489.773 312.245 503.297 307.806 0.768627 0.768627 0.768627 epoly
1 0 0 0 386.191 223.461 384.429 195.563 371.895 190.852 373.576 219.095 0.486275 0.486275 0.486275 epoly
1 0 0 0 506.1 224.925 484.398 219.026 500.586 241.867 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 384.429 195.563 373.576 219.095 371.895 190.852 0.486275 0.486275 0.486275 epoly
1 0 0 0 359.782 196.61 346.88 191.902 357.443 157.892 370.24 163.074 0.501961 0.501961 0.501961 epoly
1 0 0 0 524.866 277.933 514.258 274.349 528.254 269.416 538.791 273.106 0.768627 0.768627 0.768627 epoly
1 0 0 0 492.276 304.595 500.573 279.172 503.296 307.806 0.478431 0.478431 0.478431 epoly
1 0 0 0 566.467 300.624 543.591 293.183 533.279 289.82 556.252 297.294 0.8 0.8 0.8 epoly
1 0 0 0 556.252 297.294 533.279 289.82 543.591 293.183 566.467 300.624 0.8 0.8 0.8 epoly
1 0 0 0 451.615 226.334 467.819 231.474 473.244 214.642 456.996 209.556 0.231373 0.231373 0.231373 epoly
1 0 0 0 500.572 279.174 517.127 303.267 514.258 274.349 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 587.505 270.635 577.688 266.929 566.469 300.625 576.409 303.866 0.486275 0.486275 0.486275 epoly
1 0 0 0 514.258 274.348 517.127 303.266 503.296 307.806 500.573 279.172 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 528.253 269.415 535.774 244.741 538.79 273.106 0.47451 0.47451 0.47451 epoly
1 0 0 0 346.88 191.903 333.62 187.064 320.498 165.027 333.68 170.069 0.537255 0.537255 0.537255 epoly
1 0 0 0 384.283 184.964 396.789 189.808 384.429 195.563 371.895 190.852 0.796078 0.796078 0.796078 epoly
1 0 0 0 549.862 239.527 553.03 268.17 538.79 273.106 535.774 244.741 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 511.436 245.908 514.257 274.351 500.586 241.867 0.47451 0.47451 0.47451 epoly
1 0 0 0 556.252 297.294 566.467 300.624 549.044 276.697 538.79 273.106 0.533333 0.533333 0.533333 epoly
1 0 0 0 566.467 300.626 556.252 297.295 538.79 273.106 549.044 276.697 0.533333 0.533333 0.533333 epoly
1 0 0 0 359.782 196.609 373.576 219.095 371.895 190.852 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 434.454 182.884 446.221 187.733 435.528 221.232 423.65 216.857 0.498039 0.498039 0.498039 epoly
1 0 0 0 489.607 275.597 492.277 304.596 503.297 307.806 500.574 279.172 0.478431 0.478431 0.478431 epoly
1 0 0 0 456.297 227.207 435.529 221.232 467.818 231.474 0.8 0.8 0.8 epoly
1 0 0 0 440.866 204.508 461.78 210.135 446.22 187.734 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 506.1 224.925 500.586 241.867 511.436 245.908 516.891 229.202 0.494118 0.494118 0.494118 epoly
1 0 0 0 538.79 273.107 535.774 244.743 525.283 240.695 528.253 269.417 0.47451 0.47451 0.47451 epoly
1 0 0 0 357.444 157.892 344.29 152.565 320.498 165.027 333.68 170.069 0.803922 0.803922 0.803922 epoly
1 0 0 0 532.055 256.944 535.775 244.742 549.864 239.528 546.258 251.811 0.294118 0.294118 0.294118 epoly
1 0 0 0 384.283 184.964 359.782 196.61 377.193 173.912 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 538.79 273.108 549.044 276.699 577.688 266.93 567.598 263.12 0.768627 0.768627 0.768627 epoly
1 0 0 0 503.356 270.667 489.606 275.599 500.572 279.174 514.258 274.349 0.772549 0.772549 0.772549 epoly
1 0 0 0 532.055 256.944 514.502 236.536 535.775 244.742 0.47451 0.47451 0.47451 epoly
1 0 0 0 357.444 157.892 338.833 153.384 325.702 148.108 344.29 152.565 0.8 0.8 0.8 epoly
1 0 0 0 473.243 214.641 440.867 204.508 461.78 210.135 0.8 0.8 0.8 epoly
1 0 0 0 522.362 212.447 511.63 207.933 506.1 224.925 516.891 229.202 0.490196 0.490196 0.490196 epoly
1 0 0 0 566.469 300.625 577.688 266.929 557.672 288.545 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 511.435 245.908 528.253 269.417 525.283 240.695 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 598.667 237.211 588.974 233.033 577.688 266.93 587.505 270.637 0.486275 0.486275 0.486275 epoly
1 0 0 0 514.257 274.351 511.436 245.908 525.284 240.695 528.254 269.417 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 435.529 221.232 456.297 227.207 461.78 210.135 440.867 204.508 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 373.577 219.094 359.783 196.609 378.922 202.054 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 357.445 157.892 346.881 191.903 345.429 164.049 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 389.659 167.822 370.241 163.074 365.004 179.866 384.282 184.964 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 577.688 266.93 566.468 300.626 563.206 271.868 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 346.88 191.902 364.365 168.828 377.193 173.912 359.782 196.61 0.72549 0.72549 0.72549 epoly
1 0 0 0 359.782 196.61 377.193 173.912 364.365 168.828 346.88 191.902 0.721569 0.721569 0.721569 epoly
1 0 0 0 386.088 213.481 373.576 219.095 384.429 195.563 396.789 189.808 0.254902 0.254902 0.254902 epoly
1 0 0 0 378.922 202.054 359.783 196.609 384.283 184.964 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 500.586 241.865 503.356 270.667 514.258 274.349 511.436 245.907 0.478431 0.478431 0.478431 epoly
1 0 0 0 448.507 215.746 446.221 187.733 461.781 210.136 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 436.673 211.245 423.65 216.857 435.528 221.232 448.507 215.746 0.788235 0.788235 0.788235 epoly
1 0 0 0 527.784 306.486 556.252 297.294 533.279 289.82 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 527.783 306.488 541.857 301.944 528.254 269.416 514.258 274.349 0.345098 0.345098 0.345098 epoly
1 0 0 0 462.41 248.257 438.928 240.085 446.249 243.063 0.8 0.8 0.8 epoly
1 0 0 0 456.297 227.207 435.529 221.232 461.78 210.135 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 312.208 142.686 294.423 138.467 306.953 159.846 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 530.751 335.514 527.785 306.485 544.977 331.263 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 511.436 245.908 500.586 241.867 514.502 236.534 525.284 240.695 0.772549 0.772549 0.772549 epoly
1 0 0 0 533.279 289.82 556.252 297.294 538.79 273.106 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 377.193 173.912 370.24 163.074 357.443 157.892 364.365 168.828 0.537255 0.537255 0.537255 epoly
1 0 0 0 514.258 274.348 500.573 279.172 492.276 304.595 506.172 299.955 0.286275 0.286275 0.286275 epoly
1 0 0 0 577.688 266.93 588.974 233.033 568.756 255.143 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 434.454 182.884 436.673 211.245 448.507 215.746 446.221 187.733 0.478431 0.478431 0.478431 epoly
1 0 0 0 446.221 187.733 448.507 215.746 436.673 211.245 434.454 182.884 0.478431 0.478431 0.478431 epoly
1 0 0 0 456.297 227.207 467.818 231.474 462.409 248.256 450.831 244.227 0.494118 0.494118 0.494118 epoly
1 0 0 0 549.862 239.527 535.774 244.741 528.253 269.415 542.571 264.368 0.301961 0.301961 0.301961 epoly
1 0 0 0 384.283 184.964 370.241 163.075 389.66 167.822 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 527.784 306.486 556.253 297.292 536.296 318.753 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 346.881 191.901 359.783 196.609 373.577 219.094 360.609 214.606 0.537255 0.537255 0.537255 epoly
1 0 0 0 451.615 226.334 444.453 222.82 467.819 231.474 0.8 0.8 0.8 epoly
1 0 0 0 492.277 304.596 489.607 275.597 478.692 309.132 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 528.254 269.416 541.857 301.944 538.791 273.106 0.47451 0.47451 0.47451 epoly
1 0 0 0 398.674 217.972 400.59 246.613 386.191 223.46 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 598.666 237.213 623.027 243.56 617.282 260.644 593.077 253.949 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 320.498 165.027 344.29 152.565 325.702 148.108 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 312.208 142.686 306.953 159.846 320.498 165.027 325.702 148.108 0.509804 0.509804 0.509804 epoly
1 0 0 0 527.785 306.485 530.751 335.514 520.045 332.669 517.128 303.264 0.478431 0.478431 0.478431 epoly
1 0 0 0 359.783 196.609 378.922 202.054 366.009 197.321 346.881 191.901 0.8 0.8 0.8 epoly
1 0 0 0 346.881 191.901 366.009 197.321 378.922 202.054 359.783 196.609 0.8 0.8 0.8 epoly
1 0 0 0 346.88 191.903 345.429 164.049 332.26 158.867 333.62 187.064 0.486275 0.486275 0.486275 epoly
1 0 0 0 333.62 187.064 332.26 158.867 345.429 164.049 346.881 191.903 0.490196 0.490196 0.490196 epoly
1 0 0 0 556.252 297.295 553.03 268.17 563.206 271.868 566.468 300.626 0.47451 0.47451 0.47451 epoly
1 0 0 0 566.467 300.626 563.206 271.868 553.03 268.17 556.252 297.295 0.47451 0.47451 0.47451 epoly
1 0 0 0 525.651 315.671 517.127 303.266 527.784 306.486 536.296 318.753 0.537255 0.537255 0.537255 epoly
1 0 0 0 346.88 191.902 359.782 196.61 384.283 184.964 371.426 179.984 0.8 0.8 0.8 epoly
1 0 0 0 359.783 196.609 346.881 191.901 371.426 179.984 384.283 184.964 0.796078 0.796078 0.796078 epoly
1 0 0 0 456.297 227.207 467.818 231.474 473.243 214.641 461.78 210.135 0.494118 0.494118 0.494118 epoly
1 0 0 0 402.111 172.907 422.359 177.901 396.789 189.808 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 402.111 172.907 396.789 189.808 384.283 184.964 389.66 167.822 0.501961 0.501961 0.501961 epoly
1 0 0 0 435.529 221.232 456.297 227.207 444.454 222.82 423.65 216.857 0.8 0.8 0.8 epoly
1 0 0 0 514.502 236.536 528.74 231.081 549.864 239.528 535.775 244.742 0.776471 0.776471 0.776471 epoly
1 0 0 0 332.26 158.867 344.292 152.566 357.445 157.892 345.429 164.049 0.807843 0.807843 0.807843 epoly
1 0 0 0 320.498 165.027 333.62 187.064 332.26 158.867 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 435.529 221.232 423.65 216.857 449.995 205.503 461.78 210.135 0.784314 0.784314 0.784314 epoly
1 0 0 0 553.03 268.17 567.598 263.12 577.688 266.93 563.206 271.868 0.768627 0.768627 0.768627 epoly
1 0 0 0 538.79 273.106 556.252 297.295 553.03 268.17 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 398.674 217.972 386.191 223.46 373.576 219.093 386.088 213.48 0.788235 0.788235 0.788235 epoly
1 0 0 0 467.279 193.013 478.684 197.759 473.243 214.641 461.78 210.135 0.498039 0.498039 0.498039 epoly
1 0 0 0 357.444 157.892 370.241 163.075 384.283 184.964 371.426 179.984 0.537255 0.537255 0.537255 epoly
1 0 0 0 444.453 222.82 451.615 226.334 446.249 243.063 438.928 240.085 0.466667 0.466667 0.466667 epoly
1 0 0 0 503.356 270.667 500.586 241.865 489.606 275.599 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 558.642 251.208 567.598 263.12 577.688 266.93 568.756 255.143 0.533333 0.533333 0.533333 epoly
1 0 0 0 446.25 243.064 462.411 248.257 450.023 262.702 433.421 257.298 0.576471 0.576471 0.576471 epoly
1 0 0 0 325.702 148.108 344.291 152.565 338.948 169.84 320.498 165.027 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 357.444 157.892 376.859 162.594 389.66 167.822 370.241 163.075 0.8 0.8 0.8 epoly
1 0 0 0 558.642 251.208 538.79 273.108 567.598 263.12 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 514.257 274.351 528.254 269.417 514.502 236.534 500.586 241.867 0.341176 0.341176 0.341176 epoly
1 0 0 0 446.25 243.064 438.929 240.085 455.577 245.433 462.411 248.257 0.8 0.8 0.8 epoly
1 0 0 0 446.221 187.733 434.454 182.884 449.996 205.503 461.781 210.136 0.537255 0.537255 0.537255 epoly
1 0 0 0 517.127 303.266 506.172 299.955 492.276 304.595 503.296 307.806 0.764706 0.764706 0.764706 epoly
1 0 0 0 528.251 269.416 514.501 236.536 532.054 256.943 0.47451 0.47451 0.47451 epoly
1 0 0 0 357.443 157.892 346.88 191.902 364.365 168.828 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 384.283 184.964 386.088 213.481 396.789 189.808 0.486275 0.486275 0.486275 epoly
1 0 0 0 333.62 187.062 320.498 165.027 338.948 169.84 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 553.03 268.17 549.862 239.527 567.598 263.12 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 553.03 268.17 542.571 264.368 528.253 269.415 538.79 273.106 0.768627 0.768627 0.768627 epoly
1 0 0 0 517.127 303.266 514.258 274.348 506.172 299.955 0.478431 0.478431 0.478431 epoly
1 0 0 0 436.673 211.245 434.454 182.884 423.65 216.857 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 527.785 306.485 517.128 303.264 534.347 328.326 544.977 331.263 0.533333 0.533333 0.533333 epoly
1 0 0 0 438.929 240.085 446.25 243.064 433.421 257.298 0.466667 0.466667 0.466667 epoly
1 0 0 0 457.017 264.99 450.022 262.702 455.576 245.432 462.41 248.257 0.466667 0.466667 0.466667 epoly
1 0 0 0 444.453 222.82 438.928 240.085 462.41 248.257 467.819 231.474 0.494118 0.494118 0.494118 epoly
1 0 0 0 553.03 268.17 549.862 239.527 542.571 264.368 0.47451 0.47451 0.47451 epoly
1 0 0 0 607.656 256.711 593.077 253.949 617.282 260.644 0.8 0.8 0.8 epoly
1 0 0 0 514.502 236.534 528.254 269.417 525.284 240.695 0.47451 0.47451 0.47451 epoly
1 0 0 0 462.409 248.256 472.35 250.82 450.831 244.227 0.8 0.8 0.8 epoly
1 0 0 0 549.861 239.528 579.011 228.738 558.642 251.208 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 386.088 213.481 384.283 184.964 371.895 190.852 373.576 219.095 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 598.666 237.213 593.077 253.949 607.656 256.711 613.467 239.38 0.176471 0.176471 0.176471 epoly
1 0 0 0 400.59 246.613 387.924 242.484 373.576 219.093 386.191 223.46 0.537255 0.537255 0.537255 epoly
1 0 0 0 545.75 293.868 556.253 297.292 527.784 306.486 517.127 303.266 0.764706 0.764706 0.764706 epoly
1 0 0 0 546.257 251.81 542.57 264.369 528.251 269.416 532.054 256.943 0.301961 0.301961 0.301961 epoly
1 0 0 0 549.862 239.527 553.03 268.17 542.571 264.368 539.447 235.36 0.47451 0.47451 0.47451 epoly
1 0 0 0 457.017 264.99 462.41 248.257 472.35 250.821 466.75 268.147 0.172549 0.172549 0.172549 epoly
1 0 0 0 623.027 243.56 598.666 237.213 613.467 239.38 0.803922 0.803922 0.803922 epoly
1 0 0 0 333.62 187.064 346.881 191.903 357.445 157.892 344.292 152.566 0.505882 0.505882 0.505882 epoly
1 0 0 0 548.245 247.163 539.446 235.362 549.861 239.528 558.642 251.208 0.533333 0.533333 0.533333 epoly
1 0 0 0 536.296 318.753 556.253 297.292 544.977 331.263 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 456.297 227.207 477.968 233.441 467.818 231.474 0.8 0.8 0.8 epoly
1 0 0 0 549.864 239.528 528.74 231.081 546.258 251.811 0.47451 0.47451 0.47451 epoly
1 0 0 0 556.252 297.295 566.468 300.626 577.688 266.93 567.598 263.12 0.486275 0.486275 0.486275 epoly
1 0 0 0 423.65 216.857 411.442 212.359 416.892 195.156 429.044 199.896 0.498039 0.498039 0.498039 epoly
1 0 0 0 306.953 159.847 320.498 165.027 333.62 187.062 319.987 182.087 0.541176 0.541176 0.541176 epoly
1 0 0 0 477.968 233.441 472.35 250.82 462.409 248.256 467.818 231.474 0.172549 0.172549 0.172549 epoly
1 0 0 0 306.953 159.847 325.368 164.615 338.948 169.84 320.498 165.027 0.8 0.8 0.8 epoly
1 0 0 0 325.368 164.615 320.498 165.027 338.948 169.84 0.8 0.8 0.8 epoly
1 0 0 0 528.739 231.08 546.257 251.81 532.054 256.943 514.501 236.536 0.811765 0.811765 0.811765 epoly
1 0 0 0 514.502 236.536 532.055 256.944 546.258 251.811 528.74 231.081 0.807843 0.807843 0.807843 epoly
1 0 0 0 434.453 182.885 449.995 205.503 429.044 199.896 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 450.022 262.702 457.017 264.99 466.75 268.147 0.8 0.8 0.8 epoly
1 0 0 0 473.243 214.641 483.603 216.007 461.78 210.135 0.8 0.8 0.8 epoly
1 0 0 0 450.023 262.702 462.411 248.257 455.577 245.433 0.466667 0.466667 0.466667 epoly
1 0 0 0 364.365 168.828 371.426 179.984 384.283 184.964 377.193 173.912 0.537255 0.537255 0.537255 epoly
1 0 0 0 325.702 148.108 320.498 165.027 325.368 164.615 330.766 147.088 0.172549 0.172549 0.172549 epoly
1 0 0 0 416.892 195.156 422.359 177.901 434.453 182.885 429.044 199.896 0.498039 0.498039 0.498039 epoly
1 0 0 0 448.507 215.746 461.781 210.136 449.996 205.503 436.673 211.245 0.784314 0.784314 0.784314 epoly
1 0 0 0 364.365 168.828 346.88 191.902 371.426 179.984 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 373.576 219.093 384.283 184.962 386.088 213.48 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 344.291 152.565 325.702 148.108 330.766 147.088 0.8 0.8 0.8 epoly
1 0 0 0 422.359 177.901 409.923 172.776 384.283 184.964 396.789 189.808 0.796078 0.796078 0.796078 epoly
1 0 0 0 530.751 335.514 544.977 331.263 534.347 328.326 520.045 332.669 0.760784 0.760784 0.760784 epoly
1 0 0 0 472.35 250.821 462.41 248.257 455.576 245.432 0.8 0.8 0.8 epoly
1 0 0 0 423.65 216.857 444.454 222.82 411.442 212.359 0.8 0.8 0.8 epoly
1 0 0 0 467.279 193.013 489.255 198.521 478.684 197.759 0.8 0.8 0.8 epoly
1 0 0 0 444.454 222.82 423.65 216.857 429.044 199.896 449.995 205.503 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 366.009 197.321 346.881 191.901 360.609 214.606 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 332.26 158.867 333.62 187.064 344.292 152.566 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 357.444 157.892 376.859 162.594 371.426 179.984 352.155 174.922 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 553.03 268.17 556.252 297.295 567.598 263.12 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 422.359 177.901 402.111 172.907 389.66 167.822 409.923 172.776 0.8 0.8 0.8 epoly
1 0 0 0 536.296 318.753 544.977 331.263 534.347 328.326 525.651 315.671 0.533333 0.533333 0.533333 epoly
1 0 0 0 517.127 303.266 520.044 332.671 506.172 299.955 0.478431 0.478431 0.478431 epoly
1 0 0 0 549.862 239.527 539.447 235.36 557.223 259.203 567.598 263.12 0.533333 0.533333 0.533333 epoly
1 0 0 0 489.255 198.521 483.603 216.007 473.243 214.641 478.684 197.759 0.172549 0.172549 0.172549 epoly
1 0 0 0 371.426 179.984 346.881 191.901 366.009 197.321 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 449.996 205.503 434.454 182.884 436.673 211.245 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 416.892 195.156 449.995 205.503 429.044 199.896 0.8 0.8 0.8 epoly
1 0 0 0 556.253 297.292 536.296 318.753 525.651 315.671 545.75 293.868 0.698039 0.698039 0.698039 epoly
1 0 0 0 545.75 293.868 525.651 315.671 536.296 318.753 556.253 297.292 0.698039 0.698039 0.698039 epoly
1 0 0 0 568.765 224.322 579.011 228.738 549.861 239.528 539.446 235.362 0.772549 0.772549 0.772549 epoly
1 0 0 0 366.009 197.321 360.609 214.606 373.577 219.094 378.922 202.054 0.501961 0.501961 0.501961 epoly
1 0 0 0 449.995 205.503 423.65 216.857 444.454 222.82 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 534.347 328.326 517.128 303.264 520.045 332.669 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 400.59 246.613 398.674 217.972 386.088 213.48 387.924 242.484 0.486275 0.486275 0.486275 epoly
1 0 0 0 371.426 179.982 384.283 184.962 373.576 219.093 360.608 214.605 0.501961 0.501961 0.501961 epoly
1 0 0 0 558.642 251.208 579.011 228.738 567.598 263.12 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 520.044 332.671 517.127 303.266 531.274 298.621 534.346 328.327 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 450.831 244.227 438.929 240.085 444.454 222.82 456.297 227.207 0.494118 0.494118 0.494118 epoly
1 0 0 0 376.859 162.594 357.444 157.892 371.426 179.984 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 525.651 315.671 545.75 293.868 517.127 303.266 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 378.922 202.054 384.283 184.964 371.426 179.984 366.009 197.321 0.501961 0.501961 0.501961 epoly
1 0 0 0 373.576 219.093 387.924 242.484 386.088 213.48 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 456.297 227.207 461.78 210.135 449.995 205.503 444.454 222.82 0.494118 0.494118 0.494118 epoly
1 0 0 0 528.739 231.08 514.501 236.536 528.251 269.416 542.57 264.369 0.337255 0.337255 0.337255 epoly
1 0 0 0 384.283 184.964 409.923 172.776 389.66 167.822 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 376.859 162.594 371.426 179.984 384.283 184.964 389.66 167.822 0.505882 0.505882 0.505882 epoly
1 0 0 0 517.127 303.266 506.172 299.955 520.392 295.207 531.274 298.621 0.764706 0.764706 0.764706 epoly
1 0 0 0 546.257 251.81 528.739 231.08 542.57 264.369 0.47451 0.47451 0.47451 epoly
1 0 0 0 400.591 246.611 406.008 229.511 438.929 240.085 433.421 257.298 0.227451 0.227451 0.227451 epoly
1 0 0 0 358.204 174.863 352.155 174.922 371.426 179.984 0.8 0.8 0.8 epoly
1 0 0 0 553.03 268.17 567.598 263.12 557.223 259.203 542.571 264.368 0.768627 0.768627 0.768627 epoly
1 0 0 0 450.831 244.227 472.35 250.82 438.929 240.085 0.8 0.8 0.8 epoly
1 0 0 0 373.146 208.86 360.608 214.605 373.576 219.093 386.088 213.48 0.792157 0.792157 0.792157 epoly
1 0 0 0 357.444 157.892 352.155 174.922 358.204 174.863 363.694 157.218 0.172549 0.172549 0.172549 epoly
1 0 0 0 477.968 233.441 456.297 227.207 450.831 244.227 472.35 250.82 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 472.35 250.82 450.831 244.227 456.297 227.207 477.968 233.441 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 437.875 200.739 416.892 195.156 429.044 199.896 449.995 205.503 0.8 0.8 0.8 epoly
1 0 0 0 558.642 251.208 567.598 263.12 557.223 259.203 548.245 247.163 0.533333 0.533333 0.533333 epoly
1 0 0 0 539.446 235.362 542.57 264.369 528.738 231.078 0.47451 0.47451 0.47451 epoly
1 0 0 0 611.555 277.676 601.863 273.988 607.656 256.711 617.282 260.644 0.486275 0.486275 0.486275 epoly
716.922 608.476 435.201 194.626 827.815 296.912 716.922 608.476 0 0 0 1 lines
1 0 0 0 376.859 162.594 357.444 157.892 363.694 157.218 0.8 0.8 0.8 epoly
1 0 0 0 444.454 222.82 477.968 233.441 456.297 227.207 0.8 0.8 0.8 epoly
1 0 0 0 437.875 200.739 449.995 205.503 434.453 182.885 422.359 177.901 0.537255 0.537255 0.537255 epoly
1 0 0 0 556.253 297.292 545.75 293.868 534.347 328.326 544.977 331.263 0.486275 0.486275 0.486275 epoly
1 0 0 0 371.426 179.982 373.146 208.86 386.088 213.48 384.283 184.962 0.486275 0.486275 0.486275 epoly
1 0 0 0 579.011 228.738 558.642 251.208 548.245 247.163 568.765 224.322 0.698039 0.698039 0.698039 epoly
1 0 0 0 568.765 224.322 548.245 247.163 558.642 251.208 579.011 228.738 0.698039 0.698039 0.698039 epoly
1 0 0 0 406.008 229.511 426.689 235.826 400.59 246.611 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 406.008 229.511 400.59 246.611 387.924 242.482 393.398 225.135 0.498039 0.498039 0.498039 epoly
1 0 0 0 325.368 164.615 306.953 159.847 319.987 182.087 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 557.223 259.203 539.447 235.36 542.571 264.368 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 623.027 243.56 613.467 239.38 607.656 256.711 617.282 260.644 0.486275 0.486275 0.486275 epoly
1 0 0 0 534.347 328.325 523.012 362.574 520.045 332.669 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 444.454 222.82 449.995 205.503 416.892 195.156 411.442 212.359 0.227451 0.227451 0.227451 epoly
1 0 0 0 542.57 264.369 539.446 235.362 553.937 229.906 557.221 259.204 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 421.123 253.289 400.591 246.611 433.421 257.298 0.8 0.8 0.8 epoly
1 0 0 0 489.255 198.521 467.279 193.013 461.78 210.135 483.603 216.007 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 548.245 247.163 568.765 224.322 539.446 235.362 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 611.555 277.676 636.651 285.022 601.863 273.988 0.8 0.8 0.8 epoly
1 0 0 0 398.89 207.735 411.442 212.359 406.008 229.511 393.398 225.135 0.498039 0.498039 0.498039 epoly
1 0 0 0 413.49 241.281 415.572 270.7 400.59 246.611 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 636.651 285.022 611.555 277.676 617.282 260.644 642.542 267.629 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 325.368 164.615 319.987 182.087 333.62 187.062 338.948 169.84 0.505882 0.505882 0.505882 epoly
1 0 0 0 520.044 332.671 534.346 328.327 520.392 295.207 506.172 299.955 0.345098 0.345098 0.345098 epoly
1 0 0 0 438.929 240.085 406.008 229.511 426.69 235.826 0.8 0.8 0.8 epoly
1 0 0 0 534.347 328.326 545.75 293.868 525.651 315.671 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 607.656 256.711 642.542 267.629 617.282 260.644 0.8 0.8 0.8 epoly
1 0 0 0 400.591 246.611 421.123 253.289 426.69 235.826 406.008 229.511 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 539.446 235.362 528.738 231.078 543.31 225.495 553.937 229.906 0.772549 0.772549 0.772549 epoly
1 0 0 0 344.291 152.565 330.766 147.088 325.368 164.615 338.948 169.84 0.505882 0.505882 0.505882 epoly
1 0 0 0 438.929 240.085 433.421 257.298 450.023 262.702 455.577 245.433 0.227451 0.227451 0.227451 epoly
1 0 0 0 545.75 293.87 534.346 328.327 531.274 298.621 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 413.49 241.281 400.59 246.611 387.924 242.482 400.859 237.028 0.784314 0.784314 0.784314 epoly
1 0 0 0 520.392 295.207 534.346 328.327 531.274 298.621 0.478431 0.478431 0.478431 epoly
1 0 0 0 416.892 195.156 437.875 200.739 422.359 177.901 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 511.952 360.048 509.038 329.744 520.045 332.669 523.012 362.574 0.478431 0.478431 0.478431 epoly
1 0 0 0 409.922 172.776 422.359 177.901 416.892 195.156 404.397 190.282 0.501961 0.501961 0.501961 epoly
1 0 0 0 433.421 257.298 438.93 240.085 472.35 250.82 466.75 268.147 0.227451 0.227451 0.227451 epoly
1 0 0 0 642.542 267.629 617.281 260.643 648.451 250.183 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 373.146 208.86 371.426 179.982 360.608 214.605 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 509.038 329.744 523.415 325.304 534.347 328.325 520.045 332.669 0.764706 0.764706 0.764706 epoly
1 0 0 0 579.011 228.738 568.765 224.322 557.223 259.203 567.598 263.12 0.490196 0.490196 0.490196 epoly
1 0 0 0 347.275 209.99 333.621 187.062 352.731 192.454 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 477.969 233.441 472.351 250.821 438.928 240.085 444.453 222.82 0.231373 0.231373 0.231373 epoly
1 0 0 0 472.35 250.82 477.968 233.441 444.454 222.82 438.929 240.085 0.231373 0.231373 0.231373 epoly
1 0 0 0 557.222 259.203 545.749 293.871 542.571 264.368 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 450.022 262.702 466.75 268.147 472.35 250.821 455.576 245.432 0.231373 0.231373 0.231373 epoly
1 0 0 0 415.572 270.7 402.861 266.832 387.924 242.482 400.59 246.611 0.537255 0.537255 0.537255 epoly
1 0 0 0 523.413 325.306 520.392 295.207 531.274 298.621 534.346 328.327 0.478431 0.478431 0.478431 epoly
1 0 0 0 421.123 253.289 433.421 257.298 438.929 240.085 426.69 235.826 0.494118 0.494118 0.494118 epoly
1 0 0 0 406.008 229.511 414.098 231.444 393.398 225.135 0.8 0.8 0.8 epoly
1 0 0 0 366.009 197.321 385.979 202.979 360.609 214.606 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 366.009 197.321 360.609 214.606 347.275 209.99 352.731 192.454 0.501961 0.501961 0.501961 epoly
1 0 0 0 542.57 264.369 557.221 259.204 543.31 225.495 528.738 231.078 0.341176 0.341176 0.341176 epoly
1 0 0 0 617.281 260.643 642.542 267.629 633.066 263.71 607.656 256.71 0.8 0.8 0.8 epoly
1 0 0 0 454.832 264.262 433.421 257.298 466.75 268.147 0.8 0.8 0.8 epoly
1 0 0 0 426.689 235.826 414.098 231.444 387.924 242.482 400.59 246.611 0.784314 0.784314 0.784314 epoly
1 0 0 0 416.894 195.157 411.444 212.36 385.979 202.979 391.545 185.269 0.498039 0.498039 0.498039 epoly
1 0 0 0 520.392 295.207 534.947 290.347 545.75 293.87 531.274 298.621 0.768627 0.768627 0.768627 epoly
1 0 0 0 619.191 279.484 601.862 273.988 607.655 256.71 625.033 262.149 0.235294 0.235294 0.235294 epoly
1 0 0 0 557.223 259.203 568.765 224.322 548.245 247.163 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 617.281 260.643 607.656 256.71 639.045 246.006 648.451 250.183 0.764706 0.764706 0.764706 epoly
1 0 0 0 432.274 218.31 444.454 222.82 438.929 240.085 426.69 235.826 0.498039 0.498039 0.498039 epoly
1 0 0 0 438.928 240.085 472.351 250.821 443.527 241.233 0.8 0.8 0.8 epoly
1 0 0 0 398.89 207.735 419.743 213.669 411.442 212.359 0.8 0.8 0.8 epoly
1 0 0 0 319.987 182.087 333.621 187.062 347.275 209.99 333.557 205.242 0.537255 0.537255 0.537255 epoly
1 0 0 0 366.009 197.321 352.731 192.454 358.204 174.863 371.426 179.984 0.501961 0.501961 0.501961 epoly
1 0 0 0 426.689 235.826 406.008 229.511 393.398 225.135 414.098 231.444 0.8 0.8 0.8 epoly
1 0 0 0 568.766 224.324 557.221 259.204 553.937 229.906 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 373.146 208.86 374.896 238.237 360.608 214.605 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 319.987 182.087 339.07 187.446 352.731 192.454 333.621 187.062 0.8 0.8 0.8 epoly
1 0 0 0 472.35 250.82 438.93 240.085 460.494 246.682 0.8 0.8 0.8 epoly
1 0 0 0 419.743 213.669 414.098 231.444 406.008 229.511 411.442 212.359 0.172549 0.172549 0.172549 epoly
1 0 0 0 411.444 212.36 402.796 208.304 408.411 190.533 416.894 195.157 0.466667 0.466667 0.466667 epoly
1 0 0 0 416.894 195.157 408.411 190.533 402.796 208.304 411.444 212.36 0.466667 0.466667 0.466667 epoly
1 0 0 0 449.995 205.503 466.174 229.047 444.454 222.82 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 543.31 225.495 557.221 259.204 553.937 229.906 0.47451 0.47451 0.47451 epoly
1 0 0 0 636.651 285.022 642.542 267.629 607.656 256.711 601.863 273.988 0.235294 0.235294 0.235294 epoly
1 0 0 0 534.945 290.349 531.816 260.458 542.571 264.368 545.749 293.871 0.47451 0.47451 0.47451 epoly
1 0 0 0 433.421 257.298 454.832 264.262 460.494 246.682 438.93 240.085 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 449.158 223.657 444.453 222.82 438.928 240.085 443.527 241.233 0.172549 0.172549 0.172549 epoly
1 0 0 0 432.274 218.31 437.876 200.739 449.995 205.503 444.454 222.82 0.498039 0.498039 0.498039 epoly
1 0 0 0 449.158 223.657 477.969 233.441 444.453 222.82 0.8 0.8 0.8 epoly
1 0 0 0 416.892 195.156 425.406 195.838 404.397 190.282 0.8 0.8 0.8 epoly
1 0 0 0 511.952 360.048 523.012 362.574 534.347 328.325 523.415 325.304 0.486275 0.486275 0.486275 epoly
1 0 0 0 376.859 162.594 363.694 157.218 358.204 174.863 371.426 179.984 0.505882 0.505882 0.505882 epoly
1 0 0 0 411.444 212.36 416.894 195.157 425.407 195.838 419.745 213.669 0.172549 0.172549 0.172549 epoly
1 0 0 0 531.816 260.458 546.55 255.173 557.222 259.203 542.571 264.368 0.768627 0.768627 0.768627 epoly
1 0 0 0 385.979 202.979 411.444 212.36 402.796 208.304 0.8 0.8 0.8 epoly
1 0 0 0 406.417 219.469 387.924 242.484 398.89 207.735 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 373.146 208.86 360.608 214.605 347.274 209.99 359.834 204.108 0.792157 0.792157 0.792157 epoly
1 0 0 0 366.009 197.321 385.979 202.979 352.731 192.454 0.8 0.8 0.8 epoly
1 0 0 0 409.922 172.776 431.087 177.951 422.359 177.901 0.8 0.8 0.8 epoly
1 0 0 0 625.033 262.149 642.543 267.63 636.652 285.022 619.191 279.484 0.235294 0.235294 0.235294 epoly
1 0 0 0 385.979 202.979 366.009 197.321 371.426 179.984 391.546 185.269 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 431.087 177.951 425.406 195.838 416.892 195.156 422.359 177.901 0.172549 0.172549 0.172549 epoly
1 0 0 0 454.832 264.262 438.929 240.085 460.494 246.682 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 408.411 190.533 416.894 195.157 391.545 185.269 0.8 0.8 0.8 epoly
1 0 0 0 546.549 255.175 543.31 225.495 553.937 229.906 557.221 259.204 0.47451 0.47451 0.47451 epoly
1 0 0 0 402.796 208.304 411.444 212.36 419.745 213.669 0.8 0.8 0.8 epoly
1 0 0 0 358.204 174.863 391.546 185.269 371.426 179.984 0.8 0.8 0.8 epoly
1 0 0 0 523.413 325.306 534.346 328.327 545.75 293.87 534.947 290.347 0.486275 0.486275 0.486275 epoly
1 0 0 0 387.924 242.482 414.098 231.444 393.398 225.135 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 415.572 270.7 413.49 241.281 400.859 237.028 402.861 266.832 0.486275 0.486275 0.486275 epoly
1 0 0 0 509.038 329.744 511.952 360.048 523.415 325.304 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 413.489 241.281 402.86 266.832 400.858 237.028 0.482353 0.482353 0.482353 epoly
1 0 0 0 387.924 242.484 374.897 238.237 385.979 202.979 398.89 207.735 0.498039 0.498039 0.498039 epoly
1 0 0 0 543.31 225.495 558.226 219.78 568.766 224.324 553.937 229.906 0.772549 0.772549 0.772549 epoly
1 0 0 0 454.832 264.262 466.75 268.147 472.35 250.82 460.494 246.682 0.494118 0.494118 0.494118 epoly
1 0 0 0 477.969 233.441 449.158 223.657 443.527 241.233 472.351 250.821 0.443137 0.443137 0.443137 epoly
1 0 0 0 472.351 250.821 443.527 241.233 449.158 223.657 477.969 233.441 0.439216 0.439216 0.439216 epoly
1 0 0 0 425.407 195.838 416.894 195.157 408.411 190.533 0.8 0.8 0.8 epoly
1 0 0 0 438.929 240.085 448.294 242.423 426.69 235.826 0.8 0.8 0.8 epoly
1 0 0 0 374.896 238.237 361.493 233.868 347.274 209.99 360.608 214.605 0.537255 0.537255 0.537255 epoly
1 0 0 0 414.098 231.444 426.69 235.826 413.489 241.281 400.858 237.028 0.784314 0.784314 0.784314 epoly
1 0 0 0 387.924 242.482 402.861 266.832 400.859 237.028 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 391.545 185.269 371.425 179.984 397.129 167.504 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 619.191 279.484 617.281 277.587 601.862 273.988 0.8 0.8 0.8 epoly
1 0 0 0 426.69 235.826 438.929 240.085 454.832 264.262 442.569 260.265 0.537255 0.537255 0.537255 epoly
1 0 0 0 385.979 202.979 372.694 198.085 347.275 209.99 360.609 214.606 0.792157 0.792157 0.792157 epoly
1 0 0 0 432.274 218.31 454.037 224.526 444.454 222.82 0.8 0.8 0.8 epoly
1 0 0 0 534.945 290.349 545.749 293.871 557.222 259.203 546.55 255.173 0.486275 0.486275 0.486275 epoly
1 0 0 0 414.099 231.445 387.924 242.484 406.417 219.469 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 426.69 235.826 448.294 242.423 460.494 246.682 438.929 240.085 0.8 0.8 0.8 epoly
1 0 0 0 630.778 302.361 656.82 310.407 624.923 319.648 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 630.778 302.361 624.923 319.648 615.239 316.49 621.163 298.951 0.482353 0.482353 0.482353 epoly
1 0 0 0 613.467 239.38 639.045 246.006 633.066 263.71 607.656 256.71 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 520.392 295.207 523.413 325.306 534.947 290.347 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 385.979 202.979 366.009 197.321 352.731 192.454 372.694 198.085 0.8 0.8 0.8 epoly
1 0 0 0 454.037 224.526 448.294 242.423 438.929 240.085 444.454 222.82 0.172549 0.172549 0.172549 epoly
1 0 0 0 607.655 256.71 623.313 259.676 625.033 262.149 0.8 0.8 0.8 epoly
1 0 0 0 409.922 172.776 425.406 195.838 404.397 190.282 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 402.861 266.83 387.924 242.482 408.471 249.165 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 385.98 202.98 374.896 238.237 373.146 208.86 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 419.743 213.669 398.89 207.735 393.398 225.135 414.098 231.444 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 391.545 185.269 397.129 167.504 409.922 172.776 404.397 190.282 0.501961 0.501961 0.501961 epoly
1 0 0 0 454.037 224.526 432.274 218.31 444.454 222.82 466.174 229.047 0.8 0.8 0.8 epoly
1 0 0 0 387.924 242.484 406.417 219.469 393.481 214.834 374.897 238.237 0.717647 0.717647 0.717647 epoly
1 0 0 0 374.897 238.237 393.481 214.834 406.417 219.469 387.924 242.484 0.717647 0.717647 0.717647 epoly
1 0 0 0 416.241 261.555 402.86 266.832 413.489 241.281 426.69 235.826 0.258824 0.258824 0.258824 epoly
1 0 0 0 408.471 249.165 387.924 242.482 414.098 231.444 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 371.425 179.984 391.545 185.269 378.32 180.11 358.203 174.863 0.8 0.8 0.8 epoly
1 0 0 0 636.652 285.022 617.281 277.587 619.191 279.484 0.8 0.8 0.8 epoly
1 0 0 0 639.045 246.006 607.656 256.71 633.066 263.71 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 369.291 197.696 352.73 192.453 358.203 174.863 374.811 180.046 0.227451 0.227451 0.227451 epoly
1 0 0 0 454.037 224.526 466.174 229.047 449.995 205.503 437.876 200.739 0.537255 0.537255 0.537255 epoly
1 0 0 0 371.425 179.984 358.203 174.863 383.964 162.079 397.129 167.504 0.8 0.8 0.8 epoly
1 0 0 0 477.587 193.613 489.255 198.521 483.603 216.008 471.871 211.357 0.494118 0.494118 0.494118 epoly
1 0 0 0 546.549 255.175 557.221 259.204 568.766 224.324 558.226 219.78 0.490196 0.490196 0.490196 epoly
1 0 0 0 443.527 241.233 472.351 250.821 448.294 242.423 0.8 0.8 0.8 epoly
1 0 0 0 339.07 187.446 319.987 182.087 333.557 205.242 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 638.923 304.657 630.778 302.361 636.651 285.022 644.916 287.004 0.176471 0.176471 0.176471 epoly
1 0 0 0 406.417 219.469 398.89 207.735 385.979 202.979 393.481 214.834 0.537255 0.537255 0.537255 epoly
1 0 0 0 531.816 260.458 534.945 290.349 546.55 255.173 0.0588235 0.0588235 0.0588235 epoly
236.76 115.464 435.201 194.626 716.922 608.476 517.714 631.58 236.76 115.464 0 0 0 1 lines
1 0 0 0 625.033 262.149 623.313 259.676 642.543 267.63 0.8 0.8 0.8 epoly
1 0 0 0 385.979 202.979 391.546 185.269 358.204 174.863 352.731 192.454 0.227451 0.227451 0.227451 epoly
1 0 0 0 414.098 231.444 398.89 207.736 419.744 213.669 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 617.281 277.587 623.313 259.676 607.655 256.71 601.862 273.988 0.176471 0.176471 0.176471 epoly
1 0 0 0 374.897 238.236 387.924 242.482 402.861 266.83 389.78 262.849 0.537255 0.537255 0.537255 epoly
1 0 0 0 454.037 224.526 477.969 233.441 449.158 223.657 0.8 0.8 0.8 epoly
1 0 0 0 431.087 177.951 409.922 172.776 404.397 190.282 425.406 195.838 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 428.911 265.543 431.171 295.782 415.571 270.698 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 636.651 285.022 662.865 292.695 656.82 310.407 630.778 302.362 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 642.542 267.629 648.451 250.183 639.045 246.006 633.066 263.71 0.486275 0.486275 0.486275 epoly
1 0 0 0 347.275 209.99 372.694 198.085 352.731 192.454 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 532.3 338.37 511.952 360.048 523.412 325.304 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 339.07 187.446 333.557 205.242 347.275 209.99 352.731 192.454 0.505882 0.505882 0.505882 epoly
1 0 0 0 387.924 242.482 408.471 249.165 395.451 244.92 374.897 238.236 0.8 0.8 0.8 epoly
1 0 0 0 374.897 238.236 395.451 244.92 408.471 249.165 387.924 242.482 0.8 0.8 0.8 epoly
1 0 0 0 472.351 250.821 477.969 233.441 454.037 224.526 448.294 242.423 0.494118 0.494118 0.494118 epoly
1 0 0 0 374.896 238.237 373.146 208.86 359.834 204.108 361.493 233.868 0.486275 0.486275 0.486275 epoly
1 0 0 0 361.493 233.868 359.834 204.108 373.146 208.86 374.896 238.237 0.490196 0.490196 0.490196 epoly
1 0 0 0 623.314 259.676 607.656 256.71 633.066 263.71 0.8 0.8 0.8 epoly
1 0 0 0 387.924 242.482 374.897 238.236 401.14 226.935 414.098 231.444 0.788235 0.788235 0.788235 epoly
1 0 0 0 374.897 238.237 387.924 242.484 414.099 231.445 401.141 226.935 0.788235 0.788235 0.788235 epoly
1 0 0 0 613.467 239.38 607.656 256.71 623.314 259.676 629.365 241.708 0.176471 0.176471 0.176471 epoly
1 0 0 0 432.274 218.31 454.037 224.526 426.69 235.826 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 432.274 218.31 426.69 235.826 414.099 231.444 419.744 213.669 0.498039 0.498039 0.498039 epoly
1 0 0 0 374.811 180.046 391.546 185.269 385.98 202.98 369.291 197.696 0.227451 0.227451 0.227451 epoly
1 0 0 0 359.834 204.108 372.694 198.086 385.98 202.98 373.146 208.86 0.796078 0.796078 0.796078 epoly
1 0 0 0 543.31 225.495 546.549 255.175 558.226 219.78 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 347.274 209.99 361.493 233.868 359.834 204.108 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 617.281 277.587 619.191 279.484 625.033 262.149 623.313 259.676 0.466667 0.466667 0.466667 epoly
1 0 0 0 623.313 259.676 625.033 262.149 619.191 279.484 617.281 277.587 0.466667 0.466667 0.466667 epoly
1 0 0 0 483.604 216.008 477.969 233.441 454.036 224.525 459.798 206.571 0.494118 0.494118 0.494118 epoly
1 0 0 0 639.045 246.006 613.467 239.38 629.365 241.708 0.803922 0.803922 0.803922 epoly
1 0 0 0 428.911 265.543 415.571 270.698 402.86 266.83 416.241 261.554 0.780392 0.780392 0.780392 epoly
1 0 0 0 638.923 304.657 611.269 295.442 630.778 302.361 0.8 0.8 0.8 epoly
1 0 0 0 432.274 218.31 454.037 224.526 437.876 200.739 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 611.269 295.442 617.282 277.587 636.651 285.022 630.778 302.361 0.486275 0.486275 0.486275 epoly
1 0 0 0 385.979 202.979 398.89 207.736 414.098 231.444 401.14 226.935 0.537255 0.537255 0.537255 epoly
1 0 0 0 511.952 360.048 500.574 357.449 512.164 322.195 523.412 325.304 0.486275 0.486275 0.486275 epoly
1 0 0 0 543.978 303.092 523.413 325.306 534.944 290.347 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 352.73 192.453 372.693 198.085 367.084 216.004 347.274 209.99 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 385.979 202.979 406.847 208.892 419.744 213.669 398.89 207.736 0.8 0.8 0.8 epoly
1 0 0 0 477.969 233.441 471.386 230.018 477.197 212.002 483.604 216.008 0.466667 0.466667 0.466667 epoly
1 0 0 0 483.604 216.008 477.197 212.002 471.386 230.018 477.969 233.441 0.466667 0.466667 0.466667 epoly
1 0 0 0 662.865 292.695 636.651 285.022 668.928 274.926 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 636.651 285.022 617.282 277.587 644.916 287.004 0.8 0.8 0.8 epoly
1 0 0 0 385.979 202.979 374.897 238.237 393.481 214.834 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 483.603 216.008 494.734 217.475 471.871 211.357 0.8 0.8 0.8 epoly
1 0 0 0 656.82 310.407 647.37 307.038 615.239 316.49 624.923 319.648 0.756863 0.756863 0.756863 epoly
1 0 0 0 623.313 259.676 617.281 277.587 636.652 285.022 642.543 267.63 0.486275 0.486275 0.486275 epoly
1 0 0 0 414.098 231.444 416.241 261.555 426.69 235.826 0.482353 0.482353 0.482353 epoly
1 0 0 0 454.037 224.526 432.274 218.31 426.69 235.826 448.294 242.423 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 361.493 233.866 347.274 209.99 367.084 216.004 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 412.572 190.793 391.545 185.269 404.397 190.282 425.406 195.838 0.8 0.8 0.8 epoly
1 0 0 0 477.969 233.441 483.604 216.008 494.734 217.476 488.872 235.554 0.172549 0.172549 0.172549 epoly
1 0 0 0 656.82 310.407 630.778 302.361 621.163 298.951 647.37 307.038 0.8 0.8 0.8 epoly
1 0 0 0 454.036 224.525 477.969 233.441 471.386 230.018 0.8 0.8 0.8 epoly
1 0 0 0 647.37 307.038 630.778 302.362 656.82 310.407 0.8 0.8 0.8 epoly
1 0 0 0 408.411 190.533 391.545 185.269 385.979 202.979 402.796 208.304 0.227451 0.227451 0.227451 epoly
1 0 0 0 369.291 197.696 359.016 193.047 352.73 192.453 0.8 0.8 0.8 epoly
1 0 0 0 448.294 242.423 426.69 235.826 442.569 260.265 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 416.241 261.555 414.098 231.444 400.858 237.028 402.86 266.832 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 477.587 193.613 500.614 199.34 489.255 198.521 0.8 0.8 0.8 epoly
1 0 0 0 636.651 285.022 630.778 302.362 647.37 307.038 653.488 289.06 0.176471 0.176471 0.176471 epoly
1 0 0 0 431.171 295.782 418.422 292.199 402.86 266.83 415.571 270.698 0.537255 0.537255 0.537255 epoly
1 0 0 0 412.572 190.793 425.406 195.838 409.922 172.776 397.129 167.504 0.537255 0.537255 0.537255 epoly
1 0 0 0 523.413 325.306 512.165 322.197 523.828 286.722 534.944 290.347 0.486275 0.486275 0.486275 epoly
1 0 0 0 555.73 267.594 534.945 290.349 546.548 255.173 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 363.693 157.218 383.964 162.079 378.32 180.11 358.203 174.863 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 500.614 199.34 494.734 217.475 483.603 216.008 489.255 198.521 0.172549 0.172549 0.172549 epoly
1 0 0 0 636.651 285.022 662.865 292.695 653.488 289.06 627.106 281.358 0.8 0.8 0.8 epoly
1 0 0 0 443.527 241.233 448.294 242.423 454.037 224.526 449.158 223.657 0.172549 0.172549 0.172549 epoly
1 0 0 0 477.197 212.002 483.604 216.008 459.798 206.571 0.8 0.8 0.8 epoly
1 0 0 0 662.865 292.695 636.651 285.022 653.488 289.06 0.8 0.8 0.8 epoly
1 0 0 0 385.979 202.979 391.546 185.269 425.406 195.838 419.744 213.669 0.227451 0.227451 0.227451 epoly
236.76 115.464 660.159 210.837 827.815 296.912 435.201 194.626 236.76 115.464 0 0 0 1 lines
1 0 0 0 361.493 233.868 374.896 238.237 385.98 202.98 372.694 198.086 0.498039 0.498039 0.498039 epoly
1 0 0 0 358.203 174.863 364.704 174.799 374.811 180.046 0.8 0.8 0.8 epoly
1 0 0 0 511.952 360.048 532.3 338.37 521.064 335.419 500.574 357.449 0.701961 0.701961 0.701961 epoly
1 0 0 0 471.386 230.018 477.969 233.441 488.872 235.554 0.8 0.8 0.8 epoly
1 0 0 0 408.713 244.294 426.692 235.829 416.241 261.555 0.486275 0.486275 0.486275 epoly
1 0 0 0 636.651 285.022 627.106 281.358 659.625 271.026 668.928 274.926 0.760784 0.760784 0.760784 epoly
1 0 0 0 535.485 369.425 511.953 360.047 541.372 351.707 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 448.294 242.423 442.569 260.265 454.832 264.262 460.494 246.682 0.494118 0.494118 0.494118 epoly
1 0 0 0 333.557 205.242 347.274 209.99 361.493 233.866 347.696 229.369 0.537255 0.537255 0.537255 epoly
1 0 0 0 385.98 202.98 359.016 193.047 369.291 197.696 0.8 0.8 0.8 epoly
1 0 0 0 383.964 162.079 358.203 174.863 378.32 180.11 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 333.557 205.242 353.347 211.237 367.084 216.004 347.274 209.99 0.8 0.8 0.8 epoly
1 0 0 0 353.347 211.237 347.274 209.99 367.084 216.004 0.8 0.8 0.8 epoly
1 0 0 0 401.14 226.933 426.691 235.828 408.712 244.294 0.486275 0.486275 0.486275 epoly
1 0 0 0 494.734 217.476 483.604 216.008 477.197 212.002 0.8 0.8 0.8 epoly
1 0 0 0 393.481 214.834 401.141 226.935 414.099 231.445 406.417 219.469 0.537255 0.537255 0.537255 epoly
1 0 0 0 426.692 235.829 440.205 230.245 429.946 256.151 416.241 261.555 0.262745 0.262745 0.262745 epoly
1 0 0 0 532.3 338.37 523.412 325.304 512.164 322.195 521.064 335.419 0.537255 0.537255 0.537255 epoly
1 0 0 0 352.73 192.453 347.274 209.99 353.347 211.237 359.017 193.047 0.172549 0.172549 0.172549 epoly
1 0 0 0 402.796 208.304 419.745 213.669 425.407 195.838 408.411 190.533 0.227451 0.227451 0.227451 epoly
1 0 0 0 534.945 290.349 523.828 286.724 535.565 251.026 546.548 255.173 0.486275 0.486275 0.486275 epoly
1 0 0 0 393.481 214.834 374.897 238.237 401.141 226.935 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 567.556 231.873 546.548 255.175 558.224 219.78 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 615.239 316.49 647.37 307.038 621.163 298.951 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 615.239 316.49 605.275 313.241 611.269 295.442 621.163 298.951 0.482353 0.482353 0.482353 epoly
1 0 0 0 374.811 180.046 364.704 174.799 391.546 185.269 0.8 0.8 0.8 epoly
1 0 0 0 402.86 266.83 414.099 231.443 416.241 261.554 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 372.693 198.085 352.73 192.453 359.017 193.047 0.8 0.8 0.8 epoly
1 0 0 0 440.204 230.245 422.365 238.665 408.712 244.294 426.691 235.828 0.52549 0.52549 0.52549 epoly
1 0 0 0 426.692 235.829 408.713 244.294 422.366 238.665 440.205 230.245 0.52549 0.52549 0.52549 epoly
1 0 0 0 454.037 224.526 441.543 219.871 414.099 231.444 426.69 235.826 0.784314 0.784314 0.784314 epoly
1 0 0 0 523.413 325.306 543.978 303.092 532.878 299.617 512.165 322.197 0.701961 0.701961 0.701961 epoly
1 0 0 0 406.847 208.892 385.979 202.979 419.744 213.669 0.8 0.8 0.8 epoly
1 0 0 0 359.016 193.047 364.704 174.799 358.203 174.863 352.73 192.453 0.172549 0.172549 0.172549 epoly
1 0 0 0 391.545 185.269 412.572 190.793 397.129 167.504 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 511.953 360.047 535.485 369.425 524.196 366.905 500.575 357.448 0.662745 0.662745 0.662745 epoly
1 0 0 0 395.451 244.92 374.897 238.236 389.78 262.849 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 359.834 204.108 361.493 233.868 372.694 198.086 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 391.545 185.269 397.129 167.504 383.964 162.079 378.32 180.11 0.501961 0.501961 0.501961 epoly
1 0 0 0 454.037 224.526 432.274 218.31 419.744 213.669 441.543 219.871 0.8 0.8 0.8 epoly
1 0 0 0 440.204 230.245 426.691 235.828 401.14 226.933 414.741 221.077 0.784314 0.784314 0.784314 epoly
1 0 0 0 511.953 360.047 500.575 357.448 530.151 348.922 541.372 351.707 0.760784 0.760784 0.760784 epoly
1 0 0 0 401.14 226.935 374.897 238.236 395.451 244.92 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 636.888 412.042 641.018 443.933 620.946 415.531 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 364.705 174.799 358.203 174.863 378.32 180.11 0.8 0.8 0.8 epoly
1 0 0 0 477.587 193.613 494.734 217.475 471.871 211.357 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 543.978 303.092 534.944 290.347 523.828 286.722 532.878 299.617 0.533333 0.533333 0.533333 epoly
1 0 0 0 425.406 195.838 391.546 185.269 412.572 190.793 0.8 0.8 0.8 epoly
1 0 0 0 363.693 157.218 358.203 174.863 364.705 174.799 370.411 156.493 0.172549 0.172549 0.172549 epoly
1 0 0 0 459.799 206.572 465.578 188.561 477.587 193.613 471.871 211.357 0.494118 0.494118 0.494118 epoly
1 0 0 0 546.548 255.175 535.565 251.028 547.376 215.104 558.224 219.78 0.490196 0.490196 0.490196 epoly
1 0 0 0 615.239 316.49 641.271 324.959 605.275 313.241 0.8 0.8 0.8 epoly
1 0 0 0 395.451 244.92 389.78 262.849 402.861 266.83 408.471 249.165 0.498039 0.498039 0.498039 epoly
1 0 0 0 385.979 202.979 406.847 208.892 412.572 190.793 391.546 185.269 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 641.271 324.959 615.239 316.49 621.163 298.951 647.37 307.038 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 431.171 295.782 428.911 265.543 416.241 261.554 418.422 292.199 0.486275 0.486275 0.486275 epoly
1 0 0 0 364.704 174.799 374.811 180.046 369.291 197.696 359.016 193.047 0.466667 0.466667 0.466667 epoly
1 0 0 0 359.016 193.047 369.291 197.696 374.811 180.046 364.704 174.799 0.466667 0.466667 0.466667 epoly
1 0 0 0 383.964 162.079 363.693 157.218 370.411 156.493 0.8 0.8 0.8 epoly
1 0 0 0 401.14 226.933 414.099 231.443 402.86 266.83 389.779 262.849 0.498039 0.498039 0.498039 epoly
1 0 0 0 534.945 290.349 555.73 267.594 544.767 263.586 523.828 286.724 0.701961 0.701961 0.701961 epoly
1 0 0 0 617.282 277.587 644.916 287.004 638.923 304.657 611.269 295.442 0.443137 0.443137 0.443137 epoly
1 0 0 0 611.269 295.442 638.923 304.657 644.916 287.004 617.282 277.587 0.439216 0.439216 0.439216 epoly
1 0 0 0 406.847 208.892 385.979 202.979 401.14 226.935 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 636.888 412.042 620.946 415.531 611.065 413.718 627.122 410.156 0.74902 0.74902 0.74902 epoly
1 0 0 0 611.269 295.442 647.37 307.038 621.163 298.951 0.8 0.8 0.8 epoly
1 0 0 0 408.471 249.165 414.098 231.444 401.14 226.935 395.451 244.92 0.494118 0.494118 0.494118 epoly
1 0 0 0 402.86 266.83 418.422 292.199 416.241 261.554 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 639.045 246.006 629.365 241.708 623.314 259.676 633.066 263.71 0.486275 0.486275 0.486275 epoly
1 0 0 0 512.164 322.195 500.574 357.449 521.064 335.419 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 364.704 174.799 359.016 193.047 385.98 202.98 391.546 185.269 0.505882 0.505882 0.505882 epoly
1 0 0 0 555.73 267.594 546.548 255.173 535.565 251.026 544.767 263.586 0.533333 0.533333 0.533333 epoly
1 0 0 0 500.614 199.34 477.587 193.613 471.871 211.357 494.734 217.475 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 414.099 231.444 441.543 219.871 419.744 213.669 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 406.847 208.892 401.14 226.935 414.098 231.444 419.744 213.669 0.498039 0.498039 0.498039 epoly
1 0 0 0 647.371 307.038 611.269 295.442 638.923 304.657 0.8 0.8 0.8 epoly
1 0 0 0 440.202 230.242 429.945 256.151 427.656 225.727 0.482353 0.482353 0.482353 epoly
1 0 0 0 543.978 303.092 512.165 322.197 532.878 299.617 0.698039 0.698039 0.698039 epoly
1 0 0 0 546.548 255.175 567.556 231.873 556.732 227.326 535.565 251.028 0.698039 0.698039 0.698039 epoly
1 0 0 0 403.198 257.447 389.779 262.849 402.86 266.83 416.241 261.554 0.784314 0.784314 0.784314 epoly
1 0 0 0 644.916 287.004 653.489 289.061 647.371 307.038 638.923 304.657 0.176471 0.176471 0.176471 epoly
1 0 0 0 521.064 335.421 512.165 322.197 543.978 303.092 553.201 316.104 0.227451 0.227451 0.227451 epoly
1 0 0 0 406.847 208.892 419.744 213.669 425.406 195.838 412.572 190.793 0.498039 0.498039 0.498039 epoly
1 0 0 0 512.165 322.195 523.829 286.721 526.962 317.546 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 441.543 219.871 454.037 224.526 440.202 230.242 427.656 225.727 0.784314 0.784314 0.784314 epoly
1 0 0 0 641.018 443.933 631.224 442.502 611.065 413.718 620.946 415.531 0.537255 0.537255 0.537255 epoly
1 0 0 0 650.795 328.065 641.271 324.959 647.37 307.038 656.82 310.407 0.482353 0.482353 0.482353 epoly
1 0 0 0 644.916 287.004 617.282 277.587 653.489 289.061 0.8 0.8 0.8 epoly
1 0 0 0 523.828 286.722 512.165 322.197 532.878 299.617 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 624.888 447.073 628.899 479.172 614.977 445.705 0.47451 0.47451 0.47451 epoly
1 0 0 0 659.625 271.026 627.106 281.358 653.488 289.06 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 567.556 231.873 558.224 219.78 547.376 215.104 556.732 227.326 0.533333 0.533333 0.533333 epoly
1 0 0 0 401.14 226.933 403.198 257.447 416.241 261.554 414.099 231.443 0.486275 0.486275 0.486275 epoly
1 0 0 0 418.316 172.636 431.087 177.951 425.406 195.838 412.572 190.793 0.501961 0.501961 0.501961 epoly
1 0 0 0 353.347 211.237 333.557 205.242 347.696 229.369 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 429.946 256.151 440.205 230.245 422.366 238.665 0.482353 0.482353 0.482353 epoly
1 0 0 0 662.865 292.695 653.488 289.06 647.37 307.038 656.82 310.407 0.482353 0.482353 0.482353 epoly
1 0 0 0 393.481 214.834 412.573 190.791 401.141 226.935 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 623.203 319.077 605.275 313.241 611.269 295.442 629.249 301.217 0.235294 0.235294 0.235294 epoly
1 0 0 0 650.795 328.065 677.84 336.863 641.271 324.959 0.8 0.8 0.8 epoly
1 0 0 0 628.899 479.172 624.888 447.073 641.019 443.931 645.222 476.393 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 482.725 212.671 459.799 206.572 471.871 211.357 494.734 217.475 0.8 0.8 0.8 epoly
1 0 0 0 422.365 238.665 440.204 230.245 414.741 221.077 0.482353 0.482353 0.482353 epoly
1 0 0 0 444.978 290.819 447.429 321.921 431.172 295.78 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 512.387 282.99 523.829 286.721 512.165 322.195 500.587 318.996 0.490196 0.490196 0.490196 epoly
1 0 0 0 677.84 336.863 650.795 328.065 656.82 310.407 684.045 318.818 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 662.865 292.695 668.928 274.926 659.625 271.026 653.488 289.06 0.482353 0.482353 0.482353 epoly
1 0 0 0 353.347 211.237 347.696 229.369 361.493 233.866 367.084 216.004 0.501961 0.501961 0.501961 epoly
1 0 0 0 443.986 250.615 429.945 256.151 440.202 230.242 454.037 224.526 0.266667 0.266667 0.266667 epoly
1 0 0 0 535.565 251.026 523.828 286.724 544.767 263.586 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 477.197 212.002 459.798 206.571 454.036 224.525 471.386 230.018 0.231373 0.231373 0.231373 epoly
1 0 0 0 482.725 212.671 494.734 217.475 477.587 193.613 465.578 188.561 0.533333 0.533333 0.533333 epoly
1 0 0 0 641.271 324.959 647.37 307.038 611.269 295.442 605.275 313.241 0.235294 0.235294 0.235294 epoly
1 0 0 0 647.37 307.038 684.045 318.818 656.82 310.407 0.8 0.8 0.8 epoly
1 0 0 0 530.151 348.922 500.575 357.448 524.196 366.905 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 512.165 322.195 542.119 312.782 521.064 335.419 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 372.693 198.085 359.017 193.047 353.347 211.237 367.084 216.004 0.501961 0.501961 0.501961 epoly
1 0 0 0 454.037 224.525 459.798 206.572 494.733 217.475 488.871 235.553 0.231373 0.231373 0.231373 epoly
1 0 0 0 542.119 312.784 553.201 316.104 543.978 303.092 532.878 299.617 0.533333 0.533333 0.533333 epoly
1 0 0 0 624.888 447.073 614.977 445.705 631.226 442.5 641.019 443.931 0.74902 0.74902 0.74902 epoly
1 0 0 0 567.556 231.873 535.565 251.028 556.732 227.326 0.698039 0.698039 0.698039 epoly
1 0 0 0 444.978 290.819 431.172 295.78 418.422 292.198 432.277 287.119 0.772549 0.772549 0.772549 epoly
1 0 0 0 521.064 335.421 542.119 312.784 532.878 299.617 512.165 322.197 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 403.198 257.447 401.14 226.933 416.241 261.554 0.486275 0.486275 0.486275 epoly
1 0 0 0 611.269 295.442 617.282 277.587 653.488 289.06 647.37 307.038 0.235294 0.235294 0.235294 epoly
1 0 0 0 617.282 277.587 611.269 295.442 647.371 307.038 653.489 289.061 0.235294 0.235294 0.235294 epoly
1 0 0 0 631.224 442.5 636.889 412.04 641.018 443.931 0.470588 0.470588 0.470588 epoly
1 0 0 0 393.481 214.834 401.141 226.935 387.799 222.292 380.167 210.062 0.537255 0.537255 0.537255 epoly
1 0 0 0 544.767 263.588 535.565 251.028 567.556 231.873 577.085 244.22 0.227451 0.227451 0.227451 epoly
1 0 0 0 509.496 332.382 500.587 318.996 512.165 322.195 521.064 335.419 0.537255 0.537255 0.537255 epoly
1 0 0 0 653.215 408.466 657.541 440.713 641.018 443.931 636.889 412.04 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 535.565 251.026 547.378 215.102 550.74 245.485 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 611.066 413.718 614.977 445.707 600.894 411.852 0.47451 0.47451 0.47451 epoly
1 0 0 0 387.799 222.292 361.493 233.868 380.167 210.062 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 647.37 307.038 641.271 324.959 623.202 319.077 629.248 301.217 0.235294 0.235294 0.235294 epoly
1 0 0 0 547.376 215.104 535.565 251.028 556.732 227.326 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 408.713 244.294 416.241 261.555 429.946 256.151 422.366 238.665 0.333333 0.333333 0.333333 epoly
1 0 0 0 526.962 317.546 523.829 286.721 542.119 312.784 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 515.462 314.239 500.587 318.996 512.165 322.195 526.962 317.546 0.764706 0.764706 0.764706 epoly
1 0 0 0 648.964 376.791 653.214 408.47 639.344 374.38 0.470588 0.470588 0.470588 epoly
1 0 0 0 403.198 257.447 401.14 226.933 389.779 262.849 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 641.018 443.933 636.888 412.042 627.122 410.156 631.224 442.502 0.470588 0.470588 0.470588 epoly
1 0 0 0 412.573 190.791 393.481 214.834 380.167 210.062 399.358 185.596 0.713725 0.713725 0.713725 epoly
1 0 0 0 535.485 369.425 541.372 351.707 530.151 348.922 524.196 366.905 0.486275 0.486275 0.486275 epoly
1 0 0 0 634.09 427.092 636.889 412.044 653.216 408.47 650.577 423.66 0.298039 0.298039 0.298039 epoly
1 0 0 0 471.386 230.018 488.872 235.554 494.734 217.476 477.197 212.002 0.231373 0.231373 0.231373 epoly
1 0 0 0 459.799 206.572 482.725 212.671 454.037 224.526 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 459.799 206.572 454.037 224.526 441.543 219.871 447.37 201.645 0.494118 0.494118 0.494118 epoly
1 0 0 0 401.14 226.933 414.741 221.077 429.946 256.15 416.241 261.554 0.329412 0.329412 0.329412 epoly
1 0 0 0 376.312 258.751 361.493 233.867 382.046 240.551 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 425.406 195.838 434.568 196.571 412.572 190.793 0.8 0.8 0.8 epoly
1 0 0 0 634.09 427.092 617.065 408.216 636.889 412.044 0.470588 0.470588 0.470588 epoly
1 0 0 0 383.964 162.079 370.411 156.493 364.705 174.799 378.32 180.11 0.501961 0.501961 0.501961 epoly
1 0 0 0 347.696 229.371 366.456 205.148 380.167 210.062 361.493 233.868 0.72549 0.72549 0.72549 epoly
1 0 0 0 611.065 413.718 631.224 442.502 627.122 410.156 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 523.829 286.721 526.962 317.546 515.462 314.239 512.387 282.99 0.478431 0.478431 0.478431 epoly
1 0 0 0 512.387 282.99 515.462 314.239 526.962 317.546 523.829 286.721 0.478431 0.478431 0.478431 epoly
1 0 0 0 456.556 254.859 454.038 224.524 470.885 249.321 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 614.977 445.707 611.066 413.718 627.123 410.156 631.225 442.502 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 476.794 231.025 454.037 224.525 488.871 235.553 0.8 0.8 0.8 epoly
1 0 0 0 459.799 206.572 482.725 212.671 465.578 188.561 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 441.543 219.871 429.945 256.151 427.656 225.727 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 447.429 321.921 434.65 318.653 418.422 292.198 431.172 295.78 0.537255 0.537255 0.537255 epoly
1 0 0 0 653.214 408.47 648.964 376.791 665.488 372.78 669.939 404.809 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 453.214 183.361 465.578 188.561 459.799 206.572 447.37 201.645 0.498039 0.498039 0.498039 epoly
1 0 0 0 542.119 312.784 521.064 335.421 553.201 316.104 0.698039 0.698039 0.698039 epoly
1 0 0 0 418.316 172.636 440.48 178.004 431.087 177.951 0.8 0.8 0.8 epoly
1 0 0 0 422.365 238.665 414.741 221.077 401.14 226.933 408.712 244.294 0.333333 0.333333 0.333333 epoly
1 0 0 0 536.21 210.288 547.378 215.102 535.565 251.026 524.259 246.757 0.490196 0.490196 0.490196 epoly
1 0 0 0 637.639 303.569 611.269 295.442 647.37 307.038 0.8 0.8 0.8 epoly
1 0 0 0 395.451 244.92 416.947 251.912 389.78 262.849 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 395.451 244.92 389.78 262.849 376.312 258.751 382.046 240.551 0.498039 0.498039 0.498039 epoly
1 0 0 0 696.515 282.556 668.927 274.926 702.78 264.337 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 494.733 217.475 459.798 206.572 482.724 212.671 0.8 0.8 0.8 epoly
1 0 0 0 440.48 178.004 434.568 196.571 425.406 195.838 431.087 177.951 0.172549 0.172549 0.172549 epoly
1 0 0 0 628.899 479.172 645.222 476.393 631.226 442.5 614.977 445.705 0.380392 0.380392 0.380392 epoly
1 0 0 0 454.038 224.524 456.556 254.859 443.986 250.613 441.544 219.869 0.478431 0.478431 0.478431 epoly
1 0 0 0 623.203 319.077 621.364 318.466 605.275 313.241 0.8 0.8 0.8 epoly
1 0 0 0 441.543 219.871 443.986 250.615 454.037 224.526 0.482353 0.482353 0.482353 epoly
1 0 0 0 454.037 224.525 476.794 231.025 482.724 212.671 459.798 206.572 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 611.066 413.718 600.894 411.852 617.065 408.214 627.123 410.156 0.74902 0.74902 0.74902 epoly
1 0 0 0 535.565 251.026 566.287 239.806 544.767 263.586 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 653.488 289.06 617.282 277.587 643.832 285.318 0.8 0.8 0.8 epoly
1 0 0 0 347.696 229.369 361.493 233.867 376.312 258.751 362.442 254.53 0.537255 0.537255 0.537255 epoly
1 0 0 0 403.198 257.447 416.241 261.554 429.946 256.15 416.948 251.912 0.784314 0.784314 0.784314 epoly
1 0 0 0 566.287 239.808 577.085 244.22 567.556 231.873 556.732 227.326 0.533333 0.533333 0.533333 epoly
1 0 0 0 403.198 257.447 405.294 288.511 389.779 262.849 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 530.705 309.362 542.119 312.782 512.165 322.195 500.587 318.996 0.764706 0.764706 0.764706 epoly
1 0 0 0 617.282 277.587 643.832 285.318 637.639 303.569 611.269 295.442 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 611.269 295.442 637.639 303.569 643.832 285.318 617.282 277.587 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 648.964 376.791 639.344 374.38 655.996 370.279 665.488 372.78 0.752941 0.752941 0.752941 epoly
1 0 0 0 347.696 229.369 368.238 236.05 382.046 240.551 361.493 233.867 0.8 0.8 0.8 epoly
1 0 0 0 653.215 408.466 636.889 412.04 631.224 442.5 647.874 439.217 0.305882 0.305882 0.305882 epoly
1 0 0 0 544.767 263.588 566.287 239.808 556.732 227.326 535.565 251.028 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 677.84 336.863 684.045 318.818 647.37 307.038 641.271 324.959 0.235294 0.235294 0.235294 epoly
1 0 0 0 443.986 250.615 441.543 219.871 427.656 225.727 429.945 256.151 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 655.995 370.278 661.116 341.316 665.487 372.779 0.470588 0.470588 0.470588 epoly
1 0 0 0 611.269 295.442 627.614 299.995 629.249 301.217 0.8 0.8 0.8 epoly
1 0 0 0 347.696 229.371 361.493 233.868 387.799 222.292 374.055 217.51 0.792157 0.792157 0.792157 epoly
1 0 0 0 533.477 259.459 524.259 246.757 535.565 251.026 544.767 263.586 0.533333 0.533333 0.533333 epoly
1 0 0 0 677.84 336.861 682.416 368.669 665.487 372.779 661.116 341.316 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 631.226 442.5 645.222 476.393 641.019 443.931 0.470588 0.470588 0.470588 epoly
1 0 0 0 406.847 208.892 428.675 215.078 401.14 226.935 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 406.847 208.892 401.14 226.935 387.798 222.292 393.568 203.974 0.498039 0.498039 0.498039 epoly
1 0 0 0 550.74 245.485 547.378 215.102 566.287 239.808 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 539.521 241.081 524.259 246.757 535.565 251.026 550.74 245.485 0.772549 0.772549 0.772549 epoly
1 0 0 0 416.946 251.913 414.74 221.078 427.656 225.727 429.945 256.151 0.482353 0.482353 0.482353 epoly
1 0 0 0 668.927 274.926 696.515 282.556 687.412 278.679 659.624 271.025 0.803922 0.803922 0.803922 epoly
1 0 0 0 623.202 319.077 627.612 299.994 629.248 301.217 0.466667 0.466667 0.466667 epoly
1 0 0 0 523.829 286.721 512.387 282.99 530.705 309.364 542.119 312.784 0.533333 0.533333 0.533333 epoly
1 0 0 0 412.573 190.791 399.358 185.596 387.799 222.292 401.141 226.935 0.498039 0.498039 0.498039 epoly
1 0 0 0 668.927 274.926 659.624 271.025 693.757 260.18 702.78 264.337 0.756863 0.756863 0.756863 epoly
1 0 0 0 403.198 257.447 389.779 262.849 376.311 258.751 389.766 253.217 0.784314 0.784314 0.784314 epoly
1 0 0 0 412.572 190.793 428.675 215.077 406.847 208.892 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 566.152 361.124 541.371 351.707 572.233 342.958 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 399.357 185.598 383.965 162.079 405.164 167.162 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 617.065 408.216 633.637 404.487 653.216 408.47 636.889 412.044 0.74902 0.74902 0.74902 epoly
1 0 0 0 393.568 203.974 399.357 185.598 412.572 190.793 406.847 208.892 0.501961 0.501961 0.501961 epoly
1 0 0 0 515.462 314.239 512.387 282.99 500.587 318.996 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 414.74 221.078 428.676 215.078 441.543 219.871 427.656 225.727 0.788235 0.788235 0.788235 epoly
1 0 0 0 629.365 241.708 656.279 248.639 650.045 267.008 623.314 259.676 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 401.14 226.933 403.198 257.447 416.948 251.912 414.741 221.077 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 547.378 215.102 550.74 245.485 539.521 241.081 536.21 210.288 0.47451 0.47451 0.47451 epoly
1 0 0 0 536.21 210.288 539.521 241.081 550.74 245.485 547.378 215.102 0.47451 0.47451 0.47451 epoly
1 0 0 0 631.224 442.5 614.976 445.704 607.955 428.828 624.165 425.408 0.376471 0.376471 0.376471 epoly
1 0 0 0 653.487 289.06 659.624 271.025 696.515 282.556 690.27 300.716 0.235294 0.235294 0.235294 epoly
1 0 0 0 454.038 224.524 441.544 219.869 458.375 244.94 470.885 249.321 0.537255 0.537255 0.537255 epoly
1 0 0 0 542.119 312.784 553.201 316.104 562.618 329.39 551.558 326.233 0.533333 0.533333 0.533333 epoly
1 0 0 0 476.794 231.025 488.871 235.553 494.733 217.475 482.724 212.671 0.494118 0.494118 0.494118 epoly
1 0 0 0 459.799 206.572 470.353 207.722 447.37 201.645 0.8 0.8 0.8 epoly
1 0 0 0 566.287 239.808 544.767 263.588 577.085 244.22 0.698039 0.698039 0.698039 epoly
1 0 0 0 662.987 387.593 669.937 404.808 653.212 408.469 646.298 391.473 0.368627 0.368627 0.368627 epoly
1 0 0 0 621.364 318.466 627.614 299.995 611.269 295.442 605.275 313.241 0.176471 0.176471 0.176471 epoly
1 0 0 0 549.891 249.628 577.083 244.221 544.768 263.588 0.698039 0.698039 0.698039 epoly
1 0 0 0 418.316 172.636 440.48 178.004 412.572 190.793 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 418.316 172.636 412.572 190.793 399.357 185.598 405.164 167.162 0.501961 0.501961 0.501961 epoly
1 0 0 0 542.119 312.784 563.763 289.514 553.201 316.104 0.698039 0.698039 0.698039 epoly
1 0 0 0 637.639 303.569 647.37 307.038 653.488 289.06 643.832 285.318 0.482353 0.482353 0.482353 epoly
1 0 0 0 614.977 445.707 631.225 442.502 617.065 408.214 600.894 411.852 0.372549 0.372549 0.372549 epoly
1 0 0 0 447.429 321.921 444.978 290.819 432.277 287.119 434.65 318.653 0.482353 0.482353 0.482353 epoly
1 0 0 0 577.083 244.221 586.813 256.83 554.165 276.415 544.768 263.588 0.227451 0.227451 0.227451 epoly
1 0 0 0 444.977 290.818 434.649 318.652 432.276 287.119 0.482353 0.482353 0.482353 epoly
1 0 0 0 387.799 222.292 399.358 185.596 380.167 210.062 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 482.725 212.671 470.353 207.722 441.543 219.871 454.037 224.526 0.780392 0.780392 0.780392 epoly
1 0 0 0 631.224 442.498 617.063 408.215 634.089 427.092 0.470588 0.470588 0.470588 epoly
1 0 0 0 627.614 299.995 611.269 295.442 637.639 303.569 0.8 0.8 0.8 epoly
1 0 0 0 653.214 408.47 669.939 404.809 655.996 370.279 639.344 374.38 0.372549 0.372549 0.372549 epoly
1 0 0 0 488.673 194.258 500.614 199.34 494.733 217.475 482.724 212.671 0.494118 0.494118 0.494118 epoly
1 0 0 0 541.371 351.707 566.152 361.124 555.045 358.417 530.151 348.922 0.662745 0.662745 0.662745 epoly
1 0 0 0 657.541 440.713 653.215 408.466 674.471 437.417 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 657.541 440.713 647.874 439.217 631.224 442.5 641.018 443.931 0.745098 0.745098 0.745098 epoly
1 0 0 0 453.214 183.361 476.371 189.022 465.578 188.561 0.8 0.8 0.8 epoly
1 0 0 0 647.37 307.038 646.351 306.01 641.271 324.959 0.466667 0.466667 0.466667 epoly
1 0 0 0 617.282 277.587 611.269 295.442 627.614 299.995 633.885 281.462 0.176471 0.176471 0.176471 epoly
1 0 0 0 405.294 288.511 391.77 284.711 376.311 258.751 389.779 262.849 0.537255 0.537255 0.537255 epoly
1 0 0 0 659.625 271.025 681.089 297.118 653.488 289.06 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 370.411 156.493 383.965 162.079 399.357 185.598 385.743 180.247 0.537255 0.537255 0.537255 epoly
1 0 0 0 446.474 281.915 459.119 285.736 444.977 290.818 432.276 287.119 0.776471 0.776471 0.776471 epoly
1 0 0 0 482.725 212.671 459.799 206.572 447.37 201.645 470.353 207.722 0.8 0.8 0.8 epoly
1 0 0 0 418.422 292.198 434.65 318.653 432.277 287.119 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 429.946 256.15 414.741 221.077 416.948 251.912 0.482353 0.482353 0.482353 epoly
1 0 0 0 426.355 184.476 428.674 215.079 412.571 190.792 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 530.705 309.362 509.496 332.382 521.064 335.419 542.119 312.782 0.701961 0.701961 0.701961 epoly
1 0 0 0 653.212 408.469 633.632 404.481 646.298 391.473 0.470588 0.470588 0.470588 epoly
1 0 0 0 541.371 351.707 530.151 348.922 561.199 339.972 572.233 342.958 0.760784 0.760784 0.760784 epoly
1 0 0 0 555.163 235.261 566.287 239.806 535.565 251.026 524.259 246.757 0.772549 0.772549 0.772549 epoly
1 0 0 0 657.541 440.713 653.215 408.466 647.874 439.217 0.470588 0.470588 0.470588 epoly
1 0 0 0 643.832 285.318 650.045 267.008 659.625 271.025 653.488 289.06 0.482353 0.482353 0.482353 epoly
1 0 0 0 533.477 259.459 512.385 282.993 524.259 246.757 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 607.955 428.827 600.893 411.853 617.064 408.215 624.165 425.407 0.368627 0.368627 0.368627 epoly
1 0 0 0 370.411 156.493 391.616 161.524 405.164 167.162 383.965 162.079 0.8 0.8 0.8 epoly
1 0 0 0 621.364 318.466 623.203 319.077 629.249 301.217 627.614 299.995 0.466667 0.466667 0.466667 epoly
1 0 0 0 617.065 408.214 631.225 442.502 627.123 410.156 0.47451 0.47451 0.47451 epoly
1 0 0 0 476.371 189.022 470.353 207.722 459.799 206.572 465.578 188.561 0.172549 0.172549 0.172549 epoly
1 0 0 0 677.84 336.861 661.116 341.316 655.995 370.278 673.062 366.076 0.32549 0.32549 0.32549 epoly
1 0 0 0 643.832 285.318 617.282 277.587 633.885 281.462 0.8 0.8 0.8 epoly
1 0 0 0 646.299 391.473 639.344 374.381 655.997 370.281 662.989 387.594 0.368627 0.368627 0.368627 epoly
1 0 0 0 416.947 251.912 403.555 247.546 376.312 258.751 389.78 262.849 0.780392 0.780392 0.780392 epoly
1 0 0 0 526.962 317.546 542.119 312.784 530.705 309.364 515.462 314.239 0.764706 0.764706 0.764706 epoly
1 0 0 0 655.996 370.279 669.939 404.809 665.488 372.78 0.470588 0.470588 0.470588 epoly
1 0 0 0 681.088 297.118 653.487 289.06 690.27 300.716 0.8 0.8 0.8 epoly
1 0 0 0 650.576 423.659 647.873 439.215 631.224 442.498 634.089 427.092 0.301961 0.301961 0.301961 epoly
1 0 0 0 524.195 366.905 530.15 348.922 566.152 361.124 560.091 379.231 0.231373 0.231373 0.231373 epoly
1 0 0 0 440.48 178.004 418.316 172.636 412.572 190.793 434.568 196.571 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 653.215 408.466 657.541 440.713 647.874 439.217 643.571 406.504 0.470588 0.470588 0.470588 epoly
1 0 0 0 509.496 332.382 530.705 309.362 500.587 318.996 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 607.955 428.827 594.255 442.842 600.893 411.853 0.47451 0.47451 0.47451 epoly
1 0 0 0 416.947 251.912 395.451 244.92 382.046 240.551 403.555 247.546 0.8 0.8 0.8 epoly
1 0 0 0 547.378 215.102 536.21 210.288 555.164 235.263 566.287 239.808 0.533333 0.533333 0.533333 epoly
1 0 0 0 646.351 306.01 627.612 299.994 623.202 319.077 641.271 324.959 0.815686 0.815686 0.815686 epoly
1 0 0 0 416.946 251.913 429.945 256.151 441.543 219.871 428.676 215.078 0.494118 0.494118 0.494118 epoly
1 0 0 0 646.299 391.473 633.633 404.481 639.344 374.381 0.470588 0.470588 0.470588 epoly
1 0 0 0 640.175 262.869 623.314 259.676 650.045 267.008 0.803922 0.803922 0.803922 epoly
1 0 0 0 653.216 408.47 633.637 404.487 650.577 423.66 0.470588 0.470588 0.470588 epoly
1 0 0 0 461.692 195.411 441.542 219.873 453.213 183.36 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 380.166 210.063 399.357 185.598 407.302 197.737 387.798 222.294 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 426.355 184.476 412.571 190.792 399.356 185.598 413.183 179.122 0.792157 0.792157 0.792157 epoly
1 0 0 0 434.65 318.651 418.423 292.198 440.552 300.312 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 669.939 404.807 665.489 372.778 687.077 401.056 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 416.948 251.912 405.294 288.511 403.198 257.447 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 366.456 205.148 374.055 217.51 387.799 222.292 380.167 210.062 0.537255 0.537255 0.537255 epoly
1 0 0 0 696.515 282.556 659.624 271.025 687.412 278.679 0.803922 0.803922 0.803922 epoly
1 0 0 0 629.365 241.708 623.314 259.676 640.175 262.869 646.487 244.215 0.176471 0.176471 0.176471 epoly
1 0 0 0 646.351 306.01 647.37 307.038 629.248 301.217 627.612 299.994 0.8 0.8 0.8 epoly
1 0 0 0 456.556 254.859 470.885 249.321 458.375 244.94 443.986 250.613 0.776471 0.776471 0.776471 epoly
1 0 0 0 539.521 241.081 536.21 210.288 524.259 246.757 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 512.385 282.993 500.601 279.151 512.614 242.36 524.259 246.757 0.490196 0.490196 0.490196 epoly
1 0 0 0 366.456 205.148 347.696 229.371 374.055 217.51 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 563.763 289.514 573.57 302.9 562.618 329.39 553.201 316.104 0.286275 0.286275 0.286275 epoly
1 0 0 0 399.357 185.598 380.166 210.063 385.743 180.247 0.717647 0.717647 0.717647 epoly
1 0 0 0 653.487 289.06 681.088 297.118 687.412 278.679 659.624 271.025 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 449.006 313.793 434.649 318.652 444.977 290.818 459.119 285.736 0.262745 0.262745 0.262745 epoly
1 0 0 0 440.552 300.312 418.423 292.198 446.474 281.915 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 530.705 309.364 512.387 282.99 515.462 314.239 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 633.636 404.486 650.576 423.659 634.089 427.092 617.063 408.215 0.815686 0.815686 0.815686 epoly
1 0 0 0 617.065 408.216 634.09 427.092 650.577 423.66 633.637 404.487 0.811765 0.811765 0.811765 epoly
1 0 0 0 530.151 348.923 548.912 376.801 524.196 366.905 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 656.279 248.639 629.365 241.708 646.487 244.215 0.803922 0.803922 0.803922 epoly
1 0 0 0 659.624 271.025 693.758 260.179 670.242 283.933 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 631.224 442.5 618.031 457.025 614.976 445.704 0.592157 0.592157 0.592157 epoly
1 0 0 0 428.675 215.078 415.417 210.138 387.798 222.292 401.14 226.935 0.788235 0.788235 0.788235 epoly
1 0 0 0 512.569 364.311 518.595 346.055 530.151 348.923 524.196 366.905 0.486275 0.486275 0.486275 epoly
1 0 0 0 562.617 329.39 584.454 306.449 572.234 342.959 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 586.812 256.829 559.479 262.491 549.889 249.628 577.081 244.221 0.423529 0.423529 0.423529 epoly
1 0 0 0 577.083 244.221 549.891 249.628 559.48 262.492 586.813 256.83 0.423529 0.423529 0.423529 epoly
1 0 0 0 653.488 289.061 647.37 307.038 627.613 299.994 633.883 281.462 0.482353 0.482353 0.482353 epoly
1 0 0 0 429.945 256.149 419.194 283.31 416.947 251.912 0.482353 0.482353 0.482353 epoly
1 0 0 0 441.543 219.871 470.353 207.722 447.37 201.645 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 665.489 372.778 669.939 404.807 660.427 402.765 655.996 370.277 0.470588 0.470588 0.470588 epoly
1 0 0 0 368.238 236.05 347.696 229.369 362.442 254.53 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 549.891 249.628 544.768 263.588 554.165 276.415 559.48 262.492 0.286275 0.286275 0.286275 epoly
1 0 0 0 356.451 150.741 370.411 156.493 364.705 174.799 350.683 169.33 0.505882 0.505882 0.505882 epoly
1 0 0 0 428.675 215.078 406.847 208.892 393.568 203.974 415.417 210.138 0.8 0.8 0.8 epoly
1 0 0 0 415.417 210.138 393.568 203.974 406.847 208.892 428.675 215.077 0.8 0.8 0.8 epoly
1 0 0 0 533.477 259.459 544.767 263.586 554.164 276.413 542.894 272.435 0.533333 0.533333 0.533333 epoly
1 0 0 0 555.162 235.261 577.081 244.221 549.889 249.628 0.698039 0.698039 0.698039 epoly
1 0 0 0 441.542 219.873 428.675 215.079 440.479 178.004 453.213 183.36 0.494118 0.494118 0.494118 epoly
1 0 0 0 548.911 376.801 524.195 366.905 560.091 379.231 0.662745 0.662745 0.662745 epoly
1 0 0 0 660.719 280.067 650.044 267.008 659.624 271.025 670.242 283.933 0.533333 0.533333 0.533333 epoly
1 0 0 0 542.894 272.435 512.385 282.993 533.477 259.459 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 458.375 244.94 441.544 219.869 443.986 250.613 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 431.038 246.239 443.986 250.613 429.945 256.149 416.947 251.912 0.780392 0.780392 0.780392 epoly
1 0 0 0 533.477 259.459 555.163 235.261 544.767 263.586 0.701961 0.701961 0.701961 epoly
1 0 0 0 682.416 368.669 677.84 336.861 699.765 364.458 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 682.416 368.669 673.062 366.076 655.995 370.278 665.487 372.779 0.74902 0.74902 0.74902 epoly
1 0 0 0 494.733 217.475 506.724 219.056 482.724 212.671 0.8 0.8 0.8 epoly
1 0 0 0 414.74 221.078 416.946 251.913 428.676 215.078 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 405.294 288.509 418.423 292.198 434.65 318.651 421.483 315.283 0.537255 0.537255 0.537255 epoly
1 0 0 0 653.488 289.061 652.678 287.412 646.351 306.01 647.37 307.038 0.466667 0.466667 0.466667 epoly
1 0 0 0 428.674 215.079 415.416 210.14 399.356 185.598 412.571 190.792 0.537255 0.537255 0.537255 epoly
1 0 0 0 415.417 210.138 428.675 215.077 412.572 190.793 399.357 185.598 0.537255 0.537255 0.537255 epoly
1 0 0 0 653.215 408.466 643.571 406.504 664.94 435.851 674.471 437.417 0.533333 0.533333 0.533333 epoly
1 0 0 0 461.73 317.173 464.387 349.185 447.429 321.919 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 446.474 281.915 443.986 250.611 459.119 285.736 0.482353 0.482353 0.482353 epoly
1 0 0 0 555.163 235.261 533.477 259.459 544.767 263.586 566.287 239.806 0.698039 0.698039 0.698039 epoly
1 0 0 0 682.416 368.669 677.84 336.861 673.062 366.076 0.466667 0.466667 0.466667 epoly
1 0 0 0 376.312 258.751 403.555 247.546 382.046 240.551 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 368.238 236.05 362.442 254.53 376.312 258.751 382.046 240.551 0.498039 0.498039 0.498039 epoly
1 0 0 0 418.423 292.198 440.552 300.312 427.453 296.661 405.294 288.509 0.666667 0.666667 0.666667 epoly
1 0 0 0 405.294 288.509 427.453 296.661 440.552 300.312 418.423 292.198 0.666667 0.666667 0.666667 epoly
1 0 0 0 566.152 361.124 530.15 348.922 555.045 358.417 0.658824 0.658824 0.658824 epoly
1 0 0 0 693.757 260.18 659.624 271.025 687.412 278.679 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 391.77 284.711 389.766 253.217 403.198 257.447 405.294 288.511 0.486275 0.486275 0.486275 epoly
1 0 0 0 405.294 288.511 403.198 257.447 389.766 253.217 391.77 284.711 0.486275 0.486275 0.486275 epoly
1 0 0 0 530.705 309.364 512.387 282.992 536.79 290.93 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 607.955 428.828 610.738 439.506 624.165 425.408 0.588235 0.588235 0.588235 epoly
1 0 0 0 418.423 292.198 405.294 288.509 433.443 277.977 446.474 281.915 0.776471 0.776471 0.776471 epoly
1 0 0 0 524.195 366.905 548.911 376.801 555.045 358.417 530.15 348.922 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 440.48 178.004 427.358 172.484 399.357 185.598 412.572 190.793 0.792157 0.792157 0.792157 epoly
1 0 0 0 550.74 245.485 566.287 239.808 555.164 235.263 539.521 241.081 0.772549 0.772549 0.772549 epoly
1 0 0 0 512.385 282.993 533.477 259.459 521.846 255.206 500.601 279.151 0.701961 0.701961 0.701961 epoly
1 0 0 0 500.601 279.151 521.846 255.206 533.477 259.459 512.385 282.993 0.701961 0.701961 0.701961 epoly
1 0 0 0 574.677 293.225 596.753 269.705 584.454 306.451 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 488.673 194.258 512.852 200.221 500.614 199.34 0.8 0.8 0.8 epoly
1 0 0 0 539.521 241.081 542.893 272.436 524.259 246.757 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 470.353 207.722 441.542 219.873 461.692 195.411 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 627.613 299.994 647.37 307.038 646.351 306.01 0.8 0.8 0.8 epoly
1 0 0 0 347.698 229.37 336.36 225.666 342.188 206.903 353.349 211.238 0.466667 0.466667 0.466667 epoly
1 0 0 0 536.79 290.93 512.387 282.992 542.894 272.435 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 677.84 336.861 682.416 368.669 673.062 366.076 668.502 333.815 0.466667 0.466667 0.466667 epoly
1 0 0 0 530.15 348.922 561.2 339.971 539.431 362.713 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 533.477 259.459 555.163 235.261 524.259 246.757 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 618.031 457.025 610.738 439.506 607.955 428.828 614.976 445.704 0.447059 0.447059 0.447059 epoly
1 0 0 0 681.088 297.118 690.27 300.716 696.515 282.556 687.412 278.679 0.482353 0.482353 0.482353 epoly
1 0 0 0 389.766 253.217 403.556 247.546 416.948 251.912 403.198 257.447 0.784314 0.784314 0.784314 epoly
1 0 0 0 440.48 178.004 418.316 172.636 405.164 167.162 427.358 172.484 0.8 0.8 0.8 epoly
1 0 0 0 562.617 329.39 572.234 342.959 561.2 339.973 551.557 326.233 0.533333 0.533333 0.533333 epoly
1 0 0 0 380.166 210.063 387.798 222.294 393.66 192.512 385.743 180.247 0.286275 0.286275 0.286275 epoly
1 0 0 0 376.311 258.751 391.77 284.711 389.766 253.217 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 443.986 250.611 458.375 244.938 473.61 280.529 459.119 285.736 0.333333 0.333333 0.333333 epoly
1 0 0 0 512.852 200.221 506.724 219.056 494.733 217.475 500.614 199.34 0.172549 0.172549 0.172549 epoly
1 0 0 0 586.813 256.828 554.162 276.415 576.046 252.558 0.698039 0.698039 0.698039 epoly
1 0 0 0 671.627 293.411 643.832 285.318 653.488 289.06 681.089 297.118 0.8 0.8 0.8 epoly
1 0 0 0 650.621 400.658 633.632 404.481 653.212 408.469 669.937 404.808 0.74902 0.74902 0.74902 epoly
1 0 0 0 554.165 276.415 586.813 256.83 559.48 262.492 0.698039 0.698039 0.698039 epoly
1 0 0 0 621.136 441.026 617.064 408.211 631.224 442.5 0.47451 0.47451 0.47451 epoly
1 0 0 0 461.73 317.173 447.429 321.919 434.65 318.651 449.008 313.792 0.768627 0.768627 0.768627 epoly
1 0 0 0 554.05 397.28 579.624 407.949 548.028 415.271 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 554.05 397.28 548.028 415.271 536.702 413.39 542.797 395.125 0.482353 0.482353 0.482353 epoly
1 0 0 0 562.618 329.39 573.57 302.9 551.558 326.233 0.698039 0.698039 0.698039 epoly
1 0 0 0 440.48 178.004 428.675 215.079 426.355 184.476 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 563.761 289.517 554.162 276.415 586.813 256.828 596.752 269.707 0.227451 0.227451 0.227451 epoly
1 0 0 0 433.443 277.979 419.194 283.31 429.945 256.149 443.986 250.613 0.262745 0.262745 0.262745 epoly
1 0 0 0 527.89 360.023 518.594 346.054 530.15 348.922 539.431 362.713 0.537255 0.537255 0.537255 epoly
1 0 0 0 347.698 229.37 353.349 211.238 359.893 212.581 354.012 231.412 0.172549 0.172549 0.172549 epoly
1 0 0 0 652.678 287.412 653.488 289.061 633.883 281.462 0.8 0.8 0.8 epoly
1 0 0 0 364.707 174.8 359.019 193.048 330.421 182.513 336.235 163.694 0.505882 0.505882 0.505882 epoly
1 0 0 0 533.477 259.459 524.259 246.757 512.614 242.36 521.846 255.206 0.533333 0.533333 0.533333 epoly
1 0 0 0 476.371 189.022 453.214 183.361 447.37 201.645 470.353 207.722 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 509.496 332.382 530.705 309.362 518.595 346.055 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 428.675 215.079 448.948 190.179 461.692 195.411 441.542 219.873 0.713725 0.713725 0.713725 epoly
1 0 0 0 441.542 219.873 461.692 195.411 448.948 190.179 428.675 215.079 0.709804 0.709804 0.709804 epoly
1 0 0 0 665.489 372.778 655.996 370.277 677.707 398.931 687.077 401.056 0.533333 0.533333 0.533333 epoly
1 0 0 0 554.163 276.413 521.447 296.039 542.893 272.434 0.698039 0.698039 0.698039 epoly
1 0 0 0 671.627 293.411 681.089 297.118 659.625 271.025 650.045 267.008 0.533333 0.533333 0.533333 epoly
1 0 0 0 584.454 306.449 562.617 329.39 551.557 326.233 573.569 302.9 0.698039 0.698039 0.698039 epoly
1 0 0 0 696.515 282.556 702.78 264.337 693.757 260.18 687.412 278.679 0.482353 0.482353 0.482353 epoly
1 0 0 0 387.798 222.292 415.417 210.138 393.568 203.974 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 594.255 442.842 607.955 428.827 624.165 425.407 610.739 439.504 0.584314 0.584314 0.584314 epoly
1 0 0 0 382.046 240.551 403.556 247.546 397.654 266.158 376.313 258.751 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 555.164 235.263 536.21 210.288 539.521 241.081 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 539.521 241.081 524.259 246.757 512.614 242.36 527.962 236.543 0.772549 0.772549 0.772549 epoly
1 0 0 0 586.812 256.829 577.081 244.221 555.162 235.261 564.95 248.157 0.533333 0.533333 0.533333 epoly
1 0 0 0 706.139 346.069 677.839 336.863 712.535 327.62 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 530.704 309.366 521.447 296.039 554.163 276.413 563.762 289.515 0.227451 0.227451 0.227451 epoly
1 0 0 0 650.621 400.658 662.987 387.593 646.298 391.473 633.632 404.481 0.588235 0.588235 0.588235 epoly
1 0 0 0 633.633 404.481 646.299 391.473 662.989 387.594 650.623 400.659 0.588235 0.588235 0.588235 epoly
1 0 0 0 500.602 279.15 512.387 282.992 530.705 309.364 518.943 305.84 0.533333 0.533333 0.533333 epoly
1 0 0 0 548.911 376.801 560.091 379.231 554.05 397.28 542.797 395.125 0.482353 0.482353 0.482353 epoly
1 0 0 0 555.163 235.261 564.952 248.157 554.164 276.413 544.767 263.586 0.286275 0.286275 0.286275 epoly
1 0 0 0 425.107 264.804 405.294 288.511 416.947 251.912 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 563.632 411.655 567.235 444.677 548.028 415.271 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 617.064 408.211 633.636 404.482 647.874 439.217 631.224 442.5 0.368627 0.368627 0.368627 epoly
1 0 0 0 633.636 404.486 617.063 408.215 631.224 442.498 647.873 439.215 0.368627 0.368627 0.368627 epoly
1 0 0 0 557.65 307.904 561.199 339.974 542.118 312.784 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 684.458 255.895 693.758 260.179 659.624 271.025 650.044 267.008 0.760784 0.760784 0.760784 epoly
1 0 0 0 446.474 281.915 449.006 313.793 459.119 285.736 0.482353 0.482353 0.482353 epoly
1 0 0 0 359.019 193.048 348.035 188.077 353.901 169.19 364.707 174.8 0.466667 0.466667 0.466667 epoly
1 0 0 0 364.707 174.8 353.901 169.19 348.035 188.077 359.019 193.048 0.466667 0.466667 0.466667 epoly
1 0 0 0 393.568 203.974 415.417 210.138 399.357 185.598 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 561.199 339.972 530.151 348.922 555.045 358.417 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 500.602 279.15 525.101 287.118 536.79 290.93 512.387 282.992 0.8 0.8 0.8 epoly
1 0 0 0 512.387 282.992 536.79 290.93 525.101 287.118 500.602 279.15 0.8 0.8 0.8 epoly
1 0 0 0 391.771 284.71 376.313 258.751 397.654 266.158 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 391.616 161.524 370.411 156.493 385.743 180.247 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 650.576 423.659 633.636 404.486 647.873 439.215 0.470588 0.470588 0.470588 epoly
1 0 0 0 461.692 195.411 453.213 183.36 440.479 178.004 448.948 190.179 0.533333 0.533333 0.533333 epoly
1 0 0 0 336.36 225.666 347.698 229.37 354.012 231.412 0.8 0.8 0.8 epoly
1 0 0 0 594.255 442.842 610.739 439.504 617.064 408.215 600.893 411.853 0.286275 0.286275 0.286275 epoly
1 0 0 0 574.677 293.225 584.454 306.451 573.57 302.902 563.762 289.515 0.533333 0.533333 0.533333 epoly
1 0 0 0 364.705 174.799 371.712 174.731 350.683 169.33 0.8 0.8 0.8 epoly
1 0 0 0 500.601 279.151 512.385 282.993 542.894 272.435 531.28 268.334 0.772549 0.772549 0.772549 epoly
1 0 0 0 512.387 282.992 500.602 279.15 531.28 268.334 542.894 272.435 0.768627 0.768627 0.768627 epoly
1 0 0 0 657.541 440.713 674.471 437.417 664.94 435.851 647.874 439.217 0.745098 0.745098 0.745098 epoly
1 0 0 0 670.242 283.933 693.758 260.179 681.089 297.119 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 573.569 302.902 542.118 312.786 563.762 289.515 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 473.61 280.529 470.885 249.319 488.462 275.191 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 446.474 281.915 459.119 285.736 473.61 280.529 461.026 276.58 0.776471 0.776471 0.776471 epoly
1 0 0 0 548.911 376.801 560.091 379.231 566.152 361.124 555.045 358.417 0.482353 0.482353 0.482353 epoly
1 0 0 0 633.633 404.481 650.623 400.659 655.997 370.281 639.344 374.381 0.301961 0.301961 0.301961 epoly
1 0 0 0 563.763 289.514 542.119 312.784 551.558 326.233 573.57 302.9 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 662.987 387.593 650.621 400.658 669.937 404.808 0.470588 0.470588 0.470588 epoly
1 0 0 0 470.352 207.722 453.214 183.36 476.371 189.022 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 449.006 313.793 446.474 281.915 432.276 287.119 434.649 318.652 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 458.375 244.94 446.473 281.917 443.986 250.613 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 464.387 349.185 451.588 346.262 434.65 318.651 447.429 321.919 0.537255 0.537255 0.537255 epoly
1 0 0 0 359.019 193.048 364.707 174.8 371.713 174.732 365.793 193.688 0.172549 0.172549 0.172549 epoly
1 0 0 0 537.389 374.297 512.569 364.311 524.196 366.905 548.912 376.801 0.662745 0.662745 0.662745 epoly
1 0 0 0 330.421 182.513 359.019 193.048 348.035 188.077 0.8 0.8 0.8 epoly
1 0 0 0 677.84 336.861 668.502 333.815 690.558 361.767 699.765 364.458 0.533333 0.533333 0.533333 epoly
1 0 0 0 415.418 210.139 387.797 222.293 407.301 197.736 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 596.753 269.705 574.677 293.225 563.762 289.515 586.02 265.585 0.698039 0.698039 0.698039 epoly
1 0 0 0 399.357 185.598 427.358 172.484 405.164 167.162 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 391.616 161.524 385.743 180.247 399.357 185.598 405.164 167.162 0.501961 0.501961 0.501961 epoly
1 0 0 0 359.893 212.581 353.349 211.238 342.188 206.903 0.8 0.8 0.8 epoly
1 0 0 0 563.632 411.655 548.028 415.271 536.702 413.39 552.402 409.696 0.752941 0.752941 0.752941 epoly
1 0 0 0 557.65 307.904 542.118 312.784 530.704 309.364 546.329 304.367 0.760784 0.760784 0.760784 epoly
1 0 0 0 356.451 150.741 377.652 155.712 370.411 156.493 0.8 0.8 0.8 epoly
1 0 0 0 643.832 285.318 633.885 281.462 627.614 299.995 637.639 303.569 0.482353 0.482353 0.482353 epoly
1 0 0 0 677.839 336.863 706.139 346.069 697.014 343.092 668.501 333.817 0.8 0.8 0.8 epoly
1 0 0 0 415.416 210.14 413.184 179.122 426.355 184.476 428.675 215.079 0.482353 0.482353 0.482353 epoly
1 0 0 0 428.674 215.079 426.355 184.476 413.183 179.122 415.416 210.14 0.482353 0.482353 0.482353 epoly
1 0 0 0 509.496 332.382 518.595 346.055 506.687 343.1 497.579 329.253 0.537255 0.537255 0.537255 epoly
1 0 0 0 537.389 374.297 548.912 376.801 530.151 348.923 518.595 346.055 0.537255 0.537255 0.537255 epoly
1 0 0 0 542.893 272.436 531.278 268.336 512.614 242.36 524.259 246.757 0.533333 0.533333 0.533333 epoly
1 0 0 0 405.294 288.511 391.77 284.711 403.555 247.546 416.947 251.912 0.494118 0.494118 0.494118 epoly
1 0 0 0 391.77 284.711 405.294 288.511 416.948 251.912 403.556 247.546 0.494118 0.494118 0.494118 epoly
1 0 0 0 566.152 361.124 572.233 342.958 561.199 339.972 555.045 358.417 0.482353 0.482353 0.482353 epoly
1 0 0 0 428.675 215.079 441.542 219.873 470.353 207.722 457.602 202.622 0.788235 0.788235 0.788235 epoly
1 0 0 0 617.064 408.215 610.739 439.504 624.165 425.407 0.47451 0.47451 0.47451 epoly
1 0 0 0 530.704 309.366 552.516 285.693 563.762 289.515 542.118 312.786 0.701961 0.701961 0.701961 epoly
1 0 0 0 393.66 192.512 387.798 222.294 407.302 197.737 0.717647 0.717647 0.717647 epoly
1 0 0 0 506.687 343.1 476.806 352.021 497.579 329.253 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 470.885 249.319 473.61 280.529 461.026 276.58 458.375 244.938 0.478431 0.478431 0.478431 epoly
1 0 0 0 677.839 336.863 668.501 333.817 703.493 324.356 712.535 327.62 0.752941 0.752941 0.752941 epoly
1 0 0 0 488.673 194.258 512.852 200.221 482.724 212.671 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 377.652 155.712 371.712 174.731 364.705 174.799 370.411 156.493 0.172549 0.172549 0.172549 epoly
1 0 0 0 488.673 194.258 482.724 212.671 470.352 207.722 476.371 189.022 0.494118 0.494118 0.494118 epoly
1 0 0 0 664.94 435.851 643.571 406.504 647.874 439.217 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 353.901 169.19 364.707 174.8 336.235 163.694 0.8 0.8 0.8 epoly
1 0 0 0 621.136 441.026 631.224 442.5 647.874 439.217 637.913 437.674 0.74902 0.74902 0.74902 epoly
1 0 0 0 655.997 370.281 650.623 400.659 662.989 387.594 0.470588 0.470588 0.470588 epoly
1 0 0 0 362.442 254.53 376.313 258.751 391.771 284.71 377.833 280.793 0.537255 0.537255 0.537255 epoly
1 0 0 0 643.832 285.318 671.627 293.411 650.045 267.008 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 458.374 244.939 470.884 249.321 479.578 262.117 467.065 257.883 0.537255 0.537255 0.537255 epoly
1 0 0 0 500.601 279.149 512.615 242.358 515.749 273.809 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 413.184 179.122 427.358 172.484 440.48 178.004 426.355 184.476 0.796078 0.796078 0.796078 epoly
1 0 0 0 348.035 188.077 359.019 193.048 365.793 193.688 0.8 0.8 0.8 epoly
1 0 0 0 374.053 217.511 393.659 192.512 407.301 197.736 387.797 222.293 0.721569 0.721569 0.721569 epoly
1 0 0 0 586.019 265.587 596.752 269.707 586.813 256.828 576.046 252.558 0.533333 0.533333 0.533333 epoly
1 0 0 0 399.356 185.598 415.416 210.14 413.183 179.122 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 530.705 309.362 509.496 332.382 497.579 329.253 518.943 305.838 0.701961 0.701961 0.701961 epoly
1 0 0 0 549.828 336.893 561.2 339.971 530.15 348.922 518.594 346.054 0.760784 0.760784 0.760784 epoly
1 0 0 0 669.939 404.807 687.077 401.056 677.707 398.931 660.427 402.765 0.74902 0.74902 0.74902 epoly
1 0 0 0 643.832 285.318 633.885 281.462 640.176 262.869 650.045 267.008 0.482353 0.482353 0.482353 epoly
1 0 0 0 652.256 472.528 647.874 439.215 661.946 473.542 0.470588 0.470588 0.470588 epoly
1 0 0 0 512.614 242.36 500.601 279.151 521.846 255.206 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 362.442 254.53 383.783 261.951 397.654 266.158 376.313 258.751 0.666667 0.666667 0.666667 epoly
1 0 0 0 586.02 265.587 554.163 276.415 576.047 252.559 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 383.783 261.951 376.313 258.751 397.654 266.158 0.666667 0.666667 0.666667 epoly
1 0 0 0 578.333 324.734 604.646 333.77 572.233 342.958 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 458.374 244.939 479.202 220.3 470.884 249.321 0.705882 0.705882 0.705882 epoly
1 0 0 0 578.333 324.734 572.233 342.958 561.199 339.972 567.374 321.467 0.486275 0.486275 0.486275 epoly
1 0 0 0 563.761 289.517 586.019 265.587 576.046 252.558 554.162 276.415 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 618.031 457.025 631.224 442.5 624.165 425.408 610.738 439.506 0.47451 0.47451 0.47451 epoly
1 0 0 0 494.512 380.114 476.808 352.02 500.59 361.637 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 443.986 250.611 446.474 281.915 461.026 276.58 458.375 244.938 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 440.479 178.004 453.214 183.36 470.352 207.722 457.601 202.621 0.537255 0.537255 0.537255 epoly
1 0 0 0 382.046 240.551 376.313 258.751 383.783 261.951 389.752 243.046 0.172549 0.172549 0.172549 epoly
1 0 0 0 552.516 285.693 563.762 289.515 554.163 276.413 542.893 272.434 0.533333 0.533333 0.533333 epoly
1 0 0 0 559.479 262.491 586.812 256.829 564.95 248.157 0.698039 0.698039 0.698039 epoly
1 0 0 0 464.386 349.185 485.3 326.029 497.579 329.253 476.806 352.021 0.705882 0.705882 0.705882 epoly
1 0 0 0 539.431 362.713 561.2 339.971 548.912 376.801 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 670.242 283.933 681.089 297.119 671.627 293.411 660.719 280.067 0.533333 0.533333 0.533333 epoly
1 0 0 0 584.454 306.449 573.569 302.9 561.2 339.973 572.234 342.959 0.486275 0.486275 0.486275 epoly
1 0 0 0 433.444 277.977 405.294 288.511 425.107 264.804 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 405.165 167.162 427.358 172.484 421.378 191.342 399.357 185.598 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 371.713 174.732 364.707 174.8 353.901 169.19 0.8 0.8 0.8 epoly
1 0 0 0 440.479 178.004 463.691 183.626 476.371 189.022 453.214 183.36 0.8 0.8 0.8 epoly
1 0 0 0 530.704 309.366 552.516 285.693 542.893 272.434 521.447 296.039 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 554.164 276.413 564.952 248.157 542.894 272.435 0.698039 0.698039 0.698039 epoly
1 0 0 0 656.279 248.639 646.487 244.215 640.175 262.869 650.045 267.008 0.486275 0.486275 0.486275 epoly
1 0 0 0 433.443 277.979 431.038 246.239 443.986 250.613 446.473 281.917 0.482353 0.482353 0.482353 epoly
1 0 0 0 399.357 185.598 385.743 180.247 393.66 192.512 407.302 197.737 0.537255 0.537255 0.537255 epoly
1 0 0 0 434.65 318.651 446.475 281.913 449.008 313.792 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 431.038 246.239 433.443 277.979 443.986 250.613 0.482353 0.482353 0.482353 epoly
1 0 0 0 567.235 444.677 555.956 443.205 536.702 413.39 548.028 415.271 0.537255 0.537255 0.537255 epoly
1 0 0 0 403.556 247.546 382.046 240.551 389.752 243.046 0.8 0.8 0.8 epoly
1 0 0 0 561.199 339.974 549.827 336.896 530.704 309.364 542.118 312.784 0.533333 0.533333 0.533333 epoly
1 0 0 0 573.568 302.902 584.453 306.451 578.333 324.734 567.374 321.467 0.486275 0.486275 0.486275 epoly
1 0 0 0 542.893 272.436 564.951 248.159 576.047 252.559 554.163 276.415 0.698039 0.698039 0.698039 epoly
1 0 0 0 554.05 397.28 568.498 405.908 542.797 395.125 0.662745 0.662745 0.662745 epoly
1 0 0 0 647.874 439.215 664.941 435.849 679.086 470.623 661.946 473.542 0.376471 0.376471 0.376471 epoly
1 0 0 0 440.479 178.004 428.675 215.079 448.948 190.179 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 693.758 260.179 670.242 283.933 660.719 280.067 684.458 255.895 0.694118 0.694118 0.694118 epoly
1 0 0 0 684.458 255.895 660.719 280.067 670.242 283.933 693.758 260.179 0.694118 0.694118 0.694118 epoly
1 0 0 0 512.569 364.311 537.389 374.297 506.563 382.508 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 512.569 364.311 506.563 382.508 494.512 380.114 500.59 361.637 0.486275 0.486275 0.486275 epoly
1 0 0 0 512.852 200.221 488.673 194.258 482.724 212.671 506.724 219.056 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 427.453 296.661 405.294 288.509 421.483 315.283 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 415.418 210.139 399.357 185.598 421.378 191.342 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 677.707 398.931 655.996 370.277 660.427 402.765 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 610.74 439.507 617.064 408.211 621.136 441.026 0.47451 0.47451 0.47451 epoly
1 0 0 0 389.766 253.217 391.77 284.711 403.556 247.546 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 610.74 439.508 631.226 442.502 618.033 457.027 0.47451 0.47451 0.47451 epoly
1 0 0 0 643.832 285.318 671.627 293.411 633.885 281.462 0.8 0.8 0.8 epoly
1 0 0 0 633.636 404.482 637.913 437.674 621.136 441.026 617.064 408.211 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 617.064 408.211 621.136 441.026 637.913 437.674 633.636 404.482 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 431.038 246.239 445.483 240.424 458.375 244.94 443.986 250.613 0.780392 0.780392 0.780392 epoly
1 0 0 0 512.614 242.36 524.706 205.33 527.962 236.543 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 391.77 284.711 411.693 260.588 425.107 264.804 405.294 288.511 0.717647 0.717647 0.717647 epoly
1 0 0 0 405.294 288.511 425.107 264.804 411.693 260.588 391.77 284.711 0.713725 0.713725 0.713725 epoly
1 0 0 0 431.038 246.239 433.443 277.979 416.947 251.912 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 500.617 237.828 512.615 242.358 500.601 279.149 488.46 275.191 0.490196 0.490196 0.490196 epoly
1 0 0 0 579.624 407.949 568.498 405.908 536.702 413.39 548.028 415.271 0.752941 0.752941 0.752941 epoly
1 0 0 0 530.704 309.366 542.118 312.786 573.569 302.902 562.35 299.243 0.764706 0.764706 0.764706 epoly
1 0 0 0 671.627 293.411 643.832 285.318 650.045 267.008 678.032 274.685 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 433.443 277.979 431.038 246.239 416.947 251.912 419.194 283.31 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 682.416 368.669 699.765 364.458 690.558 361.767 673.062 366.076 0.74902 0.74902 0.74902 epoly
1 0 0 0 650.623 400.661 655.995 370.277 660.426 402.765 0.470588 0.470588 0.470588 epoly
1 0 0 0 433.443 277.977 405.294 288.509 427.453 296.661 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 673.062 366.074 677.706 398.931 660.426 402.765 655.995 370.277 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 512.569 364.311 537.389 374.297 518.595 346.055 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 473.61 280.529 458.375 244.938 461.026 276.58 0.478431 0.478431 0.478431 epoly
1 0 0 0 548.911 376.801 574.8 387.166 560.091 379.231 0.662745 0.662745 0.662745 epoly
1 0 0 0 660.719 280.067 684.458 255.895 650.044 267.008 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 464.388 349.183 476.808 352.02 494.512 380.114 482.091 377.647 0.537255 0.537255 0.537255 epoly
1 0 0 0 470.885 249.319 458.375 244.938 475.947 271.111 488.462 275.191 0.537255 0.537255 0.537255 epoly
1 0 0 0 374.053 217.511 387.797 222.293 415.418 210.139 401.751 205.047 0.792157 0.792157 0.792157 epoly
1 0 0 0 579.624 407.949 554.05 397.28 542.797 395.125 568.498 405.908 0.658824 0.658824 0.658824 epoly
1 0 0 0 647.876 439.219 634.978 453.837 618.033 457.027 631.226 442.502 0.596078 0.596078 0.596078 epoly
1 0 0 0 561.2 339.973 573.569 302.9 551.557 326.233 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 521.784 378.453 525.032 411.453 506.562 382.507 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 586.019 265.587 563.761 289.517 596.752 269.707 0.698039 0.698039 0.698039 epoly
1 0 0 0 596.753 269.705 586.02 265.585 573.57 302.902 584.454 306.451 0.486275 0.486275 0.486275 epoly
1 0 0 0 559.479 262.491 564.95 248.157 555.162 235.261 549.889 249.628 0.286275 0.286275 0.286275 epoly
1 0 0 0 640.176 262.869 678.032 274.685 650.045 267.008 0.803922 0.803922 0.803922 epoly
1 0 0 0 427.453 296.661 421.483 315.283 434.65 318.651 440.552 300.312 0.494118 0.494118 0.494118 epoly
1 0 0 0 356.451 150.741 371.712 174.731 350.683 169.33 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 464.388 349.183 488.242 358.882 500.59 361.637 476.808 352.02 0.662745 0.662745 0.662745 epoly
1 0 0 0 500.601 279.149 531.279 268.332 509.673 292.351 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 555.163 235.261 533.477 259.459 542.894 272.435 564.952 248.157 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 574.8 387.166 568.498 405.908 554.05 397.28 560.091 379.231 0.172549 0.172549 0.172549 epoly
1 0 0 0 464.387 349.185 461.73 317.173 449.008 313.792 451.588 346.262 0.482353 0.482353 0.482353 epoly
1 0 0 0 425.107 264.804 416.947 251.912 403.555 247.546 411.693 260.588 0.537255 0.537255 0.537255 epoly
1 0 0 0 336.235 163.694 342.067 144.813 356.451 150.741 350.683 169.33 0.505882 0.505882 0.505882 epoly
1 0 0 0 573.57 302.902 561.199 339.974 557.65 307.904 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 539.431 362.713 548.912 376.801 537.39 374.297 527.89 360.023 0.537255 0.537255 0.537255 epoly
1 0 0 0 521.846 255.206 531.28 268.334 542.894 272.435 533.477 259.459 0.533333 0.533333 0.533333 epoly
1 0 0 0 433.444 277.976 446.475 281.913 434.65 318.651 421.483 315.283 0.494118 0.494118 0.494118 epoly
1 0 0 0 415.416 210.14 428.675 215.079 440.48 178.004 427.358 172.484 0.498039 0.498039 0.498039 epoly
1 0 0 0 464.386 349.185 476.806 352.021 506.687 343.1 494.413 340.053 0.764706 0.764706 0.764706 epoly
1 0 0 0 479.202 220.3 488.249 233.158 479.578 262.117 470.884 249.321 0.286275 0.286275 0.286275 epoly
1 0 0 0 552.516 285.693 530.704 309.366 563.762 289.515 0.698039 0.698039 0.698039 epoly
1 0 0 0 647.876 439.219 631.226 442.502 610.74 439.508 627.644 436.085 0.74902 0.74902 0.74902 epoly
1 0 0 0 521.846 255.206 500.601 279.151 531.28 268.334 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 431.038 246.239 416.947 251.912 403.555 247.546 417.693 241.732 0.780392 0.780392 0.780392 epoly
1 0 0 0 524.64 327.739 549.828 336.895 518.595 346.055 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 524.64 327.739 518.595 346.055 506.687 343.1 512.805 324.501 0.486275 0.486275 0.486275 epoly
1 0 0 0 598.36 352.407 572.233 342.958 604.647 333.77 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 679.084 470.623 674.47 437.414 696.656 467.63 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 690.558 361.767 668.502 333.815 673.062 366.076 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 652.256 472.528 661.946 473.542 679.086 470.623 669.537 469.552 0.745098 0.745098 0.745098 epoly
1 0 0 0 385.743 180.247 399.357 185.598 415.418 210.139 401.751 205.047 0.537255 0.537255 0.537255 epoly
1 0 0 0 647.874 439.217 633.636 404.482 637.913 437.674 0.470588 0.470588 0.470588 epoly
1 0 0 0 542.893 272.436 539.521 241.081 527.962 236.543 531.278 268.336 0.47451 0.47451 0.47451 epoly
1 0 0 0 497.538 288.551 488.46 275.191 500.601 279.149 509.673 292.351 0.537255 0.537255 0.537255 epoly
1 0 0 0 440.552 300.312 446.474 281.915 433.443 277.977 427.453 296.661 0.490196 0.490196 0.490196 epoly
1 0 0 0 664.94 435.851 652.256 472.53 647.874 439.217 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 479.579 262.117 500.617 237.828 488.462 275.191 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 434.65 318.651 451.588 346.262 449.008 313.792 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 530.705 309.362 518.943 305.838 506.687 343.1 518.595 346.055 0.486275 0.486275 0.486275 epoly
1 0 0 0 442.958 208.927 445.482 240.426 428.675 215.077 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 561.2 339.971 539.431 362.713 527.89 360.023 549.828 336.893 0.698039 0.698039 0.698039 epoly
1 0 0 0 549.828 336.893 527.89 360.023 539.431 362.713 561.2 339.971 0.698039 0.698039 0.698039 epoly
1 0 0 0 512.853 200.22 524.706 205.33 512.614 242.36 500.615 237.829 0.494118 0.494118 0.494118 epoly
1 0 0 0 542.893 272.436 554.163 276.415 586.02 265.587 574.955 261.34 0.768627 0.768627 0.768627 epoly
1 0 0 0 558.598 391.196 536.703 413.392 548.911 376.801 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 552.516 285.693 530.704 309.366 542.893 272.434 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 677.706 398.931 673.062 366.074 687.076 401.055 0.470588 0.470588 0.470588 epoly
1 0 0 0 385.743 180.247 407.781 185.952 421.378 191.342 399.357 185.598 0.8 0.8 0.8 epoly
1 0 0 0 407.781 185.952 399.357 185.598 421.378 191.342 0.8 0.8 0.8 epoly
1 0 0 0 521.784 378.453 506.562 382.507 494.511 380.114 509.815 375.967 0.756863 0.756863 0.756863 epoly
1 0 0 0 503.687 269.719 488.46 275.191 500.601 279.149 515.749 273.809 0.772549 0.772549 0.772549 epoly
1 0 0 0 602.932 251.245 630.002 258.603 596.752 269.707 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 530.705 309.364 549.828 336.895 524.64 327.739 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 602.932 251.245 596.752 269.707 586.019 265.587 592.275 246.837 0.486275 0.486275 0.486275 epoly
1 0 0 0 678.031 274.684 650.044 267.008 684.457 255.896 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 525.101 287.118 500.602 279.15 518.943 305.84 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 448.948 190.179 457.602 202.622 470.353 207.722 461.692 195.411 0.537255 0.537255 0.537255 epoly
1 0 0 0 391.77 284.711 405.294 288.511 433.444 277.977 420.011 273.918 0.780392 0.780392 0.780392 epoly
1 0 0 0 405.165 167.162 399.357 185.598 407.781 185.952 413.83 166.794 0.172549 0.172549 0.172549 epoly
1 0 0 0 512.805 324.501 518.943 305.84 530.705 309.364 524.64 327.739 0.486275 0.486275 0.486275 epoly
1 0 0 0 640.045 324.548 621.363 318.466 627.613 299.994 646.351 306.01 0.235294 0.235294 0.235294 epoly
1 0 0 0 503.687 269.719 512.615 242.358 515.749 273.809 0.478431 0.478431 0.478431 epoly
1 0 0 0 573.57 302.902 586.02 265.585 563.762 289.515 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 512.614 242.36 531.278 268.336 527.962 236.543 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 448.948 190.179 428.675 215.079 457.602 202.622 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 527.964 236.541 531.28 268.334 515.749 273.809 512.615 242.358 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 452.414 263.457 475.946 271.111 446.474 281.915 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 452.414 263.457 446.474 281.915 433.443 277.977 439.453 259.231 0.494118 0.494118 0.494118 epoly
1 0 0 0 531.28 268.334 500.602 279.15 525.101 287.118 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 674.47 437.414 679.084 470.623 669.535 469.551 664.939 435.849 0.470588 0.470588 0.470588 epoly
1 0 0 0 527.89 360.023 549.828 336.893 518.594 346.054 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 377.652 155.712 356.451 150.741 350.683 169.33 371.712 174.731 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 427.358 172.484 405.165 167.162 413.83 166.794 0.8 0.8 0.8 epoly
1 0 0 0 433.443 277.979 446.473 281.917 458.375 244.94 445.483 240.424 0.494118 0.494118 0.494118 epoly
1 0 0 0 512.852 200.221 500.631 194.953 470.352 207.722 482.724 212.671 0.780392 0.780392 0.780392 epoly
1 0 0 0 598.552 228.026 609.132 232.723 602.932 251.245 592.275 246.837 0.486275 0.486275 0.486275 epoly
1 0 0 0 578.333 324.734 593.833 330.565 567.374 321.467 0.658824 0.658824 0.658824 epoly
1 0 0 0 673.062 366.074 690.558 361.765 704.643 397.21 687.076 401.055 0.368627 0.368627 0.368627 epoly
1 0 0 0 613.17 264.225 617.282 296.313 596.752 269.707 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 500.617 237.828 503.687 269.719 515.749 273.809 512.615 242.358 0.478431 0.478431 0.478431 epoly
1 0 0 0 693.758 260.179 684.458 255.895 671.627 293.411 681.089 297.119 0.482353 0.482353 0.482353 epoly
1 0 0 0 435.895 310.307 421.483 315.283 434.65 318.651 449.008 313.792 0.772549 0.772549 0.772549 epoly
1 0 0 0 442.958 208.927 428.675 215.077 415.417 210.138 429.752 203.831 0.788235 0.788235 0.788235 epoly
1 0 0 0 536.702 413.39 568.498 405.908 542.797 395.125 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 458.374 244.939 475.946 271.111 452.414 263.457 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 633.636 404.482 617.064 408.211 610.74 439.507 627.644 436.084 0.301961 0.301961 0.301961 epoly
1 0 0 0 525.101 287.118 518.943 305.84 530.705 309.364 536.79 290.93 0.490196 0.490196 0.490196 epoly
1 0 0 0 652.678 287.412 633.883 281.462 627.613 299.994 646.351 306.01 0.235294 0.235294 0.235294 epoly
1 0 0 0 572.233 342.958 598.36 352.407 587.468 349.496 561.2 339.972 0.658824 0.658824 0.658824 epoly
1 0 0 0 413.184 179.122 415.416 210.14 427.358 172.484 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 433.443 277.979 420.01 273.919 403.555 247.546 416.947 251.912 0.537255 0.537255 0.537255 epoly
1 0 0 0 601.51 460.139 594.258 442.847 610.742 439.509 618.036 457.028 0.372549 0.372549 0.372549 epoly
1 0 0 0 567.235 444.677 563.632 411.655 552.402 409.696 555.956 443.205 0.478431 0.478431 0.478431 epoly
1 0 0 0 549.827 336.896 546.329 304.367 557.65 307.904 561.199 339.974 0.47451 0.47451 0.47451 epoly
1 0 0 0 561.199 339.974 557.65 307.904 546.329 304.367 549.827 336.896 0.47451 0.47451 0.47451 epoly
1 0 0 0 647.874 439.215 652.256 472.528 669.537 469.552 664.941 435.849 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 439.453 259.231 445.482 240.424 458.374 244.939 452.414 263.457 0.494118 0.494118 0.494118 epoly
1 0 0 0 563.63 411.655 555.955 443.205 552.401 409.695 0.47451 0.47451 0.47451 epoly
1 0 0 0 473.61 280.529 488.462 275.191 475.947 271.111 461.026 276.58 0.772549 0.772549 0.772549 epoly
1 0 0 0 512.852 200.221 488.673 194.258 476.371 189.022 500.631 194.953 0.803922 0.803922 0.803922 epoly
1 0 0 0 506.687 343.1 518.943 305.838 497.579 329.253 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 673.062 366.074 655.995 370.277 650.623 400.661 668.046 396.741 0.317647 0.317647 0.317647 epoly
1 0 0 0 491.574 225.115 512.853 200.22 500.617 237.83 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 536.703 413.392 525.032 411.454 537.389 374.296 548.911 376.801 0.482353 0.482353 0.482353 epoly
1 0 0 0 530.704 309.366 518.942 305.842 531.279 268.334 542.893 272.434 0.486275 0.486275 0.486275 epoly
1 0 0 0 604.646 333.77 593.833 330.565 561.199 339.972 572.233 342.958 0.756863 0.756863 0.756863 epoly
1 0 0 0 572.233 342.958 561.2 339.972 593.834 330.565 604.647 333.77 0.756863 0.756863 0.756863 epoly
1 0 0 0 516.048 231.865 500.615 237.829 512.614 242.36 527.962 236.543 0.776471 0.776471 0.776471 epoly
1 0 0 0 703.493 324.356 668.501 333.817 697.014 343.092 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 650.044 267.008 678.031 274.684 668.359 270.566 640.175 262.869 0.803922 0.803922 0.803922 epoly
1 0 0 0 573.568 302.902 600.221 311.571 584.453 306.451 0.8 0.8 0.8 epoly
1 0 0 0 391.77 284.709 403.556 247.544 405.713 279.381 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 525.032 411.453 513 409.455 494.511 380.114 506.562 382.507 0.537255 0.537255 0.537255 epoly
1 0 0 0 479.579 262.117 488.462 275.191 475.947 271.111 467.065 257.883 0.537255 0.537255 0.537255 epoly
1 0 0 0 642.269 471.485 637.913 437.674 647.874 439.217 652.256 472.53 0.470588 0.470588 0.470588 epoly
1 0 0 0 568.498 405.908 579.624 407.949 563.63 411.655 552.401 409.695 0.752941 0.752941 0.752941 epoly
1 0 0 0 536.79 290.93 542.894 272.435 531.28 268.334 525.101 287.118 0.486275 0.486275 0.486275 epoly
1 0 0 0 546.329 304.367 562.35 299.243 573.57 302.902 557.65 307.904 0.764706 0.764706 0.764706 epoly
1 0 0 0 652.678 287.412 633.883 281.462 640.174 262.869 659.026 268.753 0.235294 0.235294 0.235294 epoly
1 0 0 0 604.646 333.77 578.333 324.734 567.374 321.467 593.833 330.565 0.658824 0.658824 0.658824 epoly
1 0 0 0 601.51 460.139 587.29 475.375 594.258 442.847 0.47451 0.47451 0.47451 epoly
1 0 0 0 403.555 247.546 391.77 284.711 411.693 260.588 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 536.702 413.39 555.956 443.205 552.402 409.696 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 530.704 309.364 549.827 336.896 546.329 304.367 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 433.444 277.976 435.895 310.307 449.008 313.792 446.475 281.913 0.482353 0.482353 0.482353 epoly
1 0 0 0 650.044 267.008 640.175 262.869 674.869 251.479 684.457 255.896 0.760784 0.760784 0.760784 epoly
1 0 0 0 383.783 261.951 362.442 254.53 377.833 280.793 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 479.578 262.117 488.249 233.158 467.065 257.883 0.705882 0.705882 0.705882 epoly
1 0 0 0 613.17 264.225 596.752 269.707 586.019 265.587 602.554 259.968 0.764706 0.764706 0.764706 epoly
1 0 0 0 600.221 311.571 593.833 330.565 578.333 324.734 584.453 306.451 0.176471 0.176471 0.176471 epoly
1 0 0 0 552.516 285.693 562.35 299.243 573.569 302.902 563.762 289.515 0.533333 0.533333 0.533333 epoly
1 0 0 0 537.389 374.297 525.509 371.715 494.512 380.114 506.563 382.508 0.756863 0.756863 0.756863 epoly
1 0 0 0 500.617 237.828 479.579 262.117 467.065 257.883 488.249 233.158 0.701961 0.701961 0.701961 epoly
1 0 0 0 519.304 264.104 531.279 268.332 500.601 279.149 488.46 275.191 0.772549 0.772549 0.772549 epoly
1 0 0 0 637.913 437.674 655.116 434.237 664.94 435.851 647.874 439.217 0.74902 0.74902 0.74902 epoly
1 0 0 0 671.627 293.411 684.458 255.895 660.719 280.067 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 568.499 405.908 536.703 413.392 558.598 391.196 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 552.516 285.693 530.704 309.366 562.35 299.243 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 512.853 200.22 516.048 231.865 527.962 236.543 524.706 205.33 0.47451 0.47451 0.47451 epoly
1 0 0 0 475.947 271.111 458.375 244.938 461.026 276.58 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 530.704 309.366 552.516 285.693 562.35 299.243 540.163 322.982 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 671.627 293.411 678.032 274.685 640.176 262.869 633.885 281.462 0.235294 0.235294 0.235294 epoly
1 0 0 0 463.691 183.626 440.479 178.004 457.601 202.621 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 704.642 397.21 699.764 364.456 722.654 393.267 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 677.706 398.931 687.076 401.055 704.643 397.21 695.425 395 0.74902 0.74902 0.74902 epoly
1 0 0 0 431.038 246.239 433.443 277.979 445.483 240.424 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 393.659 192.512 401.751 205.047 415.418 210.139 407.301 197.736 0.537255 0.537255 0.537255 epoly
1 0 0 0 445.482 240.426 432.19 235.77 415.417 210.138 428.675 215.077 0.537255 0.537255 0.537255 epoly
1 0 0 0 679.086 470.623 664.941 435.849 669.537 469.552 0.470588 0.470588 0.470588 epoly
1 0 0 0 537.389 374.297 512.569 364.311 500.59 361.637 525.509 371.715 0.662745 0.662745 0.662745 epoly
1 0 0 0 690.558 361.767 677.705 398.933 673.062 366.076 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 674.47 437.414 664.939 435.849 687.258 466.499 696.656 467.63 0.537255 0.537255 0.537255 epoly
1 0 0 0 561.2 339.971 549.828 336.893 537.39 374.297 548.912 376.801 0.486275 0.486275 0.486275 epoly
1 0 0 0 473.124 239.123 475.946 271.113 458.374 244.939 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 393.659 192.512 374.053 217.511 401.751 205.047 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 706.139 346.069 712.535 327.62 703.493 324.356 697.014 343.092 0.482353 0.482353 0.482353 epoly
1 0 0 0 431.038 246.239 433.443 277.979 417.693 241.732 0.482353 0.482353 0.482353 epoly
1 0 0 0 552.516 285.693 530.704 309.366 540.921 281.752 0.698039 0.698039 0.698039 epoly
1 0 0 0 383.783 261.951 377.833 280.793 391.771 284.71 397.654 266.158 0.498039 0.498039 0.498039 epoly
1 0 0 0 583.591 316.582 561.199 339.974 573.568 302.902 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 497.58 329.255 518.943 305.84 528.417 319.627 506.688 343.102 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 555.957 443.203 536.703 413.39 562.217 424.587 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 543.698 230.579 524.707 205.331 549.939 211.607 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 537.39 374.297 525.032 411.453 521.784 378.453 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 403.555 247.546 415.418 210.137 417.692 241.732 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 357.245 169.045 336.235 163.694 350.683 169.33 371.712 174.731 0.8 0.8 0.8 epoly
1 0 0 0 485.3 326.029 494.413 340.053 506.687 343.1 497.579 329.253 0.537255 0.537255 0.537255 epoly
1 0 0 0 491.574 225.115 500.617 237.83 488.249 233.16 479.203 220.302 0.533333 0.533333 0.533333 epoly
1 0 0 0 527.964 236.541 512.615 242.358 503.687 269.719 519.304 264.106 0.294118 0.294118 0.294118 epoly
1 0 0 0 389.753 243.044 403.556 247.544 391.77 284.709 377.832 280.793 0.498039 0.498039 0.498039 epoly
1 0 0 0 574.8 387.166 548.911 376.801 542.797 395.125 568.498 405.908 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 497.538 288.551 531.279 268.332 509.673 292.351 0.701961 0.701961 0.701961 epoly
1 0 0 0 536.703 413.392 558.598 391.196 547.098 388.886 525.032 411.454 0.698039 0.698039 0.698039 epoly
1 0 0 0 525.032 411.454 547.098 388.886 558.598 391.196 536.703 413.392 0.698039 0.698039 0.698039 epoly
1 0 0 0 530.704 309.366 552.516 285.693 540.921 281.752 518.942 305.842 0.701961 0.701961 0.701961 epoly
1 0 0 0 353.901 169.19 336.235 163.694 330.421 182.513 348.035 188.077 0.227451 0.227451 0.227451 epoly
1 0 0 0 485.3 326.029 464.386 349.185 494.413 340.053 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 488.249 233.16 458.374 244.941 479.203 220.302 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 518.943 305.84 497.58 329.255 506.817 302.207 0.701961 0.701961 0.701961 epoly
1 0 0 0 470.352 207.722 500.631 194.953 476.371 189.022 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 572.25 439.81 555.955 443.205 563.63 411.655 579.624 407.949 0.278431 0.278431 0.278431 epoly
1 0 0 0 562.217 424.587 536.703 413.39 568.498 405.908 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 479.202 220.3 458.374 244.939 467.065 257.883 488.249 233.158 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 463.691 183.626 457.601 202.621 470.352 207.722 476.371 189.022 0.498039 0.498039 0.498039 epoly
1 0 0 0 699.764 364.456 704.642 397.21 695.424 394.999 690.557 361.765 0.466667 0.466667 0.466667 epoly
1 0 0 0 637.913 437.674 627.644 436.084 610.74 439.507 621.136 441.026 0.74902 0.74902 0.74902 epoly
1 0 0 0 357.245 169.045 371.712 174.731 356.451 150.741 342.067 144.813 0.537255 0.537255 0.537255 epoly
1 0 0 0 659.026 268.753 678.032 274.685 671.627 293.411 652.678 287.412 0.235294 0.235294 0.235294 epoly
1 0 0 0 403.556 247.546 389.752 243.046 383.783 261.951 397.654 266.158 0.498039 0.498039 0.498039 epoly
1 0 0 0 503.687 269.719 500.617 237.828 488.46 275.191 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 336.36 225.666 354.012 231.412 359.893 212.581 342.188 206.903 0.227451 0.227451 0.227451 epoly
1 0 0 0 564.951 248.159 574.955 261.34 586.02 265.587 576.047 252.559 0.533333 0.533333 0.533333 epoly
1 0 0 0 617.282 296.313 606.63 292.515 586.019 265.587 596.752 269.707 0.533333 0.533333 0.533333 epoly
1 0 0 0 549.828 336.895 538.101 333.721 506.687 343.1 518.595 346.055 0.760784 0.760784 0.760784 epoly
1 0 0 0 512.853 200.22 491.574 225.115 479.203 220.302 500.632 194.952 0.701961 0.701961 0.701961 epoly
1 0 0 0 677.706 398.931 668.046 396.741 650.623 400.661 660.426 402.765 0.74902 0.74902 0.74902 epoly
1 0 0 0 637.913 437.674 633.636 404.482 627.644 436.084 0.470588 0.470588 0.470588 epoly
1 0 0 0 634.978 453.837 647.876 439.219 627.644 436.085 0.470588 0.470588 0.470588 epoly
1 0 0 0 602.932 251.245 619.512 254.204 592.275 246.837 0.8 0.8 0.8 epoly
1 0 0 0 564.951 248.159 542.893 272.436 574.955 261.34 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 473.124 239.123 458.374 244.939 445.482 240.424 460.296 234.46 0.780392 0.780392 0.780392 epoly
1 0 0 0 561.199 339.972 593.833 330.565 567.374 321.467 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 561.328 216.586 587.645 223.182 555.164 235.263 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 561.328 216.586 555.164 235.263 543.698 230.579 549.939 211.607 0.490196 0.490196 0.490196 epoly
1 0 0 0 488.242 358.882 464.388 349.183 482.091 377.647 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 433.443 277.979 431.038 246.239 445.483 240.424 448.054 272.512 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 677.706 398.931 673.062 366.074 668.046 396.741 0.470588 0.470588 0.470588 epoly
1 0 0 0 330.422 182.513 336.235 163.694 371.712 174.731 365.792 193.687 0.227451 0.227451 0.227451 epoly
1 0 0 0 330.421 182.513 342.068 144.811 343.664 175.864 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 640.045 324.548 638.731 324.107 621.363 318.466 0.8 0.8 0.8 epoly
1 0 0 0 411.693 260.588 420.011 273.918 433.444 277.977 425.107 264.804 0.537255 0.537255 0.537255 epoly
1 0 0 0 558.598 391.196 548.911 376.801 537.389 374.296 547.098 388.886 0.537255 0.537255 0.537255 epoly
1 0 0 0 552.516 285.693 542.893 272.434 531.279 268.334 540.921 281.752 0.533333 0.533333 0.533333 epoly
1 0 0 0 673.062 366.074 677.706 398.931 695.425 395 690.558 361.765 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 549.828 336.895 524.64 327.739 512.805 324.501 538.101 333.721 0.658824 0.658824 0.658824 epoly
1 0 0 0 538.102 333.721 512.805 324.501 524.64 327.739 549.828 336.895 0.658824 0.658824 0.658824 epoly
1 0 0 0 537.39 374.297 549.828 336.893 527.89 360.023 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 445.482 240.426 466.448 215.34 479.203 220.302 458.374 244.941 0.709804 0.709804 0.709804 epoly
1 0 0 0 561.199 339.974 549.827 336.897 562.349 299.243 573.568 302.902 0.486275 0.486275 0.486275 epoly
1 0 0 0 549.827 336.896 561.199 339.974 573.57 302.902 562.35 299.243 0.486275 0.486275 0.486275 epoly
1 0 0 0 411.693 260.588 391.77 284.711 420.011 273.918 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 630.002 258.603 619.512 254.204 586.019 265.587 596.752 269.707 0.764706 0.764706 0.764706 epoly
1 0 0 0 348.035 188.077 365.793 193.688 359.893 212.581 342.188 206.903 0.227451 0.227451 0.227451 epoly
1 0 0 0 540.922 281.75 518.943 305.84 509.673 292.351 531.279 268.332 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 658.587 454.219 687.257 466.498 652.256 472.528 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 658.587 454.219 652.256 472.528 642.27 471.483 648.681 452.891 0.478431 0.478431 0.478431 epoly
1 0 0 0 568.498 405.908 548.911 376.801 574.8 387.167 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 433.443 277.979 431.038 246.239 417.693 241.732 420.01 273.919 0.482353 0.482353 0.482353 epoly
1 0 0 0 435.895 310.307 433.444 277.976 421.483 315.283 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 598.552 228.026 625.986 234.952 609.132 232.723 0.803922 0.803922 0.803922 epoly
1 0 0 0 525.032 411.452 536.703 413.39 555.957 443.203 544.326 441.686 0.537255 0.537255 0.537255 epoly
1 0 0 0 518.943 305.84 506.817 302.207 497.538 288.551 509.673 292.351 0.537255 0.537255 0.537255 epoly
1 0 0 0 538.102 333.721 549.828 336.895 530.705 309.364 518.943 305.84 0.537255 0.537255 0.537255 epoly
1 0 0 0 512.853 200.222 524.707 205.331 543.698 230.579 531.876 225.748 0.533333 0.533333 0.533333 epoly
1 0 0 0 668.045 396.742 663.42 363.402 673.062 366.076 677.705 398.933 0.470588 0.470588 0.470588 epoly
1 0 0 0 401.751 205.045 415.418 210.137 403.555 247.546 389.751 243.046 0.498039 0.498039 0.498039 epoly
1 0 0 0 475.946 271.111 463.04 266.903 433.443 277.977 446.474 281.915 0.772549 0.772549 0.772549 epoly
1 0 0 0 630.002 258.603 602.932 251.245 592.275 246.837 619.512 254.204 0.803922 0.803922 0.803922 epoly
1 0 0 0 583.422 441.35 587.292 475.379 567.235 444.674 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 642.269 471.485 652.256 472.53 664.94 435.851 655.116 434.237 0.478431 0.478431 0.478431 epoly
1 0 0 0 571.199 229.299 574.954 261.342 555.162 235.263 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 627.613 299.994 645.26 304.909 646.351 306.01 0.8 0.8 0.8 epoly
1 0 0 0 391.813 275.333 377.832 280.793 391.77 284.709 405.713 279.381 0.780392 0.780392 0.780392 epoly
1 0 0 0 494.512 380.114 525.509 371.715 500.59 361.637 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 488.242 358.882 482.091 377.647 494.512 380.114 500.59 361.637 0.486275 0.486275 0.486275 epoly
1 0 0 0 536.703 413.39 562.217 424.587 550.664 422.776 525.032 411.452 0.662745 0.662745 0.662745 epoly
1 0 0 0 525.032 411.452 550.664 422.776 562.217 424.587 536.703 413.39 0.662745 0.662745 0.662745 epoly
1 0 0 0 512.853 200.222 538.194 206.472 549.939 211.607 524.707 205.331 0.803922 0.803922 0.803922 epoly
1 0 0 0 407.781 185.952 385.743 180.247 401.751 205.047 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 664.939 435.851 687.257 466.498 658.587 454.219 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 625.986 234.952 619.512 254.204 602.932 251.245 609.132 232.723 0.176471 0.176471 0.176471 epoly
1 0 0 0 525.032 411.453 521.784 378.453 509.815 375.967 513 409.455 0.478431 0.478431 0.478431 epoly
1 0 0 0 513 409.455 509.815 375.967 521.784 378.453 525.032 411.453 0.478431 0.478431 0.478431 epoly
1 0 0 0 431.038 246.239 417.693 241.732 432.192 235.769 445.483 240.424 0.780392 0.780392 0.780392 epoly
1 0 0 0 391.812 275.332 403.555 247.544 405.712 279.381 0.486275 0.486275 0.486275 epoly
1 0 0 0 475.946 271.111 452.414 263.457 439.453 259.231 463.04 266.903 0.8 0.8 0.8 epoly
1 0 0 0 463.04 266.903 439.453 259.231 452.414 263.457 475.946 271.111 0.8 0.8 0.8 epoly
1 0 0 0 516.048 231.865 512.853 200.22 500.615 237.829 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 348.035 188.077 365.793 193.688 371.713 174.732 353.901 169.19 0.227451 0.227451 0.227451 epoly
1 0 0 0 403.555 247.546 420.01 273.919 417.693 241.732 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 500.617 237.828 488.249 233.158 475.947 271.111 488.462 275.191 0.490196 0.490196 0.490196 epoly
1 0 0 0 536.703 413.39 525.032 411.452 557.024 403.802 568.498 405.908 0.752941 0.752941 0.752941 epoly
1 0 0 0 525.032 411.454 536.703 413.392 568.499 405.908 557.026 403.803 0.752941 0.752941 0.752941 epoly
1 0 0 0 519.304 264.104 497.538 288.551 509.673 292.351 531.279 268.332 0.701961 0.701961 0.701961 epoly
1 0 0 0 648.681 452.891 655.115 434.237 664.939 435.851 658.587 454.219 0.478431 0.478431 0.478431 epoly
1 0 0 0 530.704 309.366 540.163 322.982 550.779 295.47 540.921 281.752 0.286275 0.286275 0.286275 epoly
1 0 0 0 679.084 470.623 696.656 467.63 687.258 466.499 669.535 469.551 0.745098 0.745098 0.745098 epoly
1 0 0 0 417.693 241.73 420.01 273.918 405.712 279.381 403.555 247.544 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 663.42 363.402 681.065 358.993 690.558 361.767 673.062 366.076 0.752941 0.752941 0.752941 epoly
1 0 0 0 593.835 330.566 561.199 339.974 583.591 316.582 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 432.191 235.768 442.958 208.925 445.482 240.424 0.482353 0.482353 0.482353 epoly
1 0 0 0 585.849 389.496 612.839 400.252 579.624 407.949 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 464.388 349.183 456.871 349.616 463.059 330.557 470.377 330.776 0.466667 0.466667 0.466667 epoly
1 0 0 0 585.849 389.496 579.624 407.949 568.498 405.908 574.8 387.167 0.482353 0.482353 0.482353 epoly
1 0 0 0 457.602 202.62 460.296 234.46 445.482 240.424 442.958 208.925 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 652.678 287.412 651.81 285.646 633.883 281.462 0.8 0.8 0.8 epoly
1 0 0 0 587.29 475.375 601.51 460.139 618.036 457.028 604.099 472.372 0.588235 0.588235 0.588235 epoly
1 0 0 0 415.418 210.139 417.692 241.733 401.751 205.047 0.482353 0.482353 0.482353 epoly
1 0 0 0 463.04 266.903 475.946 271.111 458.374 244.939 445.482 240.424 0.537255 0.537255 0.537255 epoly
1 0 0 0 475.946 271.113 463.041 266.905 445.482 240.424 458.374 244.939 0.537255 0.537255 0.537255 epoly
1 0 0 0 704.643 397.21 690.558 361.765 695.425 395 0.466667 0.466667 0.466667 epoly
1 0 0 0 327.24 138.7 342.068 144.811 330.421 182.513 315.463 177.003 0.509804 0.509804 0.509804 epoly
1 0 0 0 509.815 375.967 525.51 371.715 537.39 374.297 521.784 378.453 0.756863 0.756863 0.756863 epoly
1 0 0 0 531.28 268.334 519.304 264.106 503.687 269.719 515.749 273.809 0.768627 0.768627 0.768627 epoly
1 0 0 0 497.58 329.255 506.688 343.102 516.304 316.169 506.817 302.207 0.286275 0.286275 0.286275 epoly
1 0 0 0 699.764 364.456 690.557 361.765 713.599 390.966 722.654 393.267 0.533333 0.533333 0.533333 epoly
1 0 0 0 494.511 380.114 513 409.455 509.815 375.967 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 389.753 243.044 391.813 275.333 405.713 279.381 403.556 247.544 0.486275 0.486275 0.486275 epoly
1 0 0 0 351.258 188.304 330.422 182.513 365.792 193.687 0.8 0.8 0.8 epoly
1 0 0 0 336.235 163.694 357.245 169.045 342.067 144.813 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 407.781 185.952 401.751 205.047 415.418 210.139 421.378 191.342 0.501961 0.501961 0.501961 epoly
1 0 0 0 608.917 240.971 586.019 265.589 598.552 228.026 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 583.422 441.35 567.235 444.674 555.956 443.203 572.25 439.808 0.74902 0.74902 0.74902 epoly
1 0 0 0 497.538 288.551 519.304 264.104 488.46 275.191 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 571.199 229.299 555.162 235.263 543.697 230.578 559.836 224.462 0.772549 0.772549 0.772549 epoly
1 0 0 0 531.28 268.334 527.964 236.541 519.304 264.106 0.47451 0.47451 0.47451 epoly
1 0 0 0 742.382 336.841 712.536 327.621 749.002 317.907 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 646.486 244.215 674.869 251.479 668.359 270.566 640.175 262.869 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 445.482 240.426 442.958 208.927 429.752 203.831 432.19 235.77 0.482353 0.482353 0.482353 epoly
1 0 0 0 546.329 304.367 549.827 336.896 562.35 299.243 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 437.641 222.183 442.96 208.926 457.604 202.62 452.4 215.968 0.266667 0.266667 0.266667 epoly
1 0 0 0 537.389 374.297 548.911 376.801 568.498 405.908 557.024 403.802 0.537255 0.537255 0.537255 epoly
1 0 0 0 464.388 349.183 470.377 330.776 481.753 336.912 475.507 356.04 0.172549 0.172549 0.172549 epoly
1 0 0 0 445.482 240.426 458.374 244.941 488.249 233.16 475.492 228.343 0.780392 0.780392 0.780392 epoly
1 0 0 0 600.221 311.571 573.568 302.902 567.374 321.467 593.833 330.565 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 549.827 336.897 572.402 313.096 583.591 316.582 561.199 339.974 0.698039 0.698039 0.698039 epoly
1 0 0 0 561.199 339.974 583.591 316.582 572.402 313.096 549.827 336.897 0.698039 0.698039 0.698039 epoly
1 0 0 0 640.174 262.869 658.383 266.317 659.026 268.753 0.803922 0.803922 0.803922 epoly
1 0 0 0 403.932 237.084 389.751 243.046 403.555 247.546 417.692 241.732 0.784314 0.784314 0.784314 epoly
1 0 0 0 506.687 343.1 538.101 333.721 512.805 324.501 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 587.29 475.375 604.099 472.372 610.742 439.509 594.258 442.847 0.278431 0.278431 0.278431 epoly
1 0 0 0 500.589 361.637 525.508 371.714 519.244 390.615 494.512 380.114 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 593.834 330.565 561.2 339.972 587.468 349.496 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 537.389 374.297 563.406 384.764 574.8 387.167 548.911 376.801 0.662745 0.662745 0.662745 epoly
1 0 0 0 437.641 222.183 416.133 198.578 442.96 208.926 0.482353 0.482353 0.482353 epoly
1 0 0 0 687.258 466.499 664.939 435.849 669.535 469.551 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 638.731 324.107 645.26 304.909 627.613 299.994 621.363 318.466 0.176471 0.176471 0.176471 epoly
1 0 0 0 371.712 174.731 336.235 163.694 357.245 169.045 0.8 0.8 0.8 epoly
1 0 0 0 637.913 437.674 642.269 471.485 655.116 434.237 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 427.358 172.484 413.83 166.794 407.781 185.952 421.378 191.342 0.501961 0.501961 0.501961 epoly
1 0 0 0 475.947 271.111 488.249 233.158 467.065 257.883 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 415.417 210.138 432.19 235.77 429.752 203.831 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 512.853 200.22 500.632 194.952 488.249 233.16 500.617 237.83 0.494118 0.494118 0.494118 epoly
1 0 0 0 417.692 241.733 415.418 210.139 429.753 203.831 432.191 235.77 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 537.389 374.296 525.032 411.454 547.098 388.886 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 531.279 268.334 518.942 305.842 540.921 281.752 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 330.422 182.513 351.258 188.304 357.245 169.045 336.235 163.694 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 634.978 453.837 627.644 436.085 610.74 439.508 618.033 457.027 0.376471 0.376471 0.376471 epoly
1 0 0 0 568.498 405.908 572.25 439.81 579.624 407.949 0.47451 0.47451 0.47451 epoly
1 0 0 0 637.913 437.674 642.269 471.485 627.644 436.084 0.470588 0.470588 0.470588 epoly
1 0 0 0 586.019 265.587 619.512 254.204 592.275 246.837 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 512.805 324.501 538.102 333.721 518.943 305.84 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 488.462 275.191 482.414 293.78 456.846 286.085 463.04 266.903 0.490196 0.490196 0.490196 epoly
1 0 0 0 671.627 293.411 651.81 285.646 652.678 287.412 0.8 0.8 0.8 epoly
1 0 0 0 674.869 251.479 640.175 262.869 668.359 270.566 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 513 409.453 494.512 380.114 519.244 390.615 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 488.249 233.16 475.946 271.113 473.124 239.123 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 617.282 296.313 613.17 264.225 602.554 259.968 606.63 292.515 0.470588 0.470588 0.470588 epoly
1 0 0 0 583.591 316.582 573.568 302.902 562.349 299.243 572.402 313.096 0.533333 0.533333 0.533333 epoly
1 0 0 0 456.871 349.616 464.388 349.183 475.507 356.04 0.666667 0.666667 0.666667 epoly
1 0 0 0 613.169 264.224 606.628 292.515 602.552 259.968 0.470588 0.470588 0.470588 epoly
1 0 0 0 401.751 205.045 403.932 237.084 417.692 241.732 415.418 210.137 0.482353 0.482353 0.482353 epoly
1 0 0 0 586.019 265.589 574.954 261.342 587.644 223.182 598.552 228.026 0.486275 0.486275 0.486275 epoly
1 0 0 0 343.664 175.864 342.068 144.811 357.246 169.045 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 328.72 170.18 315.463 177.003 330.421 182.513 343.664 175.864 0.807843 0.807843 0.807843 epoly
1 0 0 0 433.443 277.977 463.04 266.903 439.453 259.231 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 684.121 380.38 713.598 390.966 677.706 398.931 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 610.742 439.509 604.099 472.372 618.036 457.028 0.47451 0.47451 0.47451 epoly
1 0 0 0 684.121 380.38 677.706 398.931 668.046 396.741 674.544 377.898 0.482353 0.482353 0.482353 epoly
1 0 0 0 712.536 327.621 742.382 336.841 733.59 333.643 703.493 324.356 0.8 0.8 0.8 epoly
1 0 0 0 593.834 330.565 573.569 302.902 600.221 311.571 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 572.25 439.81 568.498 405.908 552.401 409.695 555.955 443.205 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 587.292 475.379 576.074 474.357 555.956 443.203 567.235 444.674 0.537255 0.537255 0.537255 epoly
1 0 0 0 574.954 261.342 563.542 256.961 543.697 230.578 555.162 235.263 0.533333 0.533333 0.533333 epoly
1 0 0 0 638.731 324.107 640.045 324.548 646.351 306.01 645.26 304.909 0.466667 0.466667 0.466667 epoly
1 0 0 0 433.443 277.979 448.054 272.512 432.192 235.769 417.693 241.732 0.333333 0.333333 0.333333 epoly
1 0 0 0 488.462 275.191 481.75 272.993 475.499 292.246 482.414 293.78 0.466667 0.466667 0.466667 epoly
1 0 0 0 598.36 352.407 604.647 333.77 593.834 330.565 587.468 349.496 0.482353 0.482353 0.482353 epoly
1 0 0 0 659.026 268.753 658.383 266.317 678.032 274.685 0.803922 0.803922 0.803922 epoly
1 0 0 0 619.512 254.204 630.003 258.603 613.169 264.224 602.552 259.968 0.764706 0.764706 0.764706 epoly
1 0 0 0 359.893 212.581 330.228 202.258 342.188 206.903 0.8 0.8 0.8 epoly
1 0 0 0 351.258 188.304 330.422 182.513 357.245 169.045 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 668.045 396.742 677.705 398.933 690.558 361.767 681.065 358.993 0.482353 0.482353 0.482353 epoly
1 0 0 0 586.019 265.587 606.63 292.515 602.554 259.968 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 538.102 333.721 506.687 343.101 528.416 319.627 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 435.895 310.307 433.444 277.976 450.676 305.204 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 550.779 295.47 540.163 322.982 562.35 299.243 0.698039 0.698039 0.698039 epoly
1 0 0 0 712.536 327.621 703.493 324.356 740.299 314.405 749.002 317.907 0.752941 0.752941 0.752941 epoly
1 0 0 0 415.418 210.139 401.751 205.047 416.134 198.576 429.753 203.831 0.788235 0.788235 0.788235 epoly
1 0 0 0 439.453 259.231 463.04 266.903 445.482 240.424 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 481.753 336.912 470.377 330.776 463.059 330.557 0.662745 0.662745 0.662745 epoly
1 0 0 0 690.557 361.767 713.598 390.966 684.121 380.38 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 651.81 285.646 658.383 266.317 640.174 262.869 633.883 281.462 0.176471 0.176471 0.176471 epoly
1 0 0 0 417.693 241.73 403.555 247.544 391.812 275.332 406.155 269.731 0.262745 0.262745 0.262745 epoly
1 0 0 0 681.063 358.993 658.879 330.679 687.605 340.023 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 642.269 471.485 637.913 437.674 655.116 434.237 659.691 468.449 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 537.389 374.297 543.598 355.627 581.124 368.363 574.8 387.167 0.231373 0.231373 0.231373 epoly
1 0 0 0 537.389 374.296 549.829 336.893 553.393 370.034 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 488.249 233.16 500.632 194.952 479.203 220.302 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 518.943 305.84 540.922 281.75 506.817 302.207 0.701961 0.701961 0.701961 epoly
1 0 0 0 513 409.455 525.032 411.453 537.39 374.297 525.51 371.715 0.482353 0.482353 0.482353 epoly
1 0 0 0 342.068 144.811 343.664 175.864 328.72 170.18 327.24 138.7 0.486275 0.486275 0.486275 epoly
1 0 0 0 327.24 138.7 328.72 170.18 343.664 175.864 342.068 144.811 0.486275 0.486275 0.486275 epoly
1 0 0 0 549.827 336.897 561.199 339.974 593.835 330.566 582.682 327.26 0.760784 0.760784 0.760784 epoly
1 0 0 0 674.544 377.898 681.063 358.993 690.557 361.767 684.121 380.38 0.482353 0.482353 0.482353 epoly
1 0 0 0 587.645 223.182 576.394 218.186 543.698 230.579 555.164 235.263 0.768627 0.768627 0.768627 epoly
1 0 0 0 704.642 397.21 722.654 393.267 713.599 390.966 695.424 394.999 0.74902 0.74902 0.74902 epoly
1 0 0 0 678.031 274.684 684.457 255.896 674.869 251.479 668.359 270.566 0.482353 0.482353 0.482353 epoly
1 0 0 0 516.304 316.169 506.688 343.102 528.417 319.627 0.701961 0.701961 0.701961 epoly
1 0 0 0 351.258 188.304 365.792 193.687 359.892 212.581 345.29 207.5 0.505882 0.505882 0.505882 epoly
1 0 0 0 457.602 202.62 442.958 208.925 432.191 235.768 447.065 229.651 0.27451 0.27451 0.27451 epoly
1 0 0 0 687.258 466.499 682.438 432.398 696.656 467.63 0.470588 0.470588 0.470588 epoly
1 0 0 0 619.513 254.205 586.019 265.589 608.917 240.971 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 433.443 277.977 463.042 266.901 441.965 291.44 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 610.954 315.072 638.733 324.108 604.647 333.77 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 610.954 315.072 604.647 333.77 593.834 330.565 600.221 311.571 0.482353 0.482353 0.482353 epoly
1 0 0 0 687.605 340.023 658.879 330.679 694.169 320.99 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 697.015 343.093 703.493 324.356 742.382 336.842 735.784 355.713 0.235294 0.235294 0.235294 epoly
1 0 0 0 456.846 286.085 482.414 293.78 475.499 292.246 0.662745 0.662745 0.662745 epoly
1 0 0 0 540.922 281.75 531.279 268.332 497.538 288.551 506.817 302.207 0.227451 0.227451 0.227451 epoly
1 0 0 0 658.383 266.318 640.175 262.869 668.359 270.566 0.803922 0.803922 0.803922 epoly
1 0 0 0 348.035 188.077 336.264 182.751 365.793 193.688 0.8 0.8 0.8 epoly
1 0 0 0 391.813 275.333 389.753 243.044 377.832 280.793 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 482.091 377.647 494.512 380.114 513 409.453 500.591 407.392 0.537255 0.537255 0.537255 epoly
1 0 0 0 432.192 235.769 448.054 272.512 445.483 240.424 0.482353 0.482353 0.482353 epoly
1 0 0 0 494.412 340.055 516.302 316.169 528.416 319.627 506.687 343.101 0.701961 0.701961 0.701961 epoly
1 0 0 0 587.645 223.182 561.328 216.586 549.939 211.607 576.394 218.186 0.803922 0.803922 0.803922 epoly
1 0 0 0 433.444 277.976 435.895 310.307 422.372 306.714 420.011 273.916 0.482353 0.482353 0.482353 epoly
1 0 0 0 687.257 466.498 677.563 465.331 642.27 471.483 652.256 472.528 0.745098 0.745098 0.745098 epoly
1 0 0 0 646.486 244.215 640.175 262.869 658.383 266.318 664.979 246.923 0.176471 0.176471 0.176471 epoly
1 0 0 0 482.091 377.647 506.911 388.254 519.244 390.615 494.512 380.114 0.662745 0.662745 0.662745 epoly
1 0 0 0 506.911 388.254 494.512 380.114 519.244 390.615 0.662745 0.662745 0.662745 epoly
1 0 0 0 475.946 271.113 473.124 239.123 460.296 234.46 463.041 266.905 0.478431 0.478431 0.478431 epoly
1 0 0 0 463.041 266.905 460.296 234.46 473.124 239.123 475.946 271.113 0.482353 0.482353 0.482353 epoly
1 0 0 0 606.63 292.513 586.019 265.587 613.06 273.391 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 428.514 287.546 420.01 273.918 433.443 277.977 441.965 291.44 0.537255 0.537255 0.537255 epoly
1 0 0 0 351.258 188.304 365.792 193.687 371.712 174.731 357.245 169.045 0.505882 0.505882 0.505882 epoly
1 0 0 0 587.645 223.182 574.954 261.342 571.199 229.299 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 547.098 388.886 557.026 403.803 568.499 405.908 558.598 391.196 0.537255 0.537255 0.537255 epoly
1 0 0 0 552.516 285.693 540.921 281.752 550.779 295.47 562.35 299.243 0.533333 0.533333 0.533333 epoly
1 0 0 0 562.349 299.243 573.569 302.902 593.834 330.565 582.681 327.26 0.533333 0.533333 0.533333 epoly
1 0 0 0 658.383 266.317 659.026 268.753 652.678 287.412 651.81 285.646 0.466667 0.466667 0.466667 epoly
1 0 0 0 651.81 285.646 652.678 287.412 659.026 268.753 658.383 266.317 0.466667 0.466667 0.466667 epoly
1 0 0 0 500.589 361.637 494.512 380.114 506.911 388.254 513.253 369.051 0.172549 0.172549 0.172549 epoly
1 0 0 0 637.913 437.674 627.644 436.084 644.984 432.573 655.116 434.237 0.74902 0.74902 0.74902 epoly
1 0 0 0 687.257 466.498 658.587 454.219 648.681 452.891 677.563 465.331 0.658824 0.658824 0.658824 epoly
1 0 0 0 677.563 465.331 648.681 452.891 658.587 454.219 687.257 466.498 0.658824 0.658824 0.658824 epoly
1 0 0 0 625.986 234.952 598.552 228.026 592.275 246.837 619.512 254.204 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 481.75 272.993 488.462 275.191 463.04 266.903 0.8 0.8 0.8 epoly
1 0 0 0 586.019 265.589 608.917 240.971 598.049 236.276 574.954 261.342 0.698039 0.698039 0.698039 epoly
1 0 0 0 574.954 261.342 598.049 236.276 608.917 240.971 586.019 265.589 0.698039 0.698039 0.698039 epoly
1 0 0 0 674.869 251.479 646.486 244.215 664.979 246.923 0.803922 0.803922 0.803922 epoly
1 0 0 0 682.438 432.398 700.385 428.858 714.675 464.562 696.656 467.63 0.380392 0.380392 0.380392 epoly
1 0 0 0 547.098 388.886 525.032 411.454 557.026 403.803 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 330.422 182.513 351.258 188.304 336.265 182.752 315.463 177.003 0.8 0.8 0.8 epoly
1 0 0 0 623.803 287.119 606.628 292.515 613.169 264.224 630.003 258.603 0.321569 0.321569 0.321569 epoly
1 0 0 0 416.133 198.578 430.891 191.938 457.604 202.62 442.96 208.926 0.792157 0.792157 0.792157 epoly
1 0 0 0 613.06 273.391 586.019 265.587 619.512 254.204 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 562.349 299.243 589.149 307.961 600.221 311.571 573.569 302.902 0.8 0.8 0.8 epoly
1 0 0 0 701.58 501.853 696.656 467.628 719.833 499.195 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 713.599 390.966 690.557 361.765 695.424 394.999 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 644.981 432.572 650.624 400.659 655.113 434.236 0.470588 0.470588 0.470588 epoly
1 0 0 0 703.493 324.356 726.903 352.816 697.014 343.092 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 518.943 305.84 506.817 302.207 516.304 316.169 528.417 319.627 0.537255 0.537255 0.537255 epoly
1 0 0 0 330.422 182.513 315.463 177.003 342.322 163.178 357.245 169.045 0.803922 0.803922 0.803922 epoly
1 0 0 0 555.956 443.203 568.498 405.906 572.25 439.808 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 668.046 396.739 672.759 430.711 655.113 434.236 650.624 400.659 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 663.42 363.402 668.045 396.742 681.065 358.993 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 460.296 234.46 475.492 228.343 488.249 233.16 473.124 239.123 0.780392 0.780392 0.780392 epoly
1 0 0 0 525.508 371.714 500.589 361.637 513.253 369.051 0.662745 0.662745 0.662745 epoly
1 0 0 0 677.563 465.331 687.257 466.498 664.939 435.851 655.115 434.237 0.537255 0.537255 0.537255 epoly
1 0 0 0 648.961 327.444 658.879 330.679 681.063 358.993 671.271 356.131 0.533333 0.533333 0.533333 epoly
1 0 0 0 538.102 333.719 549.829 336.893 537.389 374.296 525.508 371.714 0.486275 0.486275 0.486275 epoly
1 0 0 0 445.482 240.424 463.041 266.905 460.296 234.46 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 612.839 400.252 601.948 398.036 568.498 405.908 579.624 407.949 0.752941 0.752941 0.752941 epoly
1 0 0 0 687.605 340.023 694.169 320.99 703.493 324.356 697.014 343.092 0.482353 0.482353 0.482353 epoly
1 0 0 0 562.349 299.243 549.827 336.897 572.402 313.096 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 363.253 149.72 377.652 155.712 371.712 174.731 357.245 169.045 0.505882 0.505882 0.505882 epoly
1 0 0 0 563.406 384.764 537.389 374.297 574.8 387.167 0.658824 0.658824 0.658824 epoly
1 0 0 0 550.664 422.776 525.032 411.452 544.326 441.686 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 336.264 182.751 348.035 188.077 342.188 206.903 330.228 202.258 0.466667 0.466667 0.466667 epoly
1 0 0 0 648.961 327.444 677.899 336.857 687.605 340.023 658.879 330.679 0.8 0.8 0.8 epoly
1 0 0 0 658.879 330.679 687.605 340.023 677.899 336.857 648.961 327.444 0.8 0.8 0.8 epoly
1 0 0 0 538.194 206.472 512.853 200.222 531.876 225.748 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 509.815 375.967 513 409.455 525.51 371.715 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 403.932 237.084 401.751 205.045 389.751 243.046 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 466.448 215.34 475.492 228.343 488.249 233.16 479.203 220.302 0.533333 0.533333 0.533333 epoly
1 0 0 0 342.189 206.903 359.894 212.581 342.446 227.634 324.214 221.699 0.627451 0.627451 0.627451 epoly
1 0 0 0 537.389 374.297 563.406 384.764 557.024 403.802 531.201 392.905 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 608.917 240.971 598.552 228.026 587.644 223.182 598.049 236.276 0.533333 0.533333 0.533333 epoly
1 0 0 0 612.839 400.252 585.849 389.496 574.8 387.167 601.948 398.036 0.658824 0.658824 0.658824 epoly
1 0 0 0 466.448 215.34 445.482 240.426 475.492 228.343 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 726.903 352.816 697.015 343.093 735.784 355.713 0.8 0.8 0.8 epoly
1 0 0 0 658.879 330.679 648.961 327.444 684.55 317.518 694.169 320.99 0.752941 0.752941 0.752941 epoly
1 0 0 0 658.383 266.317 651.81 285.646 671.627 293.411 678.032 274.685 0.482353 0.482353 0.482353 epoly
1 0 0 0 557.024 403.802 525.032 411.452 550.664 422.776 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 696.656 467.628 701.58 501.853 692.169 501.246 687.258 466.497 0.470588 0.470588 0.470588 epoly
1 0 0 0 417.692 241.733 432.191 235.77 416.134 198.576 401.751 205.047 0.333333 0.333333 0.333333 epoly
1 0 0 0 342.189 206.903 330.229 202.258 348.519 208.121 359.894 212.581 0.8 0.8 0.8 epoly
1 0 0 0 531.279 268.334 563.543 256.958 540.921 281.752 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 342.068 144.811 327.24 138.7 342.323 163.179 357.246 169.045 0.537255 0.537255 0.537255 epoly
1 0 0 0 619.512 254.204 598.552 228.026 625.986 234.953 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 420.01 273.918 406.155 269.731 391.812 275.332 405.712 279.381 0.776471 0.776471 0.776471 epoly
1 0 0 0 432.189 235.769 416.132 198.577 437.64 222.182 0.482353 0.482353 0.482353 epoly
1 0 0 0 574.954 261.34 586.019 265.587 606.63 292.513 595.64 288.596 0.533333 0.533333 0.533333 epoly
1 0 0 0 581.124 368.363 543.598 355.627 569.809 365.661 0.658824 0.658824 0.658824 epoly
1 0 0 0 494.412 340.055 506.687 343.101 538.102 333.721 526.004 330.447 0.764706 0.764706 0.764706 epoly
1 0 0 0 634.326 291.047 638.732 324.109 617.281 296.311 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 460.296 234.46 457.602 202.62 475.492 228.343 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 460.296 234.46 447.065 229.651 432.191 235.768 445.482 240.424 0.780392 0.780392 0.780392 epoly
1 0 0 0 420.01 273.918 417.693 241.73 406.155 269.731 0.486275 0.486275 0.486275 epoly
1 0 0 0 550.664 422.776 544.326 441.686 555.957 443.203 562.217 424.587 0.482353 0.482353 0.482353 epoly
1 0 0 0 543.698 230.579 576.394 218.186 549.939 211.607 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 537.389 374.297 563.406 384.764 569.809 365.661 543.598 355.627 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 632.226 343.24 604.646 333.77 638.732 324.107 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 747.797 370.229 722.653 393.269 735.783 355.713 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 538.194 206.472 531.876 225.748 543.698 230.579 549.939 211.607 0.490196 0.490196 0.490196 epoly
1 0 0 0 586.019 265.587 613.06 273.391 602.154 269.164 574.954 261.34 0.8 0.8 0.8 epoly
1 0 0 0 574.954 261.34 602.154 269.164 613.06 273.391 586.019 265.587 0.8 0.8 0.8 epoly
1 0 0 0 687.258 466.499 696.656 467.63 714.675 464.562 705.439 463.367 0.745098 0.745098 0.745098 epoly
1 0 0 0 328.72 170.18 327.24 138.7 315.463 177.003 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 742.382 336.842 703.493 324.356 733.59 333.643 0.8 0.8 0.8 epoly
1 0 0 0 433.444 277.976 420.011 273.916 437.211 301.483 450.676 305.204 0.537255 0.537255 0.537255 epoly
1 0 0 0 587.292 475.379 583.422 441.35 572.25 439.808 576.074 474.357 0.47451 0.47451 0.47451 epoly
1 0 0 0 672.759 430.711 668.046 396.739 682.436 432.399 0.470588 0.470588 0.470588 epoly
1 0 0 0 330.229 202.258 342.189 206.903 324.214 221.699 0.466667 0.466667 0.466667 epoly
1 0 0 0 574.954 261.342 571.199 229.299 559.836 224.462 563.542 256.961 0.47451 0.47451 0.47451 epoly
1 0 0 0 563.542 256.961 559.836 224.462 571.199 229.299 574.954 261.342 0.47451 0.47451 0.47451 epoly
1 0 0 0 354.012 231.412 342.445 227.633 348.518 208.12 359.893 212.581 0.466667 0.466667 0.466667 epoly
1 0 0 0 336.264 182.751 330.228 202.258 359.893 212.581 365.793 193.688 0.505882 0.505882 0.505882 epoly
1 0 0 0 528.963 277.687 519.303 264.106 531.279 268.334 540.921 281.752 0.533333 0.533333 0.533333 epoly
1 0 0 0 460.296 234.46 457.602 202.62 447.065 229.651 0.478431 0.478431 0.478431 epoly
1 0 0 0 557.025 403.8 568.498 405.906 555.956 443.203 544.325 441.686 0.482353 0.482353 0.482353 epoly
1 0 0 0 652.359 450.564 659.689 468.448 642.268 471.484 634.978 453.837 0.380392 0.380392 0.380392 epoly
1 0 0 0 586.019 265.587 574.954 261.34 608.689 249.666 619.512 254.204 0.764706 0.764706 0.764706 epoly
1 0 0 0 574.954 261.342 586.019 265.589 619.513 254.205 608.69 249.666 0.768627 0.768627 0.768627 epoly
1 0 0 0 697.015 343.093 726.903 352.816 733.59 333.643 703.493 324.356 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 416.134 198.576 432.191 235.77 429.753 203.831 0.482353 0.482353 0.482353 epoly
1 0 0 0 585.182 274.816 562.349 299.245 574.954 261.34 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 553.393 370.034 549.829 336.893 569.81 365.662 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 541.61 367.351 525.508 371.714 537.389 374.296 553.393 370.034 0.756863 0.756863 0.756863 epoly
1 0 0 0 359.892 212.581 366.963 214.033 345.29 207.5 0.8 0.8 0.8 epoly
1 0 0 0 457.601 202.621 488.027 189.518 466.447 215.34 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 642.27 471.483 677.563 465.331 648.681 452.891 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 636.394 239.655 664.979 246.923 630.003 258.603 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 636.394 239.655 630.003 258.603 619.512 254.204 625.986 234.953 0.486275 0.486275 0.486275 epoly
1 0 0 0 563.406 384.764 537.389 374.297 557.024 403.802 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 703.492 324.356 740.298 314.403 715.068 338.428 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 449.727 262.56 463.042 266.901 433.443 277.977 420.01 273.918 0.776471 0.776471 0.776471 epoly
1 0 0 0 562.217 424.587 568.498 405.908 557.024 403.802 550.664 422.776 0.482353 0.482353 0.482353 epoly
1 0 0 0 452.399 215.968 447.063 229.652 432.189 235.769 437.64 222.182 0.270588 0.270588 0.270588 epoly
1 0 0 0 559.836 224.462 576.394 218.186 587.645 223.182 571.199 229.299 0.772549 0.772549 0.772549 epoly
1 0 0 0 555.956 443.203 576.074 474.357 572.25 439.808 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 642.269 471.485 659.691 468.449 644.984 432.573 627.644 436.084 0.380392 0.380392 0.380392 epoly
1 0 0 0 543.697 230.578 563.542 256.961 559.836 224.462 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 457.602 202.62 460.296 234.46 447.065 229.651 444.455 197.36 0.478431 0.478431 0.478431 epoly
1 0 0 0 713.598 390.966 704.255 388.592 668.046 396.741 677.706 398.931 0.74902 0.74902 0.74902 epoly
1 0 0 0 354.012 231.412 359.893 212.581 366.963 214.033 360.834 233.619 0.172549 0.172549 0.172549 epoly
1 0 0 0 563.406 384.764 537.389 374.297 569.809 365.661 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 574.8 387.166 581.123 368.362 619.279 381.312 612.839 400.252 0.231373 0.231373 0.231373 epoly
1 0 0 0 634.326 291.047 617.281 296.311 606.629 292.513 623.803 287.117 0.760784 0.760784 0.760784 epoly
1 0 0 0 648.681 452.891 677.563 465.331 655.115 434.237 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 668.046 396.739 685.918 392.717 700.384 428.86 682.436 432.399 0.372549 0.372549 0.372549 epoly
1 0 0 0 453.291 210.221 444.453 197.362 457.601 202.621 466.447 215.34 0.537255 0.537255 0.537255 epoly
1 0 0 0 441.965 291.44 463.042 266.901 450.676 305.204 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 572.402 313.096 582.682 327.26 593.835 330.566 583.591 316.582 0.533333 0.533333 0.533333 epoly
1 0 0 0 351.258 188.304 373.114 194.379 365.792 193.687 0.8 0.8 0.8 epoly
1 0 0 0 587.644 223.182 598.552 228.026 619.512 254.204 608.689 249.666 0.533333 0.533333 0.533333 epoly
1 0 0 0 457.604 202.62 430.891 191.938 452.4 215.968 0.478431 0.478431 0.478431 epoly
1 0 0 0 463.041 266.905 475.946 271.113 488.249 233.16 475.492 228.343 0.490196 0.490196 0.490196 epoly
1 0 0 0 642.268 471.484 621.344 469.29 634.978 453.837 0.470588 0.470588 0.470588 epoly
1 0 0 0 705.821 335.245 694.168 320.99 703.492 324.356 715.068 338.428 0.533333 0.533333 0.533333 epoly
1 0 0 0 713.598 390.966 684.121 380.38 674.544 377.898 704.255 388.592 0.658824 0.658824 0.658824 epoly
1 0 0 0 704.255 388.592 674.544 377.898 684.121 380.38 713.598 390.966 0.658824 0.658824 0.658824 epoly
1 0 0 0 315.463 177.003 300.037 171.321 305.981 151.893 321.341 157.885 0.505882 0.505882 0.505882 epoly
1 0 0 0 549.829 336.893 553.393 370.034 541.61 367.351 538.102 333.719 0.47451 0.47451 0.47451 epoly
1 0 0 0 538.102 333.719 541.61 367.351 553.393 370.034 549.829 336.893 0.478431 0.478431 0.478431 epoly
1 0 0 0 722.653 393.269 713.598 390.968 726.902 352.815 735.783 355.713 0.478431 0.478431 0.478431 epoly
1 0 0 0 572.402 313.096 549.827 336.897 582.682 327.26 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 568.498 405.908 601.948 398.036 574.8 387.167 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 563.406 384.764 557.024 403.802 568.498 405.908 574.8 387.167 0.482353 0.482353 0.482353 epoly
1 0 0 0 668.046 396.739 650.624 400.659 644.981 432.572 662.774 428.969 0.309804 0.309804 0.309804 epoly
1 0 0 0 761.204 332.049 735.783 355.715 749 317.906 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 549.938 211.607 576.393 218.186 569.957 237.606 543.698 230.579 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 604.646 333.77 632.226 343.24 621.586 340.107 593.833 330.565 0.658824 0.658824 0.658824 epoly
1 0 0 0 587.644 223.182 615.247 230.101 625.986 234.953 598.552 228.026 0.803922 0.803922 0.803922 epoly
1 0 0 0 727.856 427.019 722.655 393.265 746.575 423.374 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 634.978 453.837 627.644 436.085 644.983 432.574 652.359 450.564 0.376471 0.376471 0.376471 epoly
1 0 0 0 373.114 194.379 366.963 214.033 359.892 212.581 365.792 193.687 0.172549 0.172549 0.172549 epoly
1 0 0 0 682.438 432.398 687.258 466.499 705.439 463.367 700.385 428.858 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 625.743 362.309 619.28 381.312 581.122 368.362 587.467 349.495 0.235294 0.235294 0.235294 epoly
1 0 0 0 545.186 401.63 531.201 392.905 557.024 403.802 0.662745 0.662745 0.662745 epoly
1 0 0 0 644.984 432.573 659.691 468.449 655.116 434.237 0.470588 0.470588 0.470588 epoly
1 0 0 0 696.656 467.628 687.258 466.497 710.589 498.539 719.833 499.195 0.537255 0.537255 0.537255 epoly
1 0 0 0 704.255 388.592 713.598 390.966 690.557 361.767 681.063 358.993 0.533333 0.533333 0.533333 epoly
1 0 0 0 550.778 295.47 585.182 274.813 562.349 299.243 0.698039 0.698039 0.698039 epoly
1 0 0 0 562.349 299.245 550.779 295.472 563.542 256.959 574.954 261.34 0.486275 0.486275 0.486275 epoly
1 0 0 0 604.646 333.77 593.833 330.565 628.178 320.665 638.732 324.107 0.756863 0.756863 0.756863 epoly
1 0 0 0 638.733 324.108 628.178 320.665 593.834 330.565 604.647 333.77 0.756863 0.756863 0.756863 epoly
1 0 0 0 430.89 191.938 452.399 215.968 437.64 222.182 416.132 198.577 0.784314 0.784314 0.784314 epoly
1 0 0 0 416.133 198.578 437.641 222.183 452.4 215.968 430.891 191.938 0.780392 0.780392 0.780392 epoly
1 0 0 0 610.566 453.442 587.292 475.38 600.022 437.941 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 327.239 138.702 342.321 163.178 321.341 157.885 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 587.644 223.182 574.954 261.342 598.049 236.276 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 342.445 227.633 354.012 231.412 360.834 233.619 0.8 0.8 0.8 epoly
1 0 0 0 560.726 438.218 544.325 441.686 555.956 443.203 572.25 439.808 0.74902 0.74902 0.74902 epoly
1 0 0 0 371.712 174.731 379.286 174.658 357.245 169.045 0.8 0.8 0.8 epoly
1 0 0 0 619.512 254.204 623.803 287.119 630.003 258.603 0.470588 0.470588 0.470588 epoly
1 0 0 0 537.389 374.297 531.201 392.905 545.186 401.63 551.649 382.285 0.172549 0.172549 0.172549 epoly
1 0 0 0 342.446 227.634 359.894 212.581 348.519 208.121 0.466667 0.466667 0.466667 epoly
1 0 0 0 740.299 314.405 703.493 324.356 733.59 333.643 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 569.809 365.661 549.828 336.895 576.234 346.493 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 563.542 256.959 543.698 230.579 569.957 237.606 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 305.981 151.893 311.946 132.4 327.239 138.702 321.341 157.885 0.509804 0.509804 0.509804 epoly
1 0 0 0 343.664 175.864 357.246 169.045 342.323 163.179 328.72 170.18 0.803922 0.803922 0.803922 epoly
1 0 0 0 563.406 384.764 574.8 387.167 581.124 368.363 569.809 365.661 0.482353 0.482353 0.482353 epoly
1 0 0 0 638.733 324.108 610.954 315.072 600.221 311.571 628.178 320.665 0.8 0.8 0.8 epoly
1 0 0 0 634.978 453.837 621.344 469.29 627.644 436.085 0.470588 0.470588 0.470588 epoly
1 0 0 0 576.234 346.493 549.828 336.895 582.681 327.26 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 587.467 349.495 593.833 330.565 632.226 343.24 625.741 362.308 0.231373 0.231373 0.231373 epoly
1 0 0 0 537.389 374.297 563.406 384.764 551.649 382.285 525.509 371.714 0.662745 0.662745 0.662745 epoly
1 0 0 0 722.655 393.265 727.856 427.019 718.796 425.228 713.599 390.965 0.466667 0.466667 0.466667 epoly
1 0 0 0 659.69 468.446 655.115 434.235 677.563 465.331 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 563.406 384.764 537.389 374.297 551.649 382.285 0.658824 0.658824 0.658824 epoly
1 0 0 0 726.903 352.816 735.784 355.713 742.382 336.842 733.59 333.643 0.482353 0.482353 0.482353 epoly
1 0 0 0 435.895 310.307 450.676 305.204 437.211 301.483 422.372 306.714 0.772549 0.772549 0.772549 epoly
1 0 0 0 623.803 287.119 619.512 254.204 602.552 259.968 606.628 292.515 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 366.963 214.033 359.893 212.581 348.518 208.12 0.8 0.8 0.8 epoly
1 0 0 0 315.463 177.003 336.265 182.752 300.037 171.321 0.8 0.8 0.8 epoly
1 0 0 0 638.732 324.109 628.177 320.667 606.629 292.513 617.281 296.311 0.533333 0.533333 0.533333 epoly
1 0 0 0 363.253 149.72 385.479 154.868 377.652 155.712 0.8 0.8 0.8 epoly
1 0 0 0 601.948 398.036 574.8 387.166 612.839 400.252 0.658824 0.658824 0.658824 epoly
1 0 0 0 537.389 374.297 525.509 371.714 558.133 362.874 569.809 365.661 0.756863 0.756863 0.756863 epoly
1 0 0 0 713.599 390.966 722.654 393.267 734.482 408.153 725.511 406.062 0.533333 0.533333 0.533333 epoly
1 0 0 0 551.767 252.437 563.543 256.958 531.279 268.334 519.303 264.106 0.768627 0.768627 0.768627 epoly
1 0 0 0 672.759 430.711 682.436 432.399 700.384 428.86 690.864 427.093 0.745098 0.745098 0.745098 epoly
1 0 0 0 717.739 349.826 687.605 340.023 697.014 343.092 726.903 352.816 0.8 0.8 0.8 epoly
1 0 0 0 336.265 182.752 315.463 177.003 321.341 157.885 342.321 163.178 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 557.025 403.8 560.726 438.218 572.25 439.808 568.498 405.906 0.478431 0.478431 0.478431 epoly
1 0 0 0 735.783 355.715 726.902 352.817 740.297 314.405 749 317.906 0.478431 0.478431 0.478431 epoly
1 0 0 0 576.234 346.493 587.468 349.496 581.124 368.363 569.809 365.661 0.482353 0.482353 0.482353 epoly
1 0 0 0 595.641 288.594 572.402 313.096 562.349 299.243 585.182 274.813 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 506.911 388.254 482.091 377.647 500.591 407.392 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 581.122 368.362 619.28 381.312 589.058 372.199 0.658824 0.658824 0.658824 epoly
1 0 0 0 648.961 327.444 684.552 317.516 659.992 341.628 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 460.296 234.46 463.041 266.905 475.492 228.343 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 713.599 390.966 739.007 367.528 722.654 393.267 0.694118 0.694118 0.694118 epoly
1 0 0 0 441.965 291.44 450.676 305.204 437.211 301.483 428.514 287.546 0.537255 0.537255 0.537255 epoly
1 0 0 0 420.01 273.918 422.371 306.716 406.155 269.731 0.486275 0.486275 0.486275 epoly
1 0 0 0 457.602 202.62 444.455 197.36 462.33 223.373 475.492 228.343 0.533333 0.533333 0.533333 epoly
1 0 0 0 714.675 464.562 700.385 428.858 705.439 463.367 0.466667 0.466667 0.466667 epoly
1 0 0 0 572.402 313.096 560.86 309.499 550.778 295.47 562.349 299.243 0.533333 0.533333 0.533333 epoly
1 0 0 0 385.479 154.868 379.286 174.658 371.712 174.731 377.652 155.712 0.172549 0.172549 0.172549 epoly
1 0 0 0 717.739 349.826 726.903 352.816 703.493 324.356 694.169 320.99 0.533333 0.533333 0.533333 epoly
1 0 0 0 587.292 475.38 576.074 474.357 588.967 436.325 600.022 437.941 0.482353 0.482353 0.482353 epoly
1 0 0 0 563.542 256.961 574.954 261.342 587.645 223.182 576.394 218.186 0.486275 0.486275 0.486275 epoly
1 0 0 0 342.323 163.179 327.24 138.7 328.72 170.18 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 742.382 336.841 749.002 317.907 740.299 314.405 733.59 333.643 0.482353 0.482353 0.482353 epoly
1 0 0 0 722.653 393.269 747.797 370.229 739.006 367.529 713.598 390.968 0.694118 0.694118 0.694118 epoly
1 0 0 0 623.562 415.381 600.023 437.943 612.839 400.252 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 655.115 434.235 659.69 468.446 649.532 467.306 644.983 432.57 0.470588 0.470588 0.470588 epoly
1 0 0 0 305.981 151.893 342.321 163.178 321.341 157.885 0.8 0.8 0.8 epoly
1 0 0 0 700.384 428.858 714.673 464.558 698.172 445.286 0.466667 0.466667 0.466667 epoly
1 0 0 0 668.046 396.741 704.255 388.592 674.544 377.898 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 619.279 381.312 581.123 368.362 608.471 378.792 0.658824 0.658824 0.658824 epoly
1 0 0 0 593.834 330.565 615.018 359.483 587.468 349.496 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 589.149 307.961 562.349 299.243 582.681 327.26 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 516.302 316.169 526.004 330.447 538.102 333.721 528.416 319.627 0.537255 0.537255 0.537255 epoly
1 0 0 0 538.101 333.721 549.828 336.895 569.809 365.661 558.133 362.874 0.537255 0.537255 0.537255 epoly
1 0 0 0 549.829 336.893 538.102 333.719 558.135 362.874 569.81 365.662 0.533333 0.533333 0.533333 epoly
1 0 0 0 531.875 225.748 543.698 230.579 563.542 256.959 551.766 252.439 0.533333 0.533333 0.533333 epoly
1 0 0 0 463.042 266.901 441.965 291.44 428.514 287.546 449.727 262.56 0.705882 0.705882 0.705882 epoly
1 0 0 0 449.727 262.56 428.514 287.546 441.965 291.44 463.042 266.901 0.709804 0.709804 0.709804 epoly
1 0 0 0 649.822 338.478 638.732 324.107 648.961 327.444 659.992 341.628 0.533333 0.533333 0.533333 epoly
1 0 0 0 574.8 387.166 601.948 398.036 608.471 378.792 581.123 368.362 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 595.543 352.96 587.467 349.495 581.122 368.362 589.058 372.199 0.172549 0.172549 0.172549 epoly
1 0 0 0 475.019 183.911 488.027 189.518 457.601 202.621 444.453 197.362 0.788235 0.788235 0.788235 epoly
1 0 0 0 576.234 346.493 582.681 327.26 593.834 330.565 587.468 349.496 0.482353 0.482353 0.482353 epoly
1 0 0 0 687.256 466.498 700.384 428.858 705.437 463.367 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 562.349 299.245 585.182 274.816 573.803 270.599 550.779 295.472 0.698039 0.698039 0.698039 epoly
1 0 0 0 595.543 352.96 625.743 362.309 587.467 349.495 0.658824 0.658824 0.658824 epoly
1 0 0 0 604.1 472.375 608.255 507.471 587.292 475.378 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 342.322 163.178 315.463 177.003 336.265 182.752 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 516.302 316.169 494.412 340.055 526.004 330.447 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 437.211 301.483 420.011 273.916 422.372 306.714 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 731.317 310.789 740.298 314.403 703.492 324.356 694.168 320.99 0.752941 0.752941 0.752941 epoly
1 0 0 0 506.911 388.254 500.591 407.392 513 409.453 519.244 390.615 0.486275 0.486275 0.486275 epoly
1 0 0 0 705.821 335.245 681.062 358.994 694.168 320.99 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 549.828 336.895 576.234 346.493 564.641 343.395 538.101 333.721 0.658824 0.658824 0.658824 epoly
1 0 0 0 538.101 333.721 564.641 343.395 576.234 346.493 549.828 336.895 0.658824 0.658824 0.658824 epoly
1 0 0 0 531.875 225.748 558.263 232.769 569.957 237.606 543.698 230.579 0.8 0.8 0.8 epoly
1 0 0 0 672.759 430.711 668.046 396.739 690.864 427.093 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 558.263 232.769 543.698 230.579 569.957 237.606 0.8 0.8 0.8 epoly
1 0 0 0 672.759 430.711 662.774 428.969 644.981 432.572 655.113 434.236 0.745098 0.745098 0.745098 epoly
1 0 0 0 674.544 377.898 704.255 388.592 681.063 358.993 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 733.157 461.41 714.673 464.558 700.384 428.858 718.798 425.227 0.392157 0.392157 0.392157 epoly
1 0 0 0 677.899 336.857 648.961 327.444 671.271 356.131 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 541.61 367.351 538.102 333.719 525.508 371.714 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 466.448 215.34 488.027 189.518 475.492 228.343 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 598.049 236.276 608.69 249.666 619.513 254.205 608.917 240.971 0.533333 0.533333 0.533333 epoly
1 0 0 0 615.018 359.483 587.467 349.495 625.741 362.308 0.658824 0.658824 0.658824 epoly
1 0 0 0 549.828 336.895 538.101 333.721 571.171 323.848 582.681 327.26 0.760784 0.760784 0.760784 epoly
1 0 0 0 747.797 370.229 735.783 355.713 726.902 352.815 739.006 367.529 0.533333 0.533333 0.533333 epoly
1 0 0 0 701.58 501.853 719.833 499.195 710.589 498.539 692.169 501.246 0.741176 0.741176 0.741176 epoly
1 0 0 0 549.938 211.607 543.698 230.579 558.263 232.769 564.782 213.03 0.176471 0.176471 0.176471 epoly
1 0 0 0 422.371 306.716 420.01 273.918 434.677 268.313 437.21 301.484 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 672.759 430.711 668.046 396.739 662.774 428.969 0.470588 0.470588 0.470588 epoly
1 0 0 0 674.869 251.479 664.979 246.923 658.383 266.318 668.359 270.566 0.482353 0.482353 0.482353 epoly
1 0 0 0 715.068 338.428 740.298 314.403 726.903 352.816 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 345.29 207.5 330.229 202.258 336.265 182.752 351.258 188.304 0.501961 0.501961 0.501961 epoly
1 0 0 0 469.268 311.434 450.673 305.203 456.846 286.085 475.499 292.246 0.231373 0.231373 0.231373 epoly
1 0 0 0 598.049 236.276 574.954 261.342 608.69 249.666 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 428.514 287.546 449.727 262.56 420.01 273.918 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 668.046 396.739 672.759 430.711 690.864 427.093 685.918 392.717 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 593.834 330.565 628.178 320.665 600.221 311.571 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 589.149 307.961 582.681 327.26 593.834 330.565 600.221 311.571 0.486275 0.486275 0.486275 epoly
1 0 0 0 684.55 317.518 648.961 327.444 677.899 336.857 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 668.044 396.74 704.255 388.59 679.326 411.747 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 525.508 371.714 513.253 369.051 506.911 388.254 519.244 390.615 0.486275 0.486275 0.486275 epoly
1 0 0 0 585.182 274.816 574.954 261.34 563.542 256.959 573.803 270.599 0.533333 0.533333 0.533333 epoly
1 0 0 0 606.629 292.513 619.512 254.202 623.803 287.117 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 456.871 349.616 475.507 356.04 481.753 336.912 463.059 330.557 0.227451 0.227451 0.227451 epoly
1 0 0 0 722.655 393.265 713.599 390.965 737.694 421.501 746.575 423.374 0.533333 0.533333 0.533333 epoly
1 0 0 0 576.393 218.186 549.938 211.607 564.782 213.03 0.803922 0.803922 0.803922 epoly
1 0 0 0 600.023 437.943 588.967 436.328 601.948 398.036 612.839 400.252 0.482353 0.482353 0.482353 epoly
1 0 0 0 664.979 246.923 654.772 242.221 619.512 254.204 630.003 258.603 0.760784 0.760784 0.760784 epoly
1 0 0 0 735.783 355.715 761.204 332.049 752.596 328.732 726.902 352.817 0.694118 0.694118 0.694118 epoly
1 0 0 0 668.046 396.739 672.759 430.711 662.774 428.969 658.082 394.48 0.470588 0.470588 0.470588 epoly
1 0 0 0 604.1 472.375 587.292 475.378 576.074 474.355 593.003 471.291 0.745098 0.745098 0.745098 epoly
1 0 0 0 540.92 281.754 563.542 256.959 573.803 270.599 550.779 295.472 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 632.226 343.24 593.833 330.565 621.586 340.107 0.658824 0.658824 0.658824 epoly
1 0 0 0 677.899 336.857 671.271 356.131 681.063 358.993 687.605 340.023 0.482353 0.482353 0.482353 epoly
1 0 0 0 601.948 398.036 581.123 368.362 608.471 378.792 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 602.154 269.164 574.954 261.34 595.64 288.596 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 351.258 188.304 357.245 169.045 342.322 163.178 336.265 182.752 0.505882 0.505882 0.505882 epoly
1 0 0 0 481.75 272.993 463.04 266.903 456.846 286.085 475.499 292.246 0.231373 0.231373 0.231373 epoly
1 0 0 0 559.836 224.462 563.542 256.961 576.394 218.186 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 430.89 191.938 416.132 198.577 432.189 235.769 447.063 229.652 0.333333 0.333333 0.333333 epoly
1 0 0 0 669.429 409.701 658.081 394.481 668.044 396.74 679.326 411.747 0.533333 0.533333 0.533333 epoly
1 0 0 0 587.467 349.495 615.018 359.483 621.586 340.107 593.833 330.565 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 587.644 223.182 615.247 230.101 608.689 249.666 581.289 242.293 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 587.292 475.38 610.566 453.442 599.552 452.054 576.074 474.357 0.694118 0.694118 0.694118 epoly
1 0 0 0 664.979 246.923 636.394 239.655 625.986 234.953 654.772 242.221 0.803922 0.803922 0.803922 epoly
1 0 0 0 639.047 466.127 621.344 469.29 642.268 471.484 659.689 468.448 0.745098 0.745098 0.745098 epoly
1 0 0 0 690.864 427.091 700.384 428.858 687.256 466.498 677.562 465.331 0.478431 0.478431 0.478431 epoly
1 0 0 0 681.062 358.994 671.27 356.133 684.549 317.517 694.168 320.99 0.482353 0.482353 0.482353 epoly
1 0 0 0 739.007 367.528 751.389 382.58 734.482 408.153 722.654 393.267 0.290196 0.290196 0.290196 epoly
1 0 0 0 563.542 256.959 540.92 281.754 551.766 252.439 0.698039 0.698039 0.698039 epoly
1 0 0 0 420.01 273.918 406.155 269.731 420.874 263.982 434.677 268.313 0.776471 0.776471 0.776471 epoly
1 0 0 0 525.508 371.714 513.253 369.051 519.617 349.782 531.794 352.75 0.486275 0.486275 0.486275 epoly
1 0 0 0 452.399 215.968 430.89 191.938 447.063 229.652 0.478431 0.478431 0.478431 epoly
1 0 0 0 608.689 249.666 574.954 261.34 602.154 269.164 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 710.589 498.539 687.258 466.497 692.169 501.246 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 469.268 311.434 488.021 317.718 481.753 336.912 463.059 330.557 0.231373 0.231373 0.231373 epoly
1 0 0 0 593.833 330.565 628.179 320.663 604.307 344.862 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 288.21 209.979 294.114 190.682 330.229 202.258 324.214 221.699 0.227451 0.227451 0.227451 epoly
1 0 0 0 687.605 340.023 717.739 349.826 694.169 320.99 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 560.726 438.218 557.025 403.8 544.325 441.686 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 460.296 234.46 475.492 228.343 462.33 223.373 447.065 229.651 0.780392 0.780392 0.780392 epoly
1 0 0 0 345.29 207.5 366.963 214.033 330.229 202.258 0.8 0.8 0.8 epoly
1 0 0 0 655.115 434.235 644.983 432.57 667.558 464.127 677.563 465.331 0.537255 0.537255 0.537255 epoly
1 0 0 0 551.767 252.437 528.963 277.687 540.921 281.752 563.543 256.958 0.698039 0.698039 0.698039 epoly
1 0 0 0 761.204 332.049 749 317.906 740.297 314.405 752.596 328.732 0.533333 0.533333 0.533333 epoly
1 0 0 0 687.605 340.023 694.169 320.99 684.55 317.518 677.899 336.857 0.482353 0.482353 0.482353 epoly
1 0 0 0 697.175 536.661 692.169 501.244 706.596 536.722 0.470588 0.470588 0.470588 epoly
1 0 0 0 366.963 214.033 345.29 207.5 351.258 188.304 373.114 194.379 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 373.114 194.379 351.258 188.304 345.29 207.5 366.963 214.033 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 700.384 428.86 685.918 392.717 690.864 427.093 0.466667 0.466667 0.466667 epoly
1 0 0 0 538.101 333.721 558.133 362.873 531.794 352.75 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 601.948 398.036 612.839 400.252 619.279 381.312 608.471 378.792 0.482353 0.482353 0.482353 epoly
1 0 0 0 619.28 381.312 589.058 372.199 595.543 352.96 625.743 362.309 0.427451 0.427451 0.427451 epoly
1 0 0 0 625.743 362.309 595.543 352.96 589.058 372.199 619.28 381.312 0.431373 0.431373 0.431373 epoly
1 0 0 0 602.154 269.164 595.64 288.596 606.63 292.513 613.06 273.391 0.486275 0.486275 0.486275 epoly
1 0 0 0 532.327 440.121 513.001 409.453 538.746 420.909 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 581.124 368.363 597.317 376.192 569.809 365.661 0.658824 0.658824 0.658824 epoly
1 0 0 0 326.919 157.124 305.981 151.893 321.341 157.885 342.321 163.178 0.8 0.8 0.8 epoly
1 0 0 0 639.047 466.127 652.359 450.564 634.978 453.837 621.344 469.29 0.6 0.6 0.6 epoly
1 0 0 0 621.344 469.29 634.978 453.837 652.359 450.564 639.047 466.127 0.596078 0.596078 0.596078 epoly
1 0 0 0 466.448 215.34 475.492 228.343 462.33 223.373 453.291 210.221 0.533333 0.533333 0.533333 epoly
1 0 0 0 444.453 197.362 447.064 229.653 430.89 191.936 0.478431 0.478431 0.478431 epoly
1 0 0 0 638.732 324.109 634.326 291.047 623.803 287.117 628.177 320.667 0.470588 0.470588 0.470588 epoly
1 0 0 0 610.566 453.442 600.022 437.941 588.967 436.325 599.552 452.054 0.537255 0.537255 0.537255 epoly
1 0 0 0 593.193 341.746 582.679 327.259 593.833 330.565 604.307 344.862 0.533333 0.533333 0.533333 epoly
1 0 0 0 519.617 349.782 526.003 330.447 538.101 333.721 531.794 352.75 0.486275 0.486275 0.486275 epoly
1 0 0 0 553.393 370.034 569.81 365.662 558.135 362.874 541.61 367.351 0.756863 0.756863 0.756863 epoly
1 0 0 0 572.402 313.096 595.641 288.594 582.682 327.26 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 715.068 338.428 726.903 352.816 717.74 349.826 705.821 335.245 0.533333 0.533333 0.533333 epoly
1 0 0 0 698.172 445.286 714.672 464.558 695.904 462.135 0.470588 0.470588 0.470588 epoly
1 0 0 0 608.689 249.664 619.512 254.202 606.629 292.513 595.639 288.595 0.486275 0.486275 0.486275 epoly
1 0 0 0 674.624 313.932 684.552 317.516 648.961 327.444 638.732 324.107 0.752941 0.752941 0.752941 epoly
1 0 0 0 714.672 464.558 698.172 445.286 716.793 441.824 733.157 461.41 0.8 0.8 0.8 epoly
1 0 0 0 733.157 461.41 716.793 441.824 698.172 445.286 714.673 464.558 0.8 0.8 0.8 epoly
1 0 0 0 336.265 182.752 373.114 194.379 351.258 188.304 0.8 0.8 0.8 epoly
1 0 0 0 528.963 277.687 551.767 252.437 519.303 264.106 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 681.062 358.994 705.821 335.245 717.74 349.826 692.529 373.628 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 326.919 157.124 342.321 163.178 327.239 138.702 311.946 132.4 0.537255 0.537255 0.537255 epoly
1 0 0 0 615.247 230.101 587.644 223.182 608.689 249.666 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 700.283 360.39 692.531 373.625 681.064 358.991 688.555 345.682 0.290196 0.290196 0.290196 epoly
1 0 0 0 608.255 507.471 597.116 506.94 576.074 474.355 587.292 475.378 0.537255 0.537255 0.537255 epoly
1 0 0 0 569.808 365.661 581.123 368.362 601.948 398.036 590.707 395.748 0.537255 0.537255 0.537255 epoly
1 0 0 0 463.042 266.901 449.727 262.56 437.211 301.483 450.676 305.204 0.490196 0.490196 0.490196 epoly
1 0 0 0 488.027 189.518 466.448 215.34 453.291 210.221 475.019 183.911 0.705882 0.705882 0.705882 epoly
1 0 0 0 475.019 183.911 453.291 210.221 466.447 215.34 488.027 189.518 0.705882 0.705882 0.705882 epoly
1 0 0 0 572.402 313.096 595.641 288.594 560.86 309.499 0.698039 0.698039 0.698039 epoly
1 0 0 0 613.06 273.391 619.512 254.204 608.689 249.666 602.154 269.164 0.486275 0.486275 0.486275 epoly
1 0 0 0 525.508 371.714 551.648 382.285 513.253 369.051 0.662745 0.662745 0.662745 epoly
1 0 0 0 600.023 437.943 623.562 415.381 612.718 413.382 588.967 436.328 0.694118 0.694118 0.694118 epoly
1 0 0 0 576.234 346.493 603.949 356.567 587.468 349.496 0.658824 0.658824 0.658824 epoly
1 0 0 0 692.169 501.244 710.59 498.537 725.09 534.492 706.596 536.722 0.396078 0.396078 0.396078 epoly
1 0 0 0 630.093 396.254 634.528 430.857 612.839 400.252 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 606.629 292.513 628.177 320.667 623.803 287.117 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 740.298 314.403 715.068 338.428 705.821 335.245 731.317 310.789 0.694118 0.694118 0.694118 epoly
1 0 0 0 731.317 310.789 705.821 335.245 715.068 338.428 740.298 314.403 0.694118 0.694118 0.694118 epoly
1 0 0 0 462.33 223.373 444.455 197.36 447.065 229.651 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 550.664 422.776 577.558 434.659 544.326 441.686 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 550.664 422.776 544.326 441.686 532.327 440.121 538.746 420.909 0.482353 0.482353 0.482353 epoly
1 0 0 0 621.344 469.29 639.047 466.127 644.983 432.574 627.644 436.085 0.286275 0.286275 0.286275 epoly
1 0 0 0 705.821 335.245 681.062 358.994 696.279 331.961 0.694118 0.694118 0.694118 epoly
1 0 0 0 551.648 382.285 525.508 371.714 531.794 352.75 558.133 362.873 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 628.178 320.665 593.833 330.565 621.586 340.107 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 726.902 352.815 713.598 390.968 739.006 367.529 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 569.808 365.661 597.316 376.192 608.471 378.792 581.123 368.362 0.658824 0.658824 0.658824 epoly
1 0 0 0 567.989 285.137 585.182 274.814 595.641 288.594 578.26 299.042 0.227451 0.227451 0.227451 epoly
1 0 0 0 652.359 450.564 639.047 466.127 659.689 468.448 0.470588 0.470588 0.470588 epoly
1 0 0 0 695.905 462.134 677.562 465.331 687.256 466.498 705.437 463.367 0.745098 0.745098 0.745098 epoly
1 0 0 0 437.211 301.483 424.779 340.139 422.372 306.714 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 336.265 182.752 342.321 163.178 305.981 151.893 300.037 171.321 0.227451 0.227451 0.227451 epoly
1 0 0 0 595.641 288.594 585.182 274.813 550.778 295.47 560.86 309.499 0.227451 0.227451 0.227451 epoly
1 0 0 0 681.064 358.991 661.161 353.174 688.555 345.682 0.694118 0.694118 0.694118 epoly
1 0 0 0 456.041 307.796 450.673 305.203 456.846 286.085 462.348 288.297 0.172549 0.172549 0.172549 epoly
1 0 0 0 668.046 396.739 658.082 394.48 681.038 425.27 690.864 427.093 0.533333 0.533333 0.533333 epoly
1 0 0 0 578.259 299.041 560.859 309.5 550.778 295.472 567.988 285.137 0.227451 0.227451 0.227451 epoly
1 0 0 0 603.949 356.567 597.317 376.192 581.124 368.363 587.468 349.496 0.176471 0.176471 0.176471 epoly
1 0 0 0 649.821 338.478 684.55 317.515 659.991 341.627 0.694118 0.694118 0.694118 epoly
1 0 0 0 727.856 427.019 746.575 423.374 737.694 421.501 718.796 425.228 0.745098 0.745098 0.745098 epoly
1 0 0 0 447.064 229.653 444.453 197.362 459.538 190.725 462.328 223.375 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 681.062 358.994 705.821 335.245 696.279 331.961 671.27 356.133 0.694118 0.694118 0.694118 epoly
1 0 0 0 308.602 216.61 288.21 209.979 324.214 221.699 0.8 0.8 0.8 epoly
1 0 0 0 563.542 256.959 550.779 295.472 573.803 270.599 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 385.479 154.868 363.253 149.72 357.245 169.045 379.286 174.658 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 558.135 362.874 538.102 333.719 541.61 367.351 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 453.291 210.221 475.019 183.911 444.453 197.362 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 619.512 254.204 654.772 242.221 625.986 234.953 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 615.018 359.483 625.741 362.308 632.226 343.24 621.586 340.107 0.482353 0.482353 0.482353 epoly
1 0 0 0 615.247 230.101 608.689 249.666 619.512 254.204 625.986 234.953 0.486275 0.486275 0.486275 epoly
1 0 0 0 519.617 349.782 558.133 362.873 531.794 352.75 0.662745 0.662745 0.662745 epoly
1 0 0 0 705.821 335.245 731.317 310.789 694.168 320.99 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 500.591 407.392 513.001 409.453 532.327 440.121 519.943 438.506 0.537255 0.537255 0.537255 epoly
1 0 0 0 623.562 415.381 612.839 400.252 601.948 398.036 612.718 413.382 0.537255 0.537255 0.537255 epoly
1 0 0 0 550.664 422.776 538.746 420.909 545.186 401.63 557.024 403.802 0.482353 0.482353 0.482353 epoly
1 0 0 0 603.949 356.567 576.234 346.493 587.468 349.496 615.018 359.483 0.658824 0.658824 0.658824 epoly
1 0 0 0 540.92 281.754 550.779 295.472 562.057 266.247 551.766 252.439 0.286275 0.286275 0.286275 epoly
1 0 0 0 597.518 244.981 581.289 242.293 608.689 249.666 0.8 0.8 0.8 epoly
1 0 0 0 560.726 438.218 564.499 473.302 544.325 441.686 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 694.611 386.14 704.255 388.59 668.044 396.74 658.081 394.481 0.74902 0.74902 0.74902 epoly
1 0 0 0 761.202 332.049 726.901 352.817 752.594 328.732 0.694118 0.694118 0.694118 epoly
1 0 0 0 558.133 362.874 525.509 371.714 551.649 382.285 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 500.591 407.392 526.443 418.981 538.746 420.909 513.001 409.453 0.662745 0.662745 0.662745 epoly
1 0 0 0 690.864 427.091 695.905 462.134 705.437 463.367 700.384 428.858 0.470588 0.470588 0.470588 epoly
1 0 0 0 422.371 306.716 437.21 301.484 420.874 263.982 406.155 269.731 0.333333 0.333333 0.333333 epoly
1 0 0 0 538.101 333.721 571.172 323.847 548.005 348.133 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 630.093 396.254 612.839 400.252 601.948 398.036 619.335 393.945 0.74902 0.74902 0.74902 epoly
1 0 0 0 716.793 441.824 718.798 425.227 700.384 428.858 698.172 445.286 0.313725 0.313725 0.313725 epoly
1 0 0 0 700.382 428.859 695.904 462.135 690.862 427.093 0.466667 0.466667 0.466667 epoly
1 0 0 0 612.944 283.061 595.639 288.595 606.629 292.513 623.803 287.117 0.760784 0.760784 0.760784 epoly
1 0 0 0 644.983 432.574 639.047 466.127 652.359 450.564 0.470588 0.470588 0.470588 epoly
1 0 0 0 587.644 223.182 581.289 242.293 597.518 244.981 604.162 225.092 0.176471 0.176471 0.176471 epoly
1 0 0 0 734.482 408.153 751.389 382.58 725.511 406.062 0.694118 0.694118 0.694118 epoly
1 0 0 0 330.229 202.258 294.114 190.682 314.687 196.85 0.8 0.8 0.8 epoly
1 0 0 0 437.211 301.483 449.727 262.56 428.514 287.546 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 572.402 313.096 582.682 327.26 571.172 323.849 560.86 309.499 0.533333 0.533333 0.533333 epoly
1 0 0 0 739.005 367.531 726.901 352.817 761.202 332.049 773.682 346.512 0.231373 0.231373 0.231373 epoly
1 0 0 0 603.949 356.567 615.018 359.483 593.834 330.565 582.681 327.26 0.533333 0.533333 0.533333 epoly
1 0 0 0 469.268 311.434 461.628 310.496 450.673 305.203 0.662745 0.662745 0.662745 epoly
1 0 0 0 705.821 335.245 694.168 320.99 684.549 317.517 696.279 331.961 0.533333 0.533333 0.533333 epoly
1 0 0 0 659.69 468.446 677.563 465.331 667.558 464.127 649.532 467.306 0.745098 0.745098 0.745098 epoly
1 0 0 0 632.226 343.24 638.732 324.107 628.178 320.665 621.586 340.107 0.482353 0.482353 0.482353 epoly
1 0 0 0 726.902 352.815 740.299 314.403 745.789 348.164 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 679.326 411.747 704.255 388.59 690.864 427.093 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 288.21 209.979 308.602 216.61 314.687 196.85 294.114 190.682 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 571.172 323.849 538.101 333.723 560.86 309.499 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 589.058 372.199 619.28 381.312 597.318 376.192 0.658824 0.658824 0.658824 epoly
1 0 0 0 444.453 197.362 430.89 191.936 446.037 185.121 459.538 190.725 0.788235 0.788235 0.788235 epoly
1 0 0 0 567.989 285.137 562.052 266.247 585.182 274.814 0.698039 0.698039 0.698039 epoly
1 0 0 0 563.406 384.764 551.649 382.285 545.186 401.63 557.024 403.802 0.482353 0.482353 0.482353 epoly
1 0 0 0 740.297 314.405 726.902 352.817 752.596 328.732 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 725.09 534.492 719.834 499.193 744.071 532.203 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 737.694 421.501 713.599 390.965 718.796 425.228 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 697.175 536.661 706.596 536.722 725.09 534.492 715.841 534.394 0.741176 0.741176 0.741176 epoly
1 0 0 0 615.247 230.101 587.644 223.182 604.162 225.092 0.803922 0.803922 0.803922 epoly
1 0 0 0 696.28 331.96 671.271 356.131 659.991 341.627 684.55 317.515 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 709.445 423.38 718.796 425.228 700.382 428.859 690.862 427.093 0.745098 0.745098 0.745098 epoly
1 0 0 0 330.229 202.258 324.214 221.699 342.446 227.634 348.519 208.121 0.227451 0.227451 0.227451 epoly
1 0 0 0 449.727 262.562 437.21 301.484 434.677 268.313 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 714.672 464.558 733.157 461.41 714.736 458.853 695.904 462.135 0.745098 0.745098 0.745098 epoly
1 0 0 0 550.778 295.472 562.051 266.247 567.988 285.137 0.698039 0.698039 0.698039 epoly
1 0 0 0 535.927 345.052 526.003 330.447 538.101 333.721 548.005 348.133 0.537255 0.537255 0.537255 epoly
1 0 0 0 710.589 498.539 697.175 536.663 692.169 501.246 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 671.271 356.131 661.165 353.178 649.821 338.478 659.991 341.627 0.533333 0.533333 0.533333 epoly
1 0 0 0 595.641 288.594 572.402 313.096 560.86 309.499 584.299 284.55 0.698039 0.698039 0.698039 epoly
1 0 0 0 617.283 317.11 628.179 320.663 593.833 330.565 582.679 327.259 0.756863 0.756863 0.756863 epoly
1 0 0 0 588.967 436.325 576.074 474.357 599.552 452.054 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 420.874 263.982 437.21 301.484 434.677 268.313 0.482353 0.482353 0.482353 epoly
1 0 0 0 305.981 151.893 326.919 157.124 311.946 132.4 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 481.753 336.912 455.204 330.323 463.059 330.557 0.662745 0.662745 0.662745 epoly
1 0 0 0 593.193 341.746 569.808 365.663 582.679 327.259 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 724.094 460.152 718.796 425.226 733.157 461.413 0.466667 0.466667 0.466667 epoly
1 0 0 0 608.689 249.664 612.944 283.061 623.803 287.117 619.512 254.202 0.470588 0.470588 0.470588 epoly
1 0 0 0 560.726 438.218 544.325 441.686 532.326 440.121 548.832 436.577 0.74902 0.74902 0.74902 epoly
1 0 0 0 456.846 286.085 468.074 290.6 475.499 292.246 0.662745 0.662745 0.662745 epoly
1 0 0 0 645.26 304.91 674.622 313.933 638.732 324.107 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 645.26 304.91 638.732 324.107 628.178 320.665 634.792 301.155 0.482353 0.482353 0.482353 epoly
1 0 0 0 456.041 307.796 423.311 297.642 450.673 305.203 0.662745 0.662745 0.662745 epoly
1 0 0 0 410.731 336.931 408.421 303.007 422.372 306.714 424.779 340.139 0.486275 0.486275 0.486275 epoly
1 0 0 0 550.664 422.776 577.558 434.659 538.746 420.909 0.662745 0.662745 0.662745 epoly
1 0 0 0 564.641 343.395 538.101 333.721 558.133 362.874 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 558.263 232.769 531.875 225.748 551.766 252.439 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 713.597 390.966 751.388 382.579 725.51 406.061 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 603.95 356.568 625.743 362.309 595.543 352.96 0.658824 0.658824 0.658824 epoly
1 0 0 0 423.311 297.642 429.635 277.895 456.846 286.085 450.673 305.203 0.494118 0.494118 0.494118 epoly
1 0 0 0 577.558 434.659 550.664 422.776 557.024 403.802 584.122 415.237 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 563.406 384.764 569.809 365.661 558.133 362.874 551.649 382.285 0.482353 0.482353 0.482353 epoly
1 0 0 0 716.793 441.824 733.157 461.41 718.798 425.227 0.466667 0.466667 0.466667 epoly
1 0 0 0 526.003 330.449 548.946 305.787 560.86 309.499 538.101 333.723 0.701961 0.701961 0.701961 epoly
1 0 0 0 604.307 344.862 628.179 320.663 615.019 359.484 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 324.214 221.699 330.23 202.259 366.963 214.033 360.834 233.619 0.227451 0.227451 0.227451 epoly
1 0 0 0 674.624 313.932 649.822 338.478 659.992 341.628 684.552 317.516 0.694118 0.694118 0.694118 epoly
1 0 0 0 681.062 358.994 692.529 373.628 708.28 346.74 696.279 331.961 0.290196 0.290196 0.290196 epoly
1 0 0 0 475.035 314.165 488.021 317.718 481.753 336.912 468.691 333.67 0.490196 0.490196 0.490196 epoly
1 0 0 0 571.171 323.848 538.101 333.721 564.641 343.395 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 719.834 499.193 725.09 534.492 715.841 534.395 710.59 498.537 0.466667 0.466667 0.466667 epoly
1 0 0 0 667.558 464.127 644.983 432.57 649.532 467.306 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 672.769 368.215 661.161 353.174 681.064 358.991 692.531 373.625 0.533333 0.533333 0.533333 epoly
1 0 0 0 619.28 381.312 625.743 362.309 603.95 356.568 597.318 376.192 0.482353 0.482353 0.482353 epoly
1 0 0 0 739.007 367.528 713.599 390.966 725.511 406.062 751.389 382.58 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 469.268 311.434 461.628 310.496 488.021 317.718 0.662745 0.662745 0.662745 epoly
1 0 0 0 408.421 303.007 423.314 297.643 437.211 301.483 422.372 306.714 0.776471 0.776471 0.776471 epoly
1 0 0 0 634.528 430.857 623.736 429.084 601.948 398.036 612.839 400.252 0.537255 0.537255 0.537255 epoly
1 0 0 0 710.588 498.538 719.832 499.195 731.814 515.512 722.657 515.11 0.537255 0.537255 0.537255 epoly
1 0 0 0 488.027 189.518 475.019 183.911 462.33 223.373 475.492 228.343 0.494118 0.494118 0.494118 epoly
1 0 0 0 716.25 403.902 704.254 388.592 713.597 390.966 725.51 406.061 0.533333 0.533333 0.533333 epoly
1 0 0 0 623.561 415.381 588.966 436.327 612.717 413.381 0.694118 0.694118 0.694118 epoly
1 0 0 0 672.759 430.711 690.864 427.093 681.038 425.27 662.774 428.969 0.745098 0.745098 0.745098 epoly
1 0 0 0 639.049 466.13 644.983 432.57 649.532 467.306 0.470588 0.470588 0.470588 epoly
1 0 0 0 641.429 281.578 651.81 285.646 645.26 304.91 634.792 301.155 0.482353 0.482353 0.482353 epoly
1 0 0 0 456.846 286.085 429.635 277.895 462.348 288.297 0.662745 0.662745 0.662745 epoly
1 0 0 0 751.384 382.582 734.479 408.15 733.827 393.235 0.694118 0.694118 0.694118 epoly
1 0 0 0 545.186 401.63 584.122 415.237 557.024 403.802 0.662745 0.662745 0.662745 epoly
1 0 0 0 692.529 373.626 717.74 349.824 704.256 388.593 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 718.796 425.226 737.694 421.499 752.126 458.182 733.157 461.413 0.384314 0.384314 0.384314 epoly
1 0 0 0 731.318 310.789 740.299 314.403 726.902 352.815 717.738 349.826 0.482353 0.482353 0.482353 epoly
1 0 0 0 740.298 314.403 731.317 310.789 717.74 349.826 726.903 352.816 0.482353 0.482353 0.482353 epoly
1 0 0 0 733.829 393.236 734.48 408.151 716.252 403.901 0.694118 0.694118 0.694118 epoly
1 0 0 0 662.775 428.967 667.558 464.127 649.532 467.306 644.983 432.57 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 463.042 266.903 456.848 286.086 429.635 277.896 435.981 258.08 0.490196 0.490196 0.490196 epoly
1 0 0 0 564.641 343.395 558.133 362.874 569.809 365.661 576.234 346.493 0.486275 0.486275 0.486275 epoly
1 0 0 0 558.263 232.769 551.766 252.439 563.542 256.959 569.957 237.606 0.490196 0.490196 0.490196 epoly
1 0 0 0 649.822 338.478 674.624 313.932 638.732 324.107 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 373.115 194.379 366.964 214.033 330.228 202.258 336.264 182.752 0.227451 0.227451 0.227451 epoly
1 0 0 0 366.963 214.033 373.114 194.379 336.265 182.752 330.229 202.258 0.227451 0.227451 0.227451 epoly
1 0 0 0 710.588 498.538 736.36 476.338 719.832 499.195 0.694118 0.694118 0.694118 epoly
1 0 0 0 462.33 223.373 449.726 262.564 447.065 229.651 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 599.551 452.056 588.966 436.327 623.561 415.381 634.528 430.855 0.227451 0.227451 0.227451 epoly
1 0 0 0 608.255 507.471 604.1 472.375 593.003 471.291 597.116 506.94 0.47451 0.47451 0.47451 epoly
1 0 0 0 692.169 501.244 697.175 536.661 715.841 534.394 710.59 498.537 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 604.099 472.374 597.115 506.939 593.002 471.29 0.47451 0.47451 0.47451 epoly
1 0 0 0 588.967 436.325 601.949 398.034 606.123 432.751 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 546.079 359.996 519.617 349.782 531.794 352.75 558.133 362.873 0.662745 0.662745 0.662745 epoly
1 0 0 0 679.326 411.747 690.864 427.093 681.038 425.27 669.429 409.701 0.533333 0.533333 0.533333 epoly
1 0 0 0 658.082 394.482 662.774 428.97 647.801 392.15 0.470588 0.470588 0.470588 epoly
1 0 0 0 714.737 458.853 695.904 462.135 700.382 428.859 718.796 425.228 0.309804 0.309804 0.309804 epoly
1 0 0 0 569.808 365.663 558.133 362.875 571.169 323.848 582.679 327.259 0.482353 0.482353 0.482353 epoly
1 0 0 0 746.573 423.371 734.479 408.15 751.384 382.582 764.054 397.983 0.290196 0.290196 0.290196 epoly
1 0 0 0 601.948 398.036 588.967 436.328 612.718 413.382 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 562.057 266.247 550.779 295.472 573.803 270.599 0.698039 0.698039 0.698039 epoly
1 0 0 0 342.445 227.633 360.834 233.619 366.963 214.033 348.518 208.12 0.227451 0.227451 0.227451 epoly
1 0 0 0 746.573 423.371 746.299 408.769 733.827 393.235 734.479 408.15 0.541176 0.541176 0.541176 epoly
1 0 0 0 734.48 408.151 733.829 393.236 746.301 408.769 746.574 423.371 0.541176 0.541176 0.541176 epoly
1 0 0 0 576.234 346.493 603.949 356.567 582.681 327.26 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 423.312 297.644 420.874 263.982 434.677 268.313 437.21 301.484 0.486275 0.486275 0.486275 epoly
1 0 0 0 734.48 408.151 746.574 423.371 728.527 419.567 716.252 403.901 0.533333 0.533333 0.533333 epoly
1 0 0 0 308.602 216.61 324.214 221.699 330.229 202.258 314.687 196.85 0.505882 0.505882 0.505882 epoly
1 0 0 0 726.902 352.815 765.177 343.388 739.006 367.529 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 564.499 473.302 552.549 472.212 532.326 440.121 544.325 441.686 0.537255 0.537255 0.537255 epoly
1 0 0 0 546.079 359.996 558.133 362.873 538.101 333.721 526.003 330.447 0.537255 0.537255 0.537255 epoly
1 0 0 0 687.451 536.6 682.459 500.62 692.169 501.246 697.175 536.663 0.470588 0.470588 0.470588 epoly
1 0 0 0 461.628 310.496 468.074 290.6 456.846 286.085 450.673 305.203 0.172549 0.172549 0.172549 epoly
1 0 0 0 463.042 266.903 455.179 264.33 448.772 284.22 456.848 286.086 0.466667 0.466667 0.466667 epoly
1 0 0 0 610.38 468.145 621.347 469.293 604.099 472.374 593.002 471.29 0.745098 0.745098 0.745098 epoly
1 0 0 0 576.234 346.493 582.681 327.26 571.171 323.848 564.641 343.395 0.482353 0.482353 0.482353 epoly
1 0 0 0 695.905 462.134 690.864 427.091 677.562 465.331 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 576.393 218.186 564.782 213.03 558.263 232.769 569.957 237.606 0.490196 0.490196 0.490196 epoly
1 0 0 0 765.176 343.389 773.682 346.512 761.202 332.049 752.594 328.732 0.533333 0.533333 0.533333 epoly
1 0 0 0 576.074 474.355 597.116 506.94 593.003 471.291 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 694.611 386.14 669.429 409.701 679.326 411.747 704.255 388.59 0.694118 0.694118 0.694118 epoly
1 0 0 0 704.255 388.59 679.326 411.747 669.429 409.701 694.611 386.14 0.694118 0.694118 0.694118 epoly
1 0 0 0 506.911 388.254 532.965 399.388 500.591 407.392 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 506.911 388.254 500.591 407.392 487.784 405.265 494.184 385.817 0.486275 0.486275 0.486275 epoly
1 0 0 0 584.121 415.237 557.024 403.802 590.707 395.748 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 684.549 317.517 671.27 356.133 696.279 331.961 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 447.064 229.653 462.328 223.375 446.037 185.121 430.89 191.936 0.333333 0.333333 0.333333 epoly
1 0 0 0 681.038 425.27 658.082 394.48 662.774 428.969 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 739.005 367.531 765.176 343.389 752.594 328.732 726.901 352.817 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 461.628 310.496 469.268 311.434 463.059 330.557 455.204 330.323 0.466667 0.466667 0.466667 epoly
1 0 0 0 345.676 228.677 324.214 221.699 360.834 233.619 0.8 0.8 0.8 epoly
1 0 0 0 551.648 382.285 558.133 362.873 519.617 349.782 513.253 369.051 0.231373 0.231373 0.231373 epoly
1 0 0 0 420.874 263.982 435.983 258.081 449.727 262.562 434.677 268.313 0.780392 0.780392 0.780392 epoly
1 0 0 0 475.501 292.247 468.076 290.6 448.772 284.22 456.848 286.086 0.662745 0.662745 0.662745 epoly
1 0 0 0 604.307 344.862 615.019 359.484 603.95 356.568 593.193 341.746 0.533333 0.533333 0.533333 epoly
1 0 0 0 462.33 223.373 475.019 183.911 453.291 210.221 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 463.061 330.558 481.755 336.912 468.092 356.743 448.804 350.081 0.572549 0.572549 0.572549 epoly
1 0 0 0 577.558 434.659 565.778 432.937 532.327 440.121 544.326 441.686 0.74902 0.74902 0.74902 epoly
1 0 0 0 559.287 320.324 571.172 323.847 538.101 333.721 526.003 330.447 0.760784 0.760784 0.760784 epoly
1 0 0 0 526.003 330.449 538.101 333.723 571.172 323.849 559.288 320.327 0.760784 0.760784 0.760784 epoly
1 0 0 0 729.932 364.742 717.738 349.826 726.902 352.815 739.006 367.529 0.533333 0.533333 0.533333 epoly
1 0 0 0 682.459 500.62 701.048 497.861 710.589 498.539 692.169 501.246 0.745098 0.745098 0.745098 epoly
1 0 0 0 654.771 242.221 664.979 246.923 658.383 266.318 648.088 261.934 0.486275 0.486275 0.486275 epoly
1 0 0 0 717.74 349.826 731.317 310.789 705.821 335.245 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 320.792 177.021 336.265 182.752 330.229 202.258 314.687 196.85 0.505882 0.505882 0.505882 epoly
1 0 0 0 330.228 202.258 366.964 214.033 333.201 202.782 0.8 0.8 0.8 epoly
1 0 0 0 662.774 428.97 658.082 394.482 676.108 390.367 681.037 425.272 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 589.149 307.961 617.283 317.112 582.681 327.26 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 475.501 292.247 456.848 286.086 455.179 264.33 474.545 270.634 0.772549 0.772549 0.772549 epoly
1 0 0 0 603.949 356.567 576.234 346.493 569.809 365.661 597.317 376.192 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 589.149 307.961 582.681 327.26 571.171 323.848 577.723 304.234 0.486275 0.486275 0.486275 epoly
1 0 0 0 429.635 277.896 456.848 286.086 448.772 284.22 0.662745 0.662745 0.662745 epoly
1 0 0 0 752.126 458.182 746.575 423.372 771.597 454.866 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 463.061 330.558 455.206 330.323 474.555 336.911 481.755 336.912 0.662745 0.662745 0.662745 epoly
1 0 0 0 745.789 348.164 740.299 314.403 765.177 343.39 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 669.429 409.701 694.611 386.14 658.081 394.481 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 724.094 460.152 733.157 461.413 752.126 458.182 743.248 456.853 0.745098 0.745098 0.745098 epoly
1 0 0 0 736.808 345.06 717.738 349.826 726.902 352.815 745.789 348.164 0.74902 0.74902 0.74902 epoly
1 0 0 0 475.019 183.913 462.328 223.375 459.538 190.725 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 725.09 534.492 710.59 498.537 715.841 534.394 0.466667 0.466667 0.466667 epoly
1 0 0 0 500.606 366.302 513.253 369.051 506.911 388.254 494.184 385.817 0.486275 0.486275 0.486275 epoly
1 0 0 0 563.542 256.959 551.766 252.439 562.057 266.247 573.803 270.599 0.533333 0.533333 0.533333 epoly
1 0 0 0 577.558 434.659 550.664 422.776 538.746 420.909 565.778 432.937 0.662745 0.662745 0.662745 epoly
1 0 0 0 737.694 421.501 724.094 460.154 718.796 425.228 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 612.944 283.061 608.689 249.664 595.639 288.595 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 719.834 499.193 710.59 498.537 735.006 532.068 744.071 532.203 0.537255 0.537255 0.537255 epoly
1 0 0 0 692.529 373.626 704.256 388.593 694.611 386.142 682.807 370.965 0.533333 0.533333 0.533333 epoly
1 0 0 0 516.566 403.443 519.942 438.508 500.591 407.392 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 590.709 395.747 601.949 398.034 588.967 436.325 577.558 434.658 0.482353 0.482353 0.482353 epoly
1 0 0 0 595.641 288.594 584.299 284.55 571.172 323.849 582.682 327.26 0.486275 0.486275 0.486275 epoly
1 0 0 0 617.283 317.11 593.193 341.746 604.307 344.862 628.179 320.663 0.694118 0.694118 0.694118 epoly
1 0 0 0 628.179 320.663 604.307 344.862 593.193 341.746 617.283 317.11 0.694118 0.694118 0.694118 epoly
1 0 0 0 461.628 310.496 469.268 311.434 475.499 292.246 468.074 290.6 0.466667 0.466667 0.466667 epoly
1 0 0 0 366.963 214.033 330.23 202.259 351.878 208.767 0.8 0.8 0.8 epoly
1 0 0 0 342.322 163.178 358.102 188.786 336.265 182.752 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 446.037 185.121 462.328 223.375 459.538 190.725 0.478431 0.478431 0.478431 epoly
1 0 0 0 708.28 346.74 692.529 373.628 717.74 349.826 0.694118 0.694118 0.694118 epoly
1 0 0 0 595.641 288.596 617.283 317.112 589.15 307.961 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 714.736 458.853 733.157 461.41 716.793 441.824 0.466667 0.466667 0.466667 epoly
1 0 0 0 597.117 506.938 576.074 474.355 603.737 487.575 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 597.316 376.192 569.808 365.661 590.707 395.748 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 435.982 258.083 433.412 224.688 447.065 229.651 449.726 262.564 0.482353 0.482353 0.482353 epoly
1 0 0 0 584.298 284.552 563.542 256.959 590.897 264.801 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 324.214 221.699 345.676 228.677 351.878 208.767 330.23 202.259 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 577.559 434.659 564.499 473.302 560.726 438.218 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 339.366 182.878 336.264 182.752 330.228 202.258 333.201 202.782 0.172549 0.172549 0.172549 epoly
1 0 0 0 320.792 177.021 326.919 157.124 342.322 163.178 336.265 182.752 0.505882 0.505882 0.505882 epoly
1 0 0 0 700.283 360.39 672.769 368.215 692.531 373.625 0.694118 0.694118 0.694118 epoly
1 0 0 0 339.366 182.878 373.115 194.379 336.264 182.752 0.8 0.8 0.8 epoly
1 0 0 0 455.206 330.323 463.061 330.558 448.804 350.081 0.466667 0.466667 0.466667 epoly
1 0 0 0 410.731 336.931 424.779 340.139 437.211 301.483 423.314 297.643 0.490196 0.490196 0.490196 epoly
1 0 0 0 455.179 264.33 456.848 286.086 448.772 284.22 0.466667 0.466667 0.466667 epoly
1 0 0 0 688.556 345.683 661.163 353.175 696.278 331.963 0.694118 0.694118 0.694118 epoly
1 0 0 0 475.508 356.04 468.09 356.743 474.554 336.911 481.754 336.912 0.466667 0.466667 0.466667 epoly
1 0 0 0 461.628 310.496 455.204 330.323 481.753 336.912 488.021 317.718 0.490196 0.490196 0.490196 epoly
1 0 0 0 535.926 345.052 571.17 323.846 548.004 348.133 0.698039 0.698039 0.698039 epoly
1 0 0 0 577.723 304.234 584.298 284.552 595.641 288.596 589.15 307.961 0.486275 0.486275 0.486275 epoly
1 0 0 0 690.862 427.093 704.256 388.591 709.445 423.38 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 569.808 365.663 593.193 341.746 581.72 338.53 558.133 362.875 0.698039 0.698039 0.698039 epoly
1 0 0 0 455.179 264.33 463.042 266.903 435.981 258.08 0.8 0.8 0.8 epoly
1 0 0 0 671.271 356.131 696.28 331.96 661.165 353.178 0.694118 0.694118 0.694118 epoly
1 0 0 0 736.36 476.338 748.912 492.903 731.814 515.512 719.832 499.195 0.290196 0.290196 0.290196 epoly
1 0 0 0 717.74 349.824 692.529 373.626 682.807 370.965 708.28 346.738 0.694118 0.694118 0.694118 epoly
1 0 0 0 742.409 380.005 751.388 382.579 713.597 390.966 704.254 388.592 0.74902 0.74902 0.74902 epoly
1 0 0 0 614.72 504.24 597.115 506.939 604.099 472.374 621.347 469.293 0.278431 0.278431 0.278431 epoly
1 0 0 0 603.737 487.575 576.074 474.355 610.38 468.145 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 557.024 403.802 584.121 415.237 572.427 413.197 545.185 401.63 0.662745 0.662745 0.662745 epoly
1 0 0 0 746.575 423.372 752.126 458.182 743.248 456.853 737.695 421.499 0.466667 0.466667 0.466667 epoly
1 0 0 0 731.318 310.789 736.808 345.06 745.789 348.164 740.299 314.403 0.466667 0.466667 0.466667 epoly
1 0 0 0 740.299 314.403 745.789 348.164 736.809 345.06 731.318 310.789 0.466667 0.466667 0.466667 epoly
1 0 0 0 562.052 266.247 572.583 280.377 595.641 288.594 585.182 274.814 0.533333 0.533333 0.533333 epoly
1 0 0 0 588.967 436.325 623.737 429.08 599.552 452.054 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 481.753 336.912 494.073 343.556 468.691 333.67 0.662745 0.662745 0.662745 epoly
1 0 0 0 593.193 341.746 617.283 317.11 582.679 327.259 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 658.082 394.482 647.801 392.15 665.981 387.938 676.108 390.367 0.74902 0.74902 0.74902 epoly
1 0 0 0 589.058 372.199 597.318 376.192 603.95 356.568 595.543 352.96 0.172549 0.172549 0.172549 epoly
1 0 0 0 572.582 280.377 578.259 299.041 567.988 285.137 562.051 266.247 0.541176 0.541176 0.541176 epoly
1 0 0 0 562.052 266.247 567.989 285.137 578.26 299.042 572.583 280.377 0.541176 0.541176 0.541176 epoly
1 0 0 0 696.28 331.96 684.55 317.515 649.821 338.478 661.165 353.178 0.227451 0.227451 0.227451 epoly
1 0 0 0 558.068 427.754 538.744 420.908 545.185 401.63 564.57 408.404 0.231373 0.231373 0.231373 epoly
1 0 0 0 433.412 224.688 448.741 218.242 462.33 223.373 447.065 229.651 0.784314 0.784314 0.784314 epoly
1 0 0 0 623.736 429.082 634.528 430.855 623.561 415.381 612.717 413.381 0.537255 0.537255 0.537255 epoly
1 0 0 0 662.775 428.967 644.983 432.57 639.049 466.13 657.228 462.883 0.301961 0.301961 0.301961 epoly
1 0 0 0 557.024 403.802 545.185 401.63 579.1 393.387 590.707 395.748 0.752941 0.752941 0.752941 epoly
1 0 0 0 737.693 421.501 746.573 423.373 758.943 438.941 750.159 437.298 0.533333 0.533333 0.533333 epoly
1 0 0 0 572.582 280.377 562.051 266.247 550.778 295.472 560.859 309.5 0.286275 0.286275 0.286275 epoly
1 0 0 0 731.814 515.512 757.786 493.667 744.071 532.203 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 695.905 462.134 701.046 497.862 677.562 465.331 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 645.26 304.91 664.37 310.232 634.792 301.155 0.8 0.8 0.8 epoly
1 0 0 0 765.176 343.389 739.005 367.531 773.682 346.512 0.694118 0.694118 0.694118 epoly
1 0 0 0 516.566 403.443 500.591 407.392 487.784 405.265 503.848 401.223 0.756863 0.756863 0.756863 epoly
1 0 0 0 475.508 356.04 481.754 336.912 494.073 343.556 487.547 363.464 0.172549 0.172549 0.172549 epoly
1 0 0 0 602.154 269.164 630.711 277.379 595.64 288.596 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 519.617 349.782 546.079 359.996 526.003 330.447 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 599.551 452.056 623.736 429.082 612.717 413.381 588.966 436.327 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 597.316 376.192 590.707 395.748 601.948 398.036 608.471 378.792 0.482353 0.482353 0.482353 epoly
1 0 0 0 602.154 269.164 595.64 288.596 584.298 284.552 590.897 264.801 0.486275 0.486275 0.486275 epoly
1 0 0 0 526.443 418.981 500.591 407.392 519.943 438.506 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 737.693 421.501 764.055 397.98 746.573 423.373 0.694118 0.694118 0.694118 epoly
1 0 0 0 634.528 430.857 630.093 396.254 619.335 393.945 623.736 429.084 0.470588 0.470588 0.470588 epoly
1 0 0 0 588.182 450.623 577.558 434.658 588.967 436.325 599.552 452.054 0.537255 0.537255 0.537255 epoly
1 0 0 0 593.193 341.746 582.679 327.259 571.169 323.848 581.72 338.53 0.533333 0.533333 0.533333 epoly
1 0 0 0 718.796 425.226 724.094 460.152 743.248 456.853 737.694 421.499 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 630.092 396.253 623.734 429.083 619.334 393.944 0.470588 0.470588 0.470588 epoly
1 0 0 0 571.172 323.849 584.299 284.55 560.86 309.499 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 705.821 335.245 696.279 331.961 708.28 346.74 717.74 349.826 0.533333 0.533333 0.533333 epoly
1 0 0 0 475.035 314.165 500.622 323.578 488.021 317.718 0.662745 0.662745 0.662745 epoly
1 0 0 0 674.622 313.933 664.37 310.232 628.178 320.665 638.732 324.107 0.752941 0.752941 0.752941 epoly
1 0 0 0 658.385 266.318 651.812 285.647 630.71 277.379 637.459 257.407 0.482353 0.482353 0.482353 epoly
1 0 0 0 688.556 345.683 696.278 331.963 708.279 346.741 700.284 360.39 0.290196 0.290196 0.290196 epoly
1 0 0 0 577.558 434.659 584.122 415.237 545.186 401.63 538.746 420.909 0.231373 0.231373 0.231373 epoly
1 0 0 0 345.676 228.677 330.23 202.258 351.878 208.767 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 606.123 432.751 601.949 398.034 623.737 429.082 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 595.641 288.594 572.583 280.377 578.26 299.042 0.698039 0.698039 0.698039 epoly
1 0 0 0 581.721 338.528 558.133 362.874 548.004 348.133 571.17 323.846 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 594.84 431.004 577.558 434.658 588.967 436.325 606.123 432.751 0.74902 0.74902 0.74902 epoly
1 0 0 0 703.87 517.632 735.004 532.067 697.175 536.661 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 703.87 517.632 697.175 536.661 687.451 536.598 694.237 517.263 0.478431 0.478431 0.478431 epoly
1 0 0 0 448.74 218.244 446.037 185.121 459.538 190.725 462.328 223.375 0.478431 0.478431 0.478431 epoly
1 0 0 0 672.769 368.215 700.283 360.39 688.555 345.682 661.161 353.174 0.423529 0.423529 0.423529 epoly
1 0 0 0 661.163 353.175 688.556 345.683 700.284 360.39 672.77 368.216 0.423529 0.423529 0.423529 epoly
1 0 0 0 698.172 445.286 695.904 462.135 714.736 458.853 716.793 441.824 0.305882 0.305882 0.305882 epoly
1 0 0 0 641.429 281.578 671.227 290.178 651.81 285.646 0.8 0.8 0.8 epoly
1 0 0 0 578.259 299.041 572.582 280.377 560.859 309.5 0.698039 0.698039 0.698039 epoly
1 0 0 0 564.499 473.3 576.074 474.355 597.117 506.938 585.615 506.389 0.537255 0.537255 0.537255 epoly
1 0 0 0 558.133 362.874 546.08 359.996 535.926 345.052 548.004 348.133 0.537255 0.537255 0.537255 epoly
1 0 0 0 551.767 252.439 563.542 256.959 584.298 284.552 572.586 280.376 0.533333 0.533333 0.533333 epoly
1 0 0 0 714.737 458.853 709.445 423.38 718.796 425.228 724.094 460.154 0.466667 0.466667 0.466667 epoly
1 0 0 0 423.312 297.644 437.21 301.484 449.727 262.562 435.983 258.081 0.494118 0.494118 0.494118 epoly
1 0 0 0 500.622 323.578 494.073 343.556 481.753 336.912 488.021 317.718 0.172549 0.172549 0.172549 epoly
1 0 0 0 637.186 389.744 647.8 392.15 630.092 396.253 619.334 393.944 0.74902 0.74902 0.74902 epoly
1 0 0 0 602.154 269.164 590.897 264.801 597.518 244.981 608.689 249.666 0.486275 0.486275 0.486275 epoly
1 0 0 0 709.445 423.38 714.737 458.853 718.796 425.228 0.466667 0.466667 0.466667 epoly
1 0 0 0 674.622 313.933 645.26 304.91 634.792 301.155 664.37 310.232 0.8 0.8 0.8 epoly
1 0 0 0 625.724 504.82 630.187 541.045 608.254 507.468 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 687.451 536.6 697.175 536.663 710.589 498.539 701.048 497.861 0.478431 0.478431 0.478431 epoly
1 0 0 0 601.948 398.036 623.736 429.084 619.335 393.945 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 694.611 386.14 704.256 388.591 690.862 427.093 681.036 425.269 0.482353 0.482353 0.482353 epoly
1 0 0 0 704.255 388.59 694.611 386.14 681.038 425.27 690.864 427.093 0.478431 0.478431 0.478431 epoly
1 0 0 0 612.944 283.061 617.282 317.113 595.639 288.595 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 756.392 340.164 765.177 343.388 726.902 352.815 717.738 349.826 0.74902 0.74902 0.74902 epoly
1 0 0 0 532.327 440.121 565.778 432.937 538.746 420.909 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 526.443 418.981 519.943 438.506 532.327 440.121 538.746 420.909 0.482353 0.482353 0.482353 epoly
1 0 0 0 576.074 474.355 603.737 487.575 592.322 486.709 564.499 473.3 0.662745 0.662745 0.662745 epoly
1 0 0 0 564.499 473.3 592.322 486.709 603.737 487.575 576.074 474.355 0.662745 0.662745 0.662745 epoly
1 0 0 0 468.09 356.743 475.508 356.04 487.547 363.464 0.662745 0.662745 0.662745 epoly
1 0 0 0 442.425 369.769 424.779 340.138 448.804 350.081 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 551.767 252.439 579.272 260.295 590.897 264.801 563.542 256.959 0.8 0.8 0.8 epoly
1 0 0 0 695.905 462.134 677.562 465.331 667.557 464.126 686.064 460.861 0.745098 0.745098 0.745098 epoly
1 0 0 0 408.421 303.007 410.731 336.931 423.314 297.643 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 710.588 498.538 735.004 532.067 703.87 517.632 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 468.092 356.743 481.755 336.912 474.555 336.911 0.466667 0.466667 0.466667 epoly
1 0 0 0 468.076 290.6 475.501 292.247 474.545 270.634 0.466667 0.466667 0.466667 epoly
1 0 0 0 671.227 290.178 664.37 310.232 645.26 304.91 651.81 285.646 0.176471 0.176471 0.176471 epoly
1 0 0 0 658.385 266.318 657.695 263.703 650.88 283.751 651.812 285.647 0.466667 0.466667 0.466667 epoly
1 0 0 0 651.812 285.647 650.88 283.751 657.695 263.703 658.385 266.318 0.466667 0.466667 0.466667 epoly
1 0 0 0 552.549 472.212 548.832 436.577 560.726 438.218 564.499 473.302 0.478431 0.478431 0.478431 epoly
1 0 0 0 564.499 473.302 560.726 438.218 548.832 436.577 552.549 472.212 0.478431 0.478431 0.478431 epoly
1 0 0 0 681.038 425.27 667.557 464.128 662.774 428.968 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 446.037 185.121 461.589 178.124 475.019 183.913 459.538 190.725 0.792157 0.792157 0.792157 epoly
1 0 0 0 576.074 474.355 564.499 473.3 599.054 466.96 610.38 468.145 0.74902 0.74902 0.74902 epoly
1 0 0 0 559.287 320.324 535.927 345.052 548.005 348.133 571.172 323.847 0.698039 0.698039 0.698039 epoly
1 0 0 0 694.237 517.263 701.046 497.86 710.588 498.538 703.87 517.632 0.478431 0.478431 0.478431 epoly
1 0 0 0 725.09 534.492 744.071 532.203 735.006 532.068 715.841 534.395 0.741176 0.741176 0.741176 epoly
1 0 0 0 709.445 423.38 728.525 419.568 737.694 421.501 718.796 425.228 0.745098 0.745098 0.745098 epoly
1 0 0 0 745.332 477.358 771.597 454.864 757.786 493.669 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 345.676 228.677 360.834 233.619 366.963 214.033 351.878 208.767 0.501961 0.501961 0.501961 epoly
1 0 0 0 366.964 214.033 333.201 202.782 339.366 182.878 373.115 194.379 0.435294 0.435294 0.435294 epoly
1 0 0 0 373.115 194.379 339.366 182.878 333.201 202.782 366.964 214.033 0.439216 0.439216 0.439216 epoly
1 0 0 0 590.709 395.747 594.84 431.004 606.123 432.751 601.949 398.034 0.47451 0.47451 0.47451 epoly
1 0 0 0 601.949 398.034 606.123 432.751 594.84 431.004 590.709 395.747 0.47451 0.47451 0.47451 epoly
1 0 0 0 658.383 266.318 678.107 270.053 648.088 261.934 0.803922 0.803922 0.803922 epoly
1 0 0 0 714.737 458.853 709.445 423.38 690.862 427.093 695.904 462.135 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 330.229 202.258 336.298 203.328 314.687 196.85 0.8 0.8 0.8 epoly
1 0 0 0 615.247 230.101 604.162 225.092 597.518 244.981 608.689 249.666 0.486275 0.486275 0.486275 epoly
1 0 0 0 423.311 297.642 456.041 307.796 462.348 288.297 429.635 277.895 0.431373 0.431373 0.431373 epoly
1 0 0 0 429.635 277.895 462.348 288.297 456.041 307.796 423.311 297.642 0.435294 0.435294 0.435294 epoly
1 0 0 0 564.57 408.404 584.122 415.238 577.559 434.659 558.068 427.754 0.231373 0.231373 0.231373 epoly
1 0 0 0 684.549 317.517 722.044 307.058 696.279 331.961 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 519.942 438.508 507.153 436.839 487.784 405.265 500.591 407.392 0.537255 0.537255 0.537255 epoly
1 0 0 0 752.126 458.182 737.694 421.499 743.248 456.853 0.466667 0.466667 0.466667 epoly
1 0 0 0 548.832 436.577 565.779 432.938 577.559 434.659 560.726 438.218 0.752941 0.752941 0.752941 epoly
1 0 0 0 494.073 343.556 481.754 336.912 474.554 336.911 0.662745 0.662745 0.662745 epoly
1 0 0 0 731.814 515.512 744.071 532.203 735.006 532.068 722.657 515.11 0.537255 0.537255 0.537255 epoly
1 0 0 0 506.911 388.254 520.344 397.072 494.184 385.817 0.662745 0.662745 0.662745 epoly
1 0 0 0 623.736 429.082 599.551 452.056 634.528 430.855 0.694118 0.694118 0.694118 epoly
1 0 0 0 746.575 423.372 737.695 421.499 762.918 453.465 771.597 454.866 0.533333 0.533333 0.533333 epoly
1 0 0 0 532.326 440.121 552.549 472.212 548.832 436.577 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 746.299 408.769 746.573 423.371 764.054 397.983 0.694118 0.694118 0.694118 epoly
1 0 0 0 740.299 314.403 731.318 310.789 756.392 340.166 765.177 343.39 0.533333 0.533333 0.533333 epoly
1 0 0 0 628.179 320.663 617.283 317.11 603.95 356.568 615.019 359.484 0.482353 0.482353 0.482353 epoly
1 0 0 0 651.812 285.647 658.385 266.318 678.109 270.054 671.229 290.179 0.176471 0.176471 0.176471 epoly
1 0 0 0 462.368 353.108 487.547 363.464 456.067 372.479 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 462.368 353.108 456.067 372.479 442.426 369.769 448.805 350.081 0.486275 0.486275 0.486275 epoly
1 0 0 0 630.71 277.379 651.812 285.647 650.88 283.751 0.8 0.8 0.8 epoly
1 0 0 0 728.527 419.567 746.574 423.371 746.301 408.769 0.694118 0.694118 0.694118 epoly
1 0 0 0 652.768 295.74 628.178 320.667 641.429 281.578 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 625.724 504.82 608.254 507.468 597.115 506.937 614.72 504.238 0.745098 0.745098 0.745098 epoly
1 0 0 0 535.927 345.052 559.287 320.324 526.003 330.447 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 560.859 309.501 584.298 284.552 595.039 298.829 571.171 323.85 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 612.944 283.061 595.639 288.595 584.297 284.551 601.731 278.873 0.760784 0.760784 0.760784 epoly
1 0 0 0 314.687 196.85 330.23 202.258 345.676 228.677 330.022 223.574 0.537255 0.537255 0.537255 epoly
1 0 0 0 662.774 428.97 681.037 425.272 665.981 387.938 647.801 392.15 0.376471 0.376471 0.376471 epoly
1 0 0 0 731.814 515.512 748.912 492.903 722.657 515.11 0.694118 0.694118 0.694118 epoly
1 0 0 0 623.736 429.082 601.948 398.036 630.449 409.447 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 602.154 269.164 630.711 277.379 590.897 264.801 0.8 0.8 0.8 epoly
1 0 0 0 654.771 242.221 685.013 249.857 664.979 246.923 0.803922 0.803922 0.803922 epoly
1 0 0 0 548.946 305.787 559.288 320.327 571.172 323.849 560.86 309.499 0.533333 0.533333 0.533333 epoly
1 0 0 0 320.792 177.021 342.596 183.01 336.265 182.752 0.8 0.8 0.8 epoly
1 0 0 0 435.982 258.083 449.726 262.564 462.33 223.373 448.741 218.242 0.494118 0.494118 0.494118 epoly
1 0 0 0 532.965 399.388 520.344 397.072 487.784 405.265 500.591 407.392 0.756863 0.756863 0.756863 epoly
1 0 0 0 686.426 328.57 674.621 313.933 684.549 317.517 696.279 331.961 0.533333 0.533333 0.533333 epoly
1 0 0 0 667.558 464.127 657.228 462.883 639.049 466.13 649.532 467.306 0.745098 0.745098 0.745098 epoly
1 0 0 0 630.711 277.379 602.154 269.164 608.689 249.666 637.46 257.408 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 736.808 345.06 731.318 310.789 717.738 349.826 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 681.038 425.27 694.611 386.14 669.429 409.701 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 757.786 493.667 731.814 515.512 722.657 515.11 748.912 492.903 0.694118 0.694118 0.694118 epoly
1 0 0 0 717.74 349.824 708.28 346.738 694.611 386.142 704.256 388.593 0.482353 0.482353 0.482353 epoly
1 0 0 0 314.687 196.85 336.298 203.328 351.878 208.767 330.23 202.258 0.8 0.8 0.8 epoly
1 0 0 0 548.946 305.787 526.003 330.449 559.288 320.327 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 742.409 380.005 716.25 403.902 725.51 406.061 751.388 382.579 0.694118 0.694118 0.694118 epoly
1 0 0 0 764.055 397.98 777.022 413.743 758.943 438.941 746.573 423.373 0.290196 0.290196 0.290196 epoly
1 0 0 0 584.298 284.552 560.859 309.501 572.586 280.376 0.698039 0.698039 0.698039 epoly
1 0 0 0 538.745 420.908 565.778 432.937 559.152 452.608 532.327 440.121 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 641.823 425.315 623.734 429.083 630.092 396.253 647.8 392.15 0.298039 0.298039 0.298039 epoly
1 0 0 0 630.449 409.447 601.948 398.036 637.186 389.744 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 735.006 532.068 710.59 498.537 715.841 534.395 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 709.445 423.38 704.256 388.591 728.525 419.568 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 500.606 366.302 526.975 377.083 513.253 369.051 0.662745 0.662745 0.662745 epoly
1 0 0 0 699.79 421.472 681.036 425.269 690.862 427.093 709.445 423.38 0.745098 0.745098 0.745098 epoly
1 0 0 0 667.558 464.127 662.775 428.967 657.228 462.883 0.470588 0.470588 0.470588 epoly
1 0 0 0 420.874 263.982 423.312 297.644 435.983 258.081 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 410.731 336.929 424.779 340.138 442.425 369.769 428.337 366.971 0.537255 0.537255 0.537255 epoly
1 0 0 0 685.013 249.857 678.107 270.053 658.383 266.318 664.979 246.923 0.176471 0.176471 0.176471 epoly
1 0 0 0 342.596 183.01 336.298 203.328 330.229 202.258 336.265 182.752 0.172549 0.172549 0.172549 epoly
1 0 0 0 657.695 263.703 658.385 266.318 637.459 257.407 0.803922 0.803922 0.803922 epoly
1 0 0 0 682.459 500.62 687.451 536.6 701.048 497.861 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 532.965 399.388 506.911 388.254 494.184 385.817 520.344 397.072 0.662745 0.662745 0.662745 epoly
1 0 0 0 461.63 310.497 423.311 297.642 456.041 307.796 0.662745 0.662745 0.662745 epoly
1 0 0 0 694.611 386.142 681.036 425.271 676.106 390.366 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 701.046 497.862 691.191 497.162 667.557 464.126 677.562 465.331 0.537255 0.537255 0.537255 epoly
1 0 0 0 471.598 368.031 474.562 403.07 456.066 372.478 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 612.59 427.249 623.737 429.08 588.967 436.325 577.558 434.658 0.74902 0.74902 0.74902 epoly
1 0 0 0 617.283 317.112 606.03 313.441 571.171 323.848 582.681 327.26 0.756863 0.756863 0.756863 epoly
1 0 0 0 765.176 343.389 773.682 346.512 786.448 361.306 778.05 358.389 0.533333 0.533333 0.533333 epoly
1 0 0 0 650.88 283.751 651.812 285.647 671.229 290.179 0.8 0.8 0.8 epoly
1 0 0 0 597.518 244.981 637.46 257.408 608.689 249.666 0.8 0.8 0.8 epoly
1 0 0 0 758.943 438.941 785.504 415.79 771.597 454.866 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 588.182 450.623 564.499 473.302 577.558 434.658 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 571.169 323.848 558.133 362.875 581.72 338.53 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 729.496 495.759 735.004 532.069 710.588 498.538 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 410.731 336.929 434.796 346.955 448.804 350.081 424.779 340.138 0.666667 0.666667 0.666667 epoly
1 0 0 0 610.38 468.145 614.72 504.24 621.347 469.293 0.47451 0.47451 0.47451 epoly
1 0 0 0 682.459 500.62 687.451 536.6 672.435 499.974 0.470588 0.470588 0.470588 epoly
1 0 0 0 526.975 377.083 520.344 397.072 506.911 388.254 513.253 369.051 0.172549 0.172549 0.172549 epoly
1 0 0 0 628.178 320.665 664.37 310.232 634.792 301.155 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 558.133 362.874 579.101 393.387 551.649 382.285 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 665.981 387.938 681.037 425.272 676.108 390.367 0.470588 0.470588 0.470588 epoly
1 0 0 0 721.618 439.244 690.863 427.093 728.524 419.567 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 552.549 472.21 532.327 440.121 559.152 452.608 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 462.348 288.297 468.076 290.6 461.63 310.497 456.041 307.796 0.172549 0.172549 0.172549 epoly
1 0 0 0 716.25 403.902 742.409 380.005 704.254 388.592 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 342.596 183.01 320.792 177.021 336.265 182.752 358.102 188.786 0.8 0.8 0.8 epoly
1 0 0 0 765.176 343.389 792.143 318.513 773.682 346.512 0.694118 0.694118 0.694118 epoly
1 0 0 0 657.226 462.884 652.467 427.17 662.774 428.968 667.557 464.128 0.470588 0.470588 0.470588 epoly
1 0 0 0 539.511 379.726 546.08 359.996 558.133 362.874 551.649 382.285 0.482353 0.482353 0.482353 epoly
1 0 0 0 606.03 313.441 577.723 304.234 589.15 307.961 617.283 317.112 0.8 0.8 0.8 epoly
1 0 0 0 617.283 317.112 589.149 307.961 577.723 304.234 606.03 313.441 0.8 0.8 0.8 epoly
1 0 0 0 745.332 477.358 757.786 493.669 748.912 492.905 736.36 476.34 0.537255 0.537255 0.537255 epoly
1 0 0 0 603.95 356.568 617.283 317.11 593.193 341.746 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 729.932 364.742 739.006 367.529 751.388 382.581 742.41 380.007 0.533333 0.533333 0.533333 epoly
1 0 0 0 628.178 320.667 617.283 317.114 630.71 277.379 641.429 281.578 0.482353 0.482353 0.482353 epoly
1 0 0 0 468.691 333.67 455.206 330.323 461.63 310.497 475.035 314.165 0.490196 0.490196 0.490196 epoly
1 0 0 0 462.348 288.297 429.635 277.895 468.076 290.6 0.662745 0.662745 0.662745 epoly
1 0 0 0 748.912 492.905 710.588 498.54 736.36 476.34 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 704.256 388.591 709.445 423.38 699.79 421.472 694.611 386.14 0.466667 0.466667 0.466667 epoly
1 0 0 0 694.611 386.14 699.79 421.472 709.445 423.38 704.256 388.591 0.466667 0.466667 0.466667 epoly
1 0 0 0 558.068 427.754 553.608 431.159 538.744 420.908 0.662745 0.662745 0.662745 epoly
1 0 0 0 730.882 440.86 762.915 453.464 724.094 460.152 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 736.36 476.338 710.588 498.538 722.657 515.11 748.912 492.903 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 730.882 440.86 724.094 460.152 714.737 458.851 721.618 439.244 0.478431 0.478431 0.478431 epoly
1 0 0 0 342.596 183.01 358.102 188.786 342.322 163.178 326.919 157.124 0.537255 0.537255 0.537255 epoly
1 0 0 0 678.109 270.054 658.385 266.318 657.695 263.703 0.803922 0.803922 0.803922 epoly
1 0 0 0 729.932 364.742 756.392 340.164 739.006 367.529 0.694118 0.694118 0.694118 epoly
1 0 0 0 614.72 504.24 610.38 468.145 593.002 471.29 597.115 506.939 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 370.615 148.615 385.48 154.868 379.286 174.658 364.348 168.736 0.505882 0.505882 0.505882 epoly
1 0 0 0 630.187 541.045 619.147 541.053 597.115 506.937 608.254 507.468 0.537255 0.537255 0.537255 epoly
1 0 0 0 590.708 395.749 601.948 398.036 623.736 429.082 612.589 427.251 0.537255 0.537255 0.537255 epoly
1 0 0 0 601.949 398.034 590.709 395.747 612.59 427.251 623.737 429.082 0.537255 0.537255 0.537255 epoly
1 0 0 0 617.282 317.113 606.029 313.443 584.297 284.551 595.639 288.595 0.533333 0.533333 0.533333 epoly
1 0 0 0 606.03 313.441 617.283 317.112 595.641 288.596 584.298 284.552 0.533333 0.533333 0.533333 epoly
1 0 0 0 448.74 218.244 462.328 223.375 475.019 183.913 461.589 178.124 0.494118 0.494118 0.494118 epoly
1 0 0 0 652.467 427.17 670.891 423.387 681.038 425.27 662.774 428.968 0.74902 0.74902 0.74902 epoly
1 0 0 0 333.201 202.782 366.964 214.033 336.298 203.328 0.8 0.8 0.8 epoly
1 0 0 0 694.611 386.142 708.28 346.738 682.807 370.965 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 510.361 381.509 487.785 405.267 500.606 366.302 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 429.685 343.476 410.73 336.929 417.01 317.319 436.025 323.793 0.227451 0.227451 0.227451 epoly
1 0 0 0 652.467 427.17 657.226 462.884 634.527 430.854 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 708.278 346.739 743.709 325.306 717.738 349.826 0.694118 0.694118 0.694118 epoly
1 0 0 0 714.737 458.853 724.094 460.154 737.694 421.501 728.525 419.568 0.478431 0.478431 0.478431 epoly
1 0 0 0 771.597 454.864 745.332 477.358 736.36 476.34 762.917 453.463 0.694118 0.694118 0.694118 epoly
1 0 0 0 756.392 340.164 729.932 364.742 739.006 367.529 765.177 343.388 0.694118 0.694118 0.694118 epoly
1 0 0 0 471.598 368.031 456.066 372.478 442.424 369.769 458.027 365.212 0.760784 0.760784 0.760784 epoly
1 0 0 0 551.648 382.285 579.1 393.387 572.427 413.197 545.185 401.63 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 637.459 257.407 608.688 249.666 644.232 237.366 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 590.708 395.749 619.393 407.29 630.449 409.447 601.948 398.036 0.658824 0.658824 0.658824 epoly
1 0 0 0 601.948 398.036 630.449 409.447 619.393 407.29 590.708 395.749 0.658824 0.658824 0.658824 epoly
1 0 0 0 729.496 495.759 710.588 498.538 701.046 497.86 720.135 495.027 0.741176 0.741176 0.741176 epoly
1 0 0 0 433.412 224.688 435.982 258.083 448.741 218.242 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 737.693 421.501 762.916 453.464 730.882 440.86 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 687.451 536.6 682.459 500.62 701.048 497.861 706.29 534.296 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 594.84 431.004 590.709 395.747 577.558 434.658 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 708.279 346.741 672.77 368.216 700.284 360.39 0.694118 0.694118 0.694118 epoly
1 0 0 0 558.133 362.874 581.721 338.528 546.08 359.996 0.698039 0.698039 0.698039 epoly
1 0 0 0 564.499 473.302 552.549 472.212 565.778 432.937 577.558 434.658 0.482353 0.482353 0.482353 epoly
1 0 0 0 552.549 472.212 564.499 473.302 577.559 434.659 565.779 432.938 0.482353 0.482353 0.482353 epoly
1 0 0 0 545.185 401.63 560.345 411.089 564.57 408.404 0.662745 0.662745 0.662745 epoly
1 0 0 0 601.948 398.036 590.708 395.749 626.221 387.257 637.186 389.744 0.752941 0.752941 0.752941 epoly
1 0 0 0 721.618 439.244 728.524 419.567 737.693 421.501 730.882 440.86 0.478431 0.478431 0.478431 epoly
1 0 0 0 630.711 277.379 619.639 273.04 584.298 284.552 595.64 288.596 0.760784 0.760784 0.760784 epoly
1 0 0 0 672.771 368.218 708.279 346.738 682.807 370.965 0.694118 0.694118 0.694118 epoly
1 0 0 0 752.126 458.182 771.597 454.866 762.918 453.465 743.248 456.853 0.745098 0.745098 0.745098 epoly
1 0 0 0 745.789 348.164 765.177 343.39 756.392 340.166 736.809 345.06 0.74902 0.74902 0.74902 epoly
1 0 0 0 701.046 497.863 727.094 475.289 736.36 476.34 710.588 498.54 0.694118 0.694118 0.694118 epoly
1 0 0 0 606.913 485.659 621.35 469.296 614.72 504.24 0.47451 0.47451 0.47451 epoly
1 0 0 0 772.648 400.258 799.509 376.442 785.504 415.792 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 664.372 310.233 628.178 320.667 652.768 295.74 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 690.863 427.093 721.618 439.244 712.05 437.574 681.037 425.27 0.658824 0.658824 0.658824 epoly
1 0 0 0 342.597 183.01 373.115 194.379 339.366 182.878 0.8 0.8 0.8 epoly
1 0 0 0 581.721 338.528 571.17 323.846 535.926 345.052 546.08 359.996 0.227451 0.227451 0.227451 epoly
1 0 0 0 729.932 364.742 756.392 340.164 717.738 349.826 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 519.942 438.505 532.327 440.121 552.549 472.21 540.205 471.085 0.537255 0.537255 0.537255 epoly
1 0 0 0 661.163 353.175 672.77 368.216 708.279 346.741 696.278 331.963 0.227451 0.227451 0.227451 epoly
1 0 0 0 670.889 423.389 665.979 387.937 676.106 390.366 681.036 425.271 0.470588 0.470588 0.470588 epoly
1 0 0 0 468.691 333.67 494.073 343.556 455.206 330.323 0.662745 0.662745 0.662745 epoly
1 0 0 0 630.711 277.379 602.154 269.164 590.897 264.801 619.639 273.04 0.8 0.8 0.8 epoly
1 0 0 0 758.943 438.941 771.597 454.866 762.918 453.465 750.159 437.298 0.533333 0.533333 0.533333 epoly
1 0 0 0 560.859 309.501 571.171 323.85 583.366 294.84 572.586 280.376 0.286275 0.286275 0.286275 epoly
1 0 0 0 735.004 532.067 725.639 531.926 687.451 536.598 697.175 536.661 0.741176 0.741176 0.741176 epoly
1 0 0 0 690.863 427.093 681.037 425.27 719.052 417.57 728.524 419.567 0.745098 0.745098 0.745098 epoly
1 0 0 0 712.465 303.204 722.044 307.058 684.549 317.517 674.621 313.933 0.752941 0.752941 0.752941 epoly
1 0 0 0 487.784 405.265 520.344 397.072 494.184 385.817 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 577.559 434.659 553.608 431.159 558.068 427.754 0.662745 0.662745 0.662745 epoly
1 0 0 0 366.964 214.033 373.115 194.379 342.597 183.01 336.298 203.328 0.501961 0.501961 0.501961 epoly
1 0 0 0 579.1 393.387 545.185 401.63 572.427 413.197 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 500.622 323.578 475.035 314.165 468.691 333.67 494.073 343.556 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 494.073 343.556 468.691 333.67 475.035 314.165 500.622 323.578 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 519.942 438.505 546.895 451.158 559.152 452.608 532.327 440.121 0.662745 0.662745 0.662745 epoly
1 0 0 0 546.895 451.158 532.327 440.121 559.152 452.608 0.662745 0.662745 0.662745 epoly
1 0 0 0 652.467 427.17 634.527 430.854 623.734 429.081 641.823 425.313 0.74902 0.74902 0.74902 epoly
1 0 0 0 599.054 466.958 621.348 469.296 606.911 485.659 0.47451 0.47451 0.47451 epoly
1 0 0 0 654.771 242.221 678.107 270.053 648.088 261.934 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 756.392 340.164 729.932 364.742 717.738 349.826 743.709 325.306 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 519.942 438.508 516.566 403.443 503.848 401.223 507.153 436.839 0.478431 0.478431 0.478431 epoly
1 0 0 0 758.943 438.941 777.022 413.743 750.159 437.298 0.694118 0.694118 0.694118 epoly
1 0 0 0 516.565 403.442 507.152 436.839 503.847 401.223 0.478431 0.478431 0.478431 epoly
1 0 0 0 630.711 277.379 617.282 317.113 612.944 283.061 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 621.35 469.296 639.054 466.134 632.802 501.468 614.72 504.24 0.286275 0.286275 0.286275 epoly
1 0 0 0 487.785 405.267 474.563 403.071 487.546 363.463 500.606 366.302 0.486275 0.486275 0.486275 epoly
1 0 0 0 538.745 420.908 532.327 440.121 546.895 451.158 553.609 431.159 0.172549 0.172549 0.172549 epoly
1 0 0 0 729.932 364.742 720.561 361.864 708.278 346.739 717.738 349.826 0.533333 0.533333 0.533333 epoly
1 0 0 0 682.459 500.62 672.435 499.974 691.193 497.161 701.048 497.861 0.745098 0.745098 0.745098 epoly
1 0 0 0 735.004 532.067 703.87 517.632 694.237 517.263 725.639 531.926 0.658824 0.658824 0.658824 epoly
1 0 0 0 725.639 531.926 694.237 517.263 703.87 517.632 735.004 532.067 0.658824 0.658824 0.658824 epoly
1 0 0 0 671.227 290.178 641.429 281.578 634.792 301.155 664.37 310.232 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 665.979 387.937 684.651 383.611 694.611 386.142 676.106 390.366 0.74902 0.74902 0.74902 epoly
1 0 0 0 637.459 257.407 644.232 237.366 654.771 242.221 648.088 261.934 0.486275 0.486275 0.486275 epoly
1 0 0 0 617.283 317.114 642.109 291.723 652.768 295.74 628.178 320.667 0.694118 0.694118 0.694118 epoly
1 0 0 0 628.178 320.667 652.768 295.74 642.109 291.723 617.283 317.114 0.694118 0.694118 0.694118 epoly
1 0 0 0 751.386 382.581 716.249 403.904 742.408 380.007 0.694118 0.694118 0.694118 epoly
1 0 0 0 417.011 317.32 423.313 297.642 461.63 310.497 455.206 330.323 0.227451 0.227451 0.227451 epoly
1 0 0 0 757.786 493.667 748.912 492.903 735.006 532.068 744.071 532.203 0.478431 0.478431 0.478431 epoly
1 0 0 0 599.055 466.961 564.499 473.302 588.182 450.623 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 785.504 415.79 758.943 438.941 750.159 437.298 777.022 413.743 0.694118 0.694118 0.694118 epoly
1 0 0 0 792.143 318.513 805.535 333.449 786.448 361.306 773.682 346.512 0.290196 0.290196 0.290196 epoly
1 0 0 0 571.171 323.848 606.03 313.441 577.723 304.234 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 461.63 310.497 500.622 323.578 475.035 314.165 0.662745 0.662745 0.662745 epoly
1 0 0 0 608.688 249.666 637.459 257.407 626.479 252.731 597.517 244.981 0.8 0.8 0.8 epoly
1 0 0 0 762.918 453.465 737.695 421.499 743.248 456.853 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 756.392 340.166 731.318 310.789 736.809 345.06 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 720.562 361.862 694.611 386.142 682.807 370.965 708.279 346.738 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 691.191 497.16 695.906 462.132 701.046 497.86 0.470588 0.470588 0.470588 epoly
1 0 0 0 746.299 408.769 764.054 397.983 751.384 382.582 733.827 393.235 0.231373 0.231373 0.231373 epoly
1 0 0 0 446.037 185.121 448.74 218.244 461.589 178.124 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 474.562 403.07 460.904 400.802 442.424 369.769 456.066 372.478 0.537255 0.537255 0.537255 epoly
1 0 0 0 728.524 419.57 716.249 403.904 751.386 382.581 764.056 397.982 0.231373 0.231373 0.231373 epoly
1 0 0 0 564.57 408.404 560.345 411.089 584.122 415.238 0.662745 0.662745 0.662745 epoly
1 0 0 0 379.288 174.658 373.115 194.38 342.596 183.01 348.916 162.62 0.501961 0.501961 0.501961 epoly
1 0 0 0 597.115 506.937 610.38 468.143 614.72 504.238 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 520.344 397.072 532.966 399.388 516.565 403.442 503.847 401.223 0.756863 0.756863 0.756863 epoly
1 0 0 0 714.739 458.85 720.135 495.027 701.046 497.86 695.906 462.132 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 709.445 423.38 714.737 458.853 728.525 419.568 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 610.716 271.062 590.895 264.801 597.516 244.981 617.401 251.167 0.235294 0.235294 0.235294 epoly
1 0 0 0 455.206 330.323 448.804 350.081 429.685 343.476 436.025 323.793 0.227451 0.227451 0.227451 epoly
1 0 0 0 565.778 432.937 538.745 420.908 553.609 431.159 0.662745 0.662745 0.662745 epoly
1 0 0 0 667.558 464.127 672.435 499.976 657.228 462.883 0.470588 0.470588 0.470588 epoly
1 0 0 0 639.052 466.133 624.947 482.625 606.911 485.659 621.348 469.296 0.6 0.6 0.6 epoly
1 0 0 0 621.35 469.296 606.913 485.659 624.948 482.625 639.054 466.134 0.596078 0.596078 0.596078 epoly
1 0 0 0 725.639 531.926 735.004 532.067 710.588 498.538 701.046 497.86 0.537255 0.537255 0.537255 epoly
1 0 0 0 735.004 532.069 725.64 531.929 701.046 497.86 710.588 498.538 0.537255 0.537255 0.537255 epoly
1 0 0 0 694.611 386.142 684.651 383.611 672.771 368.218 682.807 370.965 0.533333 0.533333 0.533333 epoly
1 0 0 0 704.256 388.591 694.611 386.14 719.054 417.571 728.525 419.568 0.533333 0.533333 0.533333 epoly
1 0 0 0 487.784 405.265 507.153 436.839 503.848 401.223 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 612.59 427.249 588.182 450.623 599.552 452.054 623.737 429.08 0.694118 0.694118 0.694118 epoly
1 0 0 0 733.829 393.236 716.252 403.901 728.527 419.567 746.301 408.769 0.231373 0.231373 0.231373 epoly
1 0 0 0 608.688 249.666 597.517 244.981 633.344 232.35 644.232 237.366 0.764706 0.764706 0.764706 epoly
1 0 0 0 756.392 340.164 769.376 355.373 751.388 382.581 739.006 367.529 0.290196 0.290196 0.290196 epoly
1 0 0 0 320.792 177.021 342.596 183.01 326.919 157.124 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 786.448 361.306 813.613 336.816 799.509 376.444 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 614.955 371.734 590.707 395.751 603.948 356.567 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 757.095 417.674 762.916 453.467 737.693 421.501 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 637.186 389.744 641.823 425.315 647.8 392.15 0.470588 0.470588 0.470588 epoly
1 0 0 0 553.608 431.159 560.345 411.089 545.185 401.63 538.744 420.908 0.172549 0.172549 0.172549 epoly
1 0 0 0 577.723 304.234 606.03 313.441 584.298 284.552 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 592.322 486.709 564.499 473.3 585.615 506.389 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 579.272 260.295 551.767 252.439 572.586 280.376 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 548.832 436.577 552.549 472.212 565.779 432.938 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 429.635 277.895 423.311 297.642 461.63 310.497 468.076 290.6 0.227451 0.227451 0.227451 epoly
1 0 0 0 455.179 264.33 435.981 258.08 429.635 277.896 448.772 284.22 0.231373 0.231373 0.231373 epoly
1 0 0 0 701.046 497.862 695.905 462.134 686.064 460.861 691.191 497.162 0.470588 0.470588 0.470588 epoly
1 0 0 0 487.547 363.464 474.054 360.531 442.426 369.769 456.067 372.479 0.760784 0.760784 0.760784 epoly
1 0 0 0 584.121 415.237 590.707 395.748 579.1 393.387 572.427 413.197 0.482353 0.482353 0.482353 epoly
1 0 0 0 652.768 295.74 641.429 281.578 630.71 277.379 642.109 291.723 0.533333 0.533333 0.533333 epoly
1 0 0 0 606.123 432.751 623.737 429.082 612.59 427.251 594.84 431.004 0.74902 0.74902 0.74902 epoly
1 0 0 0 693.58 479.42 695.907 462.133 714.74 458.851 712.629 476.328 0.298039 0.298039 0.298039 epoly
1 0 0 0 699.79 421.472 694.611 386.14 681.036 425.269 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 564.499 473.302 588.182 450.623 576.438 449.144 552.549 472.212 0.694118 0.694118 0.694118 epoly
1 0 0 0 552.549 472.212 576.438 449.144 588.182 450.623 564.499 473.302 0.698039 0.698039 0.698039 epoly
1 0 0 0 639.052 466.133 621.348 469.296 599.054 466.958 617.041 463.659 0.745098 0.745098 0.745098 epoly
1 0 0 0 772.648 400.258 785.504 415.792 777.022 413.745 764.056 397.982 0.533333 0.533333 0.533333 epoly
1 0 0 0 594.84 431.004 599.054 466.962 577.558 434.658 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 657.226 462.884 667.557 464.128 681.038 425.27 670.891 423.387 0.478431 0.478431 0.478431 epoly
1 0 0 0 520.345 397.073 487.785 405.267 510.361 381.509 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 701.046 497.863 710.588 498.54 748.912 492.905 739.745 492.116 0.745098 0.745098 0.745098 epoly
1 0 0 0 599.054 466.96 564.499 473.3 592.322 486.709 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 379.288 174.658 368.122 168.572 361.739 189.043 373.115 194.38 0.466667 0.466667 0.466667 epoly
1 0 0 0 373.115 194.38 361.739 189.043 368.122 168.572 379.287 174.658 0.466667 0.466667 0.466667 epoly
1 0 0 0 630.711 277.379 637.46 257.408 597.518 244.981 590.897 264.801 0.235294 0.235294 0.235294 epoly
1 0 0 0 777.022 413.745 737.693 421.503 764.056 397.982 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 560.346 411.089 545.185 401.63 572.427 413.197 0.662745 0.662745 0.662745 epoly
1 0 0 0 588.182 450.623 612.59 427.249 577.558 434.658 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 571.169 323.848 606.03 313.439 581.72 338.53 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 764.055 397.98 737.693 421.501 750.159 437.298 777.022 413.743 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 693.58 479.42 675.9 459.549 695.907 462.133 0.470588 0.470588 0.470588 epoly
1 0 0 0 664.371 310.232 641.429 281.579 671.227 290.178 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 415.425 340.256 410.73 336.929 417.01 317.319 421.844 320.245 0.172549 0.172549 0.172549 epoly
1 0 0 0 641.823 425.315 637.186 389.744 619.334 393.944 623.734 429.083 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 487.547 363.464 462.368 353.108 448.805 350.081 474.054 360.531 0.662745 0.662745 0.662745 epoly
1 0 0 0 657.226 462.884 646.554 461.599 623.734 429.081 634.527 430.854 0.537255 0.537255 0.537255 epoly
1 0 0 0 379.286 174.658 387.499 174.578 364.348 168.736 0.8 0.8 0.8 epoly
1 0 0 0 551.648 382.285 545.185 401.63 560.346 411.089 567.108 390.946 0.172549 0.172549 0.172549 epoly
1 0 0 0 685.013 249.857 654.771 242.221 648.088 261.934 678.107 270.053 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 735.006 532.068 748.912 492.903 722.657 515.11 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 342.596 183.01 320.792 177.021 314.687 196.85 336.298 203.328 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 667.557 464.126 691.191 497.162 686.064 460.861 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 771.597 454.864 762.917 453.463 748.912 492.905 757.786 493.669 0.478431 0.478431 0.478431 epoly
1 0 0 0 606.03 313.442 571.17 323.85 595.038 298.829 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 799.509 376.442 772.648 400.258 764.056 397.982 791.227 373.739 0.694118 0.694118 0.694118 epoly
1 0 0 0 672.435 499.976 667.558 464.127 686.066 460.862 691.193 497.163 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 592.322 486.709 585.615 506.389 597.117 506.938 603.737 487.575 0.482353 0.482353 0.482353 epoly
1 0 0 0 584.298 284.552 619.639 273.04 590.897 264.801 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 579.272 260.295 572.586 280.376 584.298 284.552 590.897 264.801 0.486275 0.486275 0.486275 epoly
1 0 0 0 507.153 436.837 487.785 405.265 513.737 416.99 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 487.547 363.464 474.562 403.07 471.598 368.031 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 757.095 417.674 737.693 421.501 728.524 419.567 748.121 415.652 0.745098 0.745098 0.745098 epoly
1 0 0 0 630.187 541.045 625.724 504.82 614.72 504.238 619.147 541.053 0.47451 0.47451 0.47451 epoly
1 0 0 0 560.345 411.089 564.57 408.404 558.068 427.754 553.608 431.159 0.466667 0.466667 0.466667 epoly
1 0 0 0 553.608 431.159 558.068 427.754 564.57 408.404 560.345 411.089 0.466667 0.466667 0.466667 epoly
1 0 0 0 617.282 317.113 612.944 283.061 601.731 278.873 606.029 313.443 0.470588 0.470588 0.470588 epoly
1 0 0 0 606.029 313.443 601.731 278.873 612.944 283.061 617.282 317.113 0.470588 0.470588 0.470588 epoly
1 0 0 0 588.182 450.623 577.558 434.658 565.778 432.937 576.438 449.144 0.537255 0.537255 0.537255 epoly
1 0 0 0 441.277 326.867 417.011 317.32 455.206 330.323 0.666667 0.666667 0.666667 epoly
1 0 0 0 756.391 340.165 731.317 310.791 763.419 320.139 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 569.87 335.208 559.285 320.326 571.169 323.848 581.72 338.53 0.533333 0.533333 0.533333 epoly
1 0 0 0 526.975 377.083 500.606 366.302 494.184 385.817 520.344 397.072 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 373.115 194.38 379.287 174.658 387.499 174.578 381.052 195.129 0.172549 0.172549 0.172549 epoly
1 0 0 0 748.912 492.905 735.004 532.069 729.496 495.759 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 567.109 390.947 539.511 379.726 551.649 382.285 579.101 393.387 0.662745 0.662745 0.662745 epoly
1 0 0 0 474.563 403.071 497.308 378.887 510.361 381.509 487.785 405.267 0.701961 0.701961 0.701961 epoly
1 0 0 0 487.785 405.267 510.361 381.509 497.308 378.887 474.563 403.071 0.701961 0.701961 0.701961 epoly
1 0 0 0 579.1 393.387 551.648 382.285 567.108 390.946 0.658824 0.658824 0.658824 epoly
1 0 0 0 342.596 183.01 373.115 194.38 361.739 189.043 0.8 0.8 0.8 epoly
1 0 0 0 599.054 466.958 610.38 468.143 597.115 506.937 585.613 506.388 0.482353 0.482353 0.482353 epoly
1 0 0 0 590.707 395.751 579.1 393.389 592.517 353.556 603.948 356.567 0.482353 0.482353 0.482353 epoly
1 0 0 0 617.283 317.114 628.178 320.667 664.372 310.233 653.78 306.409 0.756863 0.756863 0.756863 epoly
1 0 0 0 728.524 419.57 755.18 395.631 764.056 397.982 737.693 421.503 0.694118 0.694118 0.694118 epoly
1 0 0 0 523.86 433.133 507.152 436.839 516.565 403.442 532.966 399.388 0.270588 0.270588 0.270588 epoly
1 0 0 0 513.737 416.99 487.785 405.265 520.344 397.072 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 583.366 294.84 571.171 323.85 595.039 298.829 0.698039 0.698039 0.698039 epoly
1 0 0 0 800.344 322.084 827.816 296.91 813.613 336.818 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 336.298 203.328 314.687 196.85 330.022 223.574 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 612.59 427.251 590.709 395.747 594.84 431.004 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 594.84 431.004 577.558 434.658 565.778 432.937 583.185 429.199 0.74902 0.74902 0.74902 epoly
1 0 0 0 370.615 148.615 393.968 153.953 385.48 154.868 0.8 0.8 0.8 epoly
1 0 0 0 687.451 536.598 725.639 531.926 694.237 517.263 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 681.387 294.209 712.465 303.206 674.623 313.934 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 681.038 425.27 670.891 423.387 677.758 403.534 687.812 405.74 0.478431 0.478431 0.478431 epoly
1 0 0 0 681.387 294.209 674.623 313.934 664.371 310.232 671.227 290.178 0.482353 0.482353 0.482353 epoly
1 0 0 0 763.419 320.139 731.317 310.791 770.473 300.041 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 617.401 251.167 637.461 257.408 630.711 277.379 610.716 271.062 0.235294 0.235294 0.235294 epoly
1 0 0 0 455.206 330.323 448.804 350.081 468.092 356.743 474.555 336.911 0.227451 0.227451 0.227451 epoly
1 0 0 0 567.109 390.947 579.101 393.387 558.133 362.874 546.08 359.996 0.537255 0.537255 0.537255 epoly
1 0 0 0 429.685 343.476 420.318 343.724 410.73 336.929 0.666667 0.666667 0.666667 epoly
1 0 0 0 603.737 487.575 610.38 468.145 599.054 466.96 592.322 486.709 0.478431 0.478431 0.478431 epoly
1 0 0 0 601.731 278.873 619.639 273.041 630.711 277.379 612.944 283.061 0.760784 0.760784 0.760784 epoly
1 0 0 0 559.285 320.328 583.364 294.839 595.038 298.829 571.17 323.85 0.698039 0.698039 0.698039 epoly
1 0 0 0 786.448 361.306 799.509 376.444 791.228 373.741 778.05 358.389 0.533333 0.533333 0.533333 epoly
1 0 0 0 597.115 506.937 619.147 541.053 614.72 504.238 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 687.451 536.6 706.29 534.296 691.193 497.161 672.435 499.974 0.403922 0.403922 0.403922 epoly
1 0 0 0 670.889 423.389 681.036 425.271 694.611 386.142 684.651 383.611 0.478431 0.478431 0.478431 epoly
1 0 0 0 584.297 284.551 606.029 313.443 601.731 278.873 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 762.915 453.464 753.948 452.016 714.737 458.851 724.094 460.152 0.745098 0.745098 0.745098 epoly
1 0 0 0 712.465 303.204 686.426 328.57 696.279 331.961 722.044 307.058 0.694118 0.694118 0.694118 epoly
1 0 0 0 461.63 310.497 423.313 297.642 447.782 306.707 0.662745 0.662745 0.662745 epoly
1 0 0 0 393.968 153.953 387.499 174.578 379.286 174.658 385.48 154.868 0.172549 0.172549 0.172549 epoly
1 0 0 0 434.796 346.955 410.731 336.929 428.337 366.971 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 692.542 573.285 687.452 536.597 711.638 571.455 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 333.201 202.782 336.298 203.328 342.597 183.01 339.366 182.878 0.172549 0.172549 0.172549 epoly
1 0 0 0 468.076 290.6 474.545 270.634 455.179 264.33 448.772 284.22 0.231373 0.231373 0.231373 epoly
1 0 0 0 368.122 168.572 379.288 174.658 348.916 162.62 0.8 0.8 0.8 epoly
1 0 0 0 667.558 464.127 657.228 462.883 675.9 459.547 686.066 460.862 0.745098 0.745098 0.745098 epoly
1 0 0 0 694.237 517.263 725.639 531.926 701.046 497.86 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 694.611 386.142 719.053 417.571 687.812 405.74 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 510.361 381.509 500.606 366.302 487.546 363.463 497.308 378.887 0.537255 0.537255 0.537255 epoly
1 0 0 0 786.448 361.306 805.535 333.449 778.05 358.389 0.694118 0.694118 0.694118 epoly
1 0 0 0 423.313 297.642 447.782 306.707 441.277 326.867 417.011 317.32 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 417.011 317.32 441.277 326.867 447.782 306.707 423.313 297.642 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 652.467 427.17 657.226 462.884 670.891 423.387 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 361.739 189.043 373.115 194.38 381.052 195.129 0.8 0.8 0.8 epoly
1 0 0 0 630.71 277.379 641.429 281.579 664.371 310.232 653.778 306.408 0.533333 0.533333 0.533333 epoly
1 0 0 0 552.549 472.212 564.499 473.302 599.055 466.961 587.352 465.736 0.74902 0.74902 0.74902 epoly
1 0 0 0 560.345 411.089 553.608 431.159 577.559 434.659 584.122 415.238 0.482353 0.482353 0.482353 epoly
1 0 0 0 755.18 395.631 764.056 397.982 751.386 382.581 742.408 380.007 0.533333 0.533333 0.533333 epoly
1 0 0 0 677.758 403.534 684.651 383.611 694.611 386.142 687.812 405.74 0.482353 0.482353 0.482353 epoly
1 0 0 0 709.445 423.38 728.525 419.568 719.054 417.571 699.79 421.472 0.745098 0.745098 0.745098 epoly
1 0 0 0 753.948 452.016 721.618 439.244 730.882 440.86 762.916 453.464 0.658824 0.658824 0.658824 epoly
1 0 0 0 762.915 453.464 730.882 440.86 721.618 439.244 753.948 452.016 0.658824 0.658824 0.658824 epoly
1 0 0 0 748.912 492.905 762.917 453.463 736.36 476.34 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 729.932 364.742 756.392 340.164 742.41 380.007 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 336.298 203.328 330.022 223.574 345.676 228.677 351.878 208.767 0.501961 0.501961 0.501961 epoly
1 0 0 0 785.504 415.79 777.022 413.743 762.918 453.465 771.597 454.866 0.478431 0.478431 0.478431 epoly
1 0 0 0 626.222 387.258 590.707 395.751 614.955 371.734 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 813.613 336.816 786.448 361.306 778.05 358.389 805.535 333.449 0.694118 0.694118 0.694118 epoly
1 0 0 0 417.01 317.319 426.881 323.294 436.025 323.793 0.666667 0.666667 0.666667 epoly
1 0 0 0 714.739 458.85 695.906 462.132 691.191 497.16 710.462 494.27 0.309804 0.309804 0.309804 epoly
1 0 0 0 415.425 340.256 381.239 330.194 410.73 336.929 0.666667 0.666667 0.666667 epoly
1 0 0 0 590.896 264.801 619.638 273.04 612.821 293.277 584.298 284.552 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 520.344 397.072 500.606 366.302 526.975 377.083 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 630.71 277.379 660.73 286.014 671.227 290.178 641.429 281.579 0.8 0.8 0.8 epoly
1 0 0 0 687.451 536.598 725.641 531.925 699.404 553.824 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 728.524 419.57 755.18 395.631 742.408 380.007 716.249 403.904 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 686.426 328.57 712.465 303.204 674.621 313.933 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 751.388 382.581 769.376 355.373 742.41 380.007 0.694118 0.694118 0.694118 epoly
1 0 0 0 474.563 403.069 487.785 405.265 507.153 436.837 493.939 435.114 0.537255 0.537255 0.537255 epoly
1 0 0 0 381.239 330.194 387.674 309.922 417.01 317.319 410.73 336.929 0.494118 0.494118 0.494118 epoly
1 0 0 0 584.298 284.552 572.586 280.376 583.366 294.84 595.039 298.829 0.533333 0.533333 0.533333 epoly
1 0 0 0 639.049 466.13 632.801 501.468 628.224 464.915 0.470588 0.470588 0.470588 epoly
1 0 0 0 623.734 429.081 637.186 389.742 641.823 425.313 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 691.193 497.161 706.29 534.296 701.048 497.861 0.470588 0.470588 0.470588 epoly
1 0 0 0 753.948 452.016 762.916 453.464 737.693 421.501 728.524 419.567 0.533333 0.533333 0.533333 epoly
1 0 0 0 762.916 453.467 753.948 452.019 728.524 419.567 737.693 421.501 0.533333 0.533333 0.533333 epoly
1 0 0 0 536.55 434.882 540.205 471.087 519.942 438.505 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 722.044 307.06 731.317 310.791 756.391 340.165 747.314 336.834 0.533333 0.533333 0.533333 epoly
1 0 0 0 729.932 364.742 756.392 340.164 720.561 361.864 0.694118 0.694118 0.694118 epoly
1 0 0 0 442.426 369.769 474.054 360.531 448.805 350.081 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 681.038 425.27 712.051 437.575 670.891 423.387 0.658824 0.658824 0.658824 epoly
1 0 0 0 434.796 346.955 428.337 366.971 442.425 369.769 448.804 350.081 0.490196 0.490196 0.490196 epoly
1 0 0 0 687.452 536.597 692.542 573.285 682.484 573.825 677.41 536.532 0.470588 0.470588 0.470588 epoly
1 0 0 0 630.71 277.379 617.283 317.114 642.109 291.723 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 487.785 405.265 513.737 416.99 500.608 414.933 474.563 403.069 0.666667 0.666667 0.666667 epoly
1 0 0 0 474.563 403.069 500.608 414.933 513.737 416.99 487.785 405.265 0.666667 0.666667 0.666667 epoly
1 0 0 0 785.084 338.487 791.226 373.743 765.176 343.389 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 387.499 174.578 379.287 174.658 368.122 168.572 0.8 0.8 0.8 epoly
1 0 0 0 603.352 503.638 585.613 506.388 597.115 506.937 614.72 504.238 0.745098 0.745098 0.745098 epoly
1 0 0 0 429.685 343.476 426.881 323.294 436.025 323.793 0.466667 0.466667 0.466667 epoly
1 0 0 0 712.051 437.575 681.038 425.27 687.812 405.74 719.053 417.571 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 474.562 403.07 471.598 368.031 458.027 365.212 460.904 400.802 0.482353 0.482353 0.482353 epoly
1 0 0 0 460.904 400.802 458.027 365.212 471.598 368.031 474.562 403.07 0.486275 0.486275 0.486275 epoly
1 0 0 0 619.393 407.29 590.708 395.749 612.589 427.251 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 731.317 310.791 763.419 320.139 754.444 316.468 722.044 307.06 0.8 0.8 0.8 epoly
1 0 0 0 722.044 307.06 754.444 316.468 763.419 320.139 731.317 310.791 0.8 0.8 0.8 epoly
1 0 0 0 606.029 313.441 584.297 284.552 612.821 293.277 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 494.073 343.556 500.622 323.578 461.63 310.497 455.206 330.323 0.231373 0.231373 0.231373 epoly
1 0 0 0 599.054 466.962 587.351 465.737 565.778 432.937 577.558 434.658 0.537255 0.537255 0.537255 epoly
1 0 0 0 756.392 340.164 743.709 325.306 708.278 346.739 720.561 361.864 0.231373 0.231373 0.231373 epoly
1 0 0 0 725.64 531.929 720.135 495.027 729.496 495.759 735.004 532.069 0.466667 0.466667 0.466667 epoly
1 0 0 0 735.004 532.069 729.496 495.759 720.135 495.027 725.64 531.929 0.466667 0.466667 0.466667 epoly
1 0 0 0 689.441 554.043 677.409 536.533 687.451 536.598 699.404 553.824 0.537255 0.537255 0.537255 epoly
1 0 0 0 487.785 405.265 474.563 403.069 507.302 394.679 520.344 397.072 0.756863 0.756863 0.756863 epoly
1 0 0 0 474.563 403.071 487.785 405.267 520.345 397.073 507.303 394.679 0.756863 0.756863 0.756863 epoly
1 0 0 0 646.555 461.598 657.228 462.883 639.049 466.13 628.224 464.915 0.745098 0.745098 0.745098 epoly
1 0 0 0 417.01 317.319 387.674 309.922 421.844 320.245 0.666667 0.666667 0.666667 epoly
1 0 0 0 590.707 395.751 614.955 371.734 603.571 368.938 579.1 393.389 0.694118 0.694118 0.694118 epoly
1 0 0 0 579.1 393.389 603.571 368.938 614.955 371.734 590.707 395.751 0.698039 0.698039 0.698039 epoly
1 0 0 0 667.706 265.546 637.459 257.407 648.088 261.934 678.107 270.053 0.803922 0.803922 0.803922 epoly
1 0 0 0 800.344 322.084 813.613 336.818 805.535 333.451 792.143 318.515 0.533333 0.533333 0.533333 epoly
1 0 0 0 694.611 386.142 720.562 361.862 684.651 383.611 0.694118 0.694118 0.694118 epoly
1 0 0 0 621.708 351.837 626.22 387.26 603.948 356.567 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 728.524 419.57 737.693 421.503 777.022 413.745 768.258 411.629 0.745098 0.745098 0.745098 epoly
1 0 0 0 731.317 310.791 722.044 307.06 761.599 296.028 770.473 300.041 0.752941 0.752941 0.752941 epoly
1 0 0 0 539.511 379.726 567.109 390.947 532.966 399.388 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 423.314 297.642 417.012 317.32 387.675 309.923 394.133 289.579 0.494118 0.494118 0.494118 epoly
1 0 0 0 539.511 379.726 532.966 399.388 520.344 397.072 526.975 377.083 0.482353 0.482353 0.482353 epoly
1 0 0 0 626.221 387.257 590.708 395.749 619.393 407.29 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 657.695 263.703 637.459 257.407 630.71 277.379 650.88 283.751 0.235294 0.235294 0.235294 epoly
1 0 0 0 468.09 356.743 487.547 363.464 494.073 343.556 474.554 336.911 0.231373 0.231373 0.231373 epoly
1 0 0 0 805.535 333.451 765.176 343.392 792.143 318.515 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 719.054 417.571 694.611 386.14 699.79 421.472 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 610.716 271.062 608.194 268.556 590.895 264.801 0.8 0.8 0.8 epoly
1 0 0 0 675.9 459.549 695.087 456.122 714.74 458.851 695.907 462.133 0.745098 0.745098 0.745098 epoly
1 0 0 0 792.143 318.513 765.176 343.389 778.05 358.389 805.535 333.449 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 677.758 403.534 719.053 417.571 687.812 405.74 0.658824 0.658824 0.658824 epoly
1 0 0 0 720.562 361.862 708.279 346.738 672.771 368.218 684.651 383.611 0.231373 0.231373 0.231373 epoly
1 0 0 0 552.549 472.21 565.779 432.936 569.715 469.017 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 458.027 365.212 474.055 360.531 487.547 363.464 471.598 368.031 0.764706 0.764706 0.764706 epoly
1 0 0 0 665.979 387.937 670.889 423.389 684.651 383.611 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 442.424 369.769 460.904 400.802 458.027 365.212 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 667.706 265.546 678.107 270.053 654.771 242.221 644.232 237.366 0.533333 0.533333 0.533333 epoly
1 0 0 0 594.401 309.646 606.03 313.439 571.169 323.848 559.285 320.326 0.760784 0.760784 0.760784 epoly
1 0 0 0 559.285 320.328 571.17 323.85 606.03 313.442 594.401 309.649 0.760784 0.760784 0.760784 epoly
1 0 0 0 720.135 495.027 739.745 492.116 748.912 492.905 729.496 495.759 0.741176 0.741176 0.741176 epoly
1 0 0 0 762.918 453.465 777.022 413.743 750.159 437.298 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 565.778 432.937 552.549 472.212 576.438 449.144 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 701.046 497.86 725.64 531.929 720.135 495.027 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 599.054 466.958 603.352 503.638 614.72 504.238 610.38 468.143 0.47451 0.47451 0.47451 epoly
1 0 0 0 507.195 303.529 500.623 323.578 461.628 310.496 468.075 290.6 0.231373 0.231373 0.231373 epoly
1 0 0 0 468.076 290.6 474.545 270.634 494.082 276.993 487.55 297.036 0.231373 0.231373 0.231373 epoly
1 0 0 0 799.509 376.442 791.227 373.739 777.022 413.745 785.504 415.792 0.478431 0.478431 0.478431 epoly
1 0 0 0 827.816 296.91 800.344 322.084 792.143 318.515 819.945 292.869 0.694118 0.694118 0.694118 epoly
1 0 0 0 536.55 434.882 519.942 438.505 507.152 436.837 523.861 433.13 0.752941 0.752941 0.752941 epoly
1 0 0 0 539.511 379.726 567.109 390.947 546.08 359.996 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 619.393 407.29 612.589 427.251 623.736 429.082 630.449 409.447 0.482353 0.482353 0.482353 epoly
1 0 0 0 719.052 417.57 681.037 425.27 712.05 437.574 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 604.161 225.092 633.344 232.35 626.479 252.731 597.517 244.981 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 546.895 451.158 519.942 438.505 540.205 471.085 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 756.392 340.164 729.932 364.742 742.41 380.007 769.376 355.373 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 785.084 338.487 765.176 343.389 756.391 340.165 776.51 335.137 0.74902 0.74902 0.74902 epoly
1 0 0 0 632.802 501.468 639.054 466.134 624.948 482.625 0.47451 0.47451 0.47451 epoly
1 0 0 0 487.546 363.463 500.606 366.302 520.344 397.072 507.302 394.679 0.537255 0.537255 0.537255 epoly
1 0 0 0 657.226 462.884 652.467 427.17 641.823 425.313 646.554 461.599 0.470588 0.470588 0.470588 epoly
1 0 0 0 420.318 343.724 426.881 323.294 417.01 317.319 410.73 336.929 0.172549 0.172549 0.172549 epoly
1 0 0 0 423.314 297.642 413.714 296.155 407.191 316.579 417.012 317.32 0.466667 0.466667 0.466667 epoly
1 0 0 0 417.012 317.32 407.191 316.579 413.714 296.155 423.313 297.642 0.466667 0.466667 0.466667 epoly
1 0 0 0 614.955 371.734 603.948 356.567 592.517 353.556 603.571 368.938 0.533333 0.533333 0.533333 epoly
1 0 0 0 777.022 413.745 762.916 453.467 757.095 417.674 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 630.71 277.379 637.46 257.407 678.108 270.053 671.227 290.178 0.235294 0.235294 0.235294 epoly
1 0 0 0 727.094 475.289 739.745 492.116 748.912 492.905 736.36 476.34 0.537255 0.537255 0.537255 epoly
1 0 0 0 729.932 364.742 742.41 380.007 733.134 377.347 720.561 361.864 0.533333 0.533333 0.533333 epoly
1 0 0 0 626.221 387.255 637.186 389.742 623.734 429.081 612.588 427.25 0.482353 0.482353 0.482353 epoly
1 0 0 0 606.029 313.443 617.282 317.113 630.711 277.379 619.639 273.041 0.486275 0.486275 0.486275 epoly
1 0 0 0 597.516 244.981 615.129 247.898 617.401 251.167 0.8 0.8 0.8 epoly
1 0 0 0 755.18 395.631 728.524 419.57 764.056 397.982 0.694118 0.694118 0.694118 epoly
1 0 0 0 756.391 340.168 783.671 314.828 792.143 318.515 765.176 343.392 0.694118 0.694118 0.694118 epoly
1 0 0 0 448.804 350.081 474.054 360.531 467.467 380.701 442.425 369.769 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 441.277 326.867 455.206 330.323 461.63 310.497 447.782 306.707 0.490196 0.490196 0.490196 epoly
1 0 0 0 370.615 148.615 387.499 174.578 364.348 168.736 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 487.546 363.463 514.02 374.352 526.975 377.083 500.606 366.302 0.662745 0.662745 0.662745 epoly
1 0 0 0 727.094 475.289 701.046 497.863 739.745 492.116 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 733.134 377.347 694.61 386.144 720.561 361.864 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 621.708 351.837 603.948 356.567 592.517 353.555 610.415 348.706 0.752941 0.752941 0.752941 epoly
1 0 0 0 714.737 458.851 753.948 452.016 721.618 439.244 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 672.435 499.976 691.193 497.163 675.9 459.547 657.228 462.883 0.392157 0.392157 0.392157 epoly
1 0 0 0 348.917 162.62 355.261 142.157 370.615 148.615 364.348 168.736 0.505882 0.505882 0.505882 epoly
1 0 0 0 426.883 323.295 417.011 317.32 441.277 326.867 0.666667 0.666667 0.666667 epoly
1 0 0 0 572.585 280.376 584.297 284.552 606.029 313.441 594.4 309.648 0.533333 0.533333 0.533333 epoly
1 0 0 0 630.449 409.447 637.186 389.744 626.221 387.257 619.393 407.29 0.482353 0.482353 0.482353 epoly
1 0 0 0 624.947 482.625 639.052 466.133 617.041 463.659 0.47451 0.47451 0.47451 epoly
1 0 0 0 691.189 497.161 675.899 459.549 693.578 479.419 0.470588 0.470588 0.470588 epoly
1 0 0 0 487.546 363.463 474.563 403.071 497.308 378.887 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 648.363 538.786 653.159 576.21 630.188 541.043 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 623.734 429.081 646.554 461.599 641.823 425.313 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 756.392 340.164 729.932 364.742 720.561 361.864 747.315 336.832 0.694118 0.694118 0.694118 epoly
1 0 0 0 455.206 330.323 446.752 330.071 448.804 350.081 0.466667 0.466667 0.466667 epoly
1 0 0 0 520.344 397.072 523.86 433.133 532.966 399.388 0.478431 0.478431 0.478431 epoly
1 0 0 0 594.84 431.004 599.054 466.962 583.185 429.199 0.47451 0.47451 0.47451 epoly
1 0 0 0 417.012 317.32 423.313 297.642 433.471 302.791 426.883 323.295 0.172549 0.172549 0.172549 epoly
1 0 0 0 546.895 451.158 540.205 471.085 552.549 472.21 559.152 452.608 0.482353 0.482353 0.482353 epoly
1 0 0 0 423.313 297.642 417.011 317.32 426.883 323.295 433.471 302.791 0.172549 0.172549 0.172549 epoly
1 0 0 0 651.382 498.62 632.801 501.468 639.049 466.13 657.228 462.883 0.286275 0.286275 0.286275 epoly
1 0 0 0 435.983 258.081 429.637 277.896 400.614 269.161 407.119 248.67 0.494118 0.494118 0.494118 epoly
1 0 0 0 630.711 277.379 608.194 268.556 610.716 271.062 0.8 0.8 0.8 epoly
1 0 0 0 633.344 232.35 597.517 244.981 626.479 252.731 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 460.904 400.8 442.425 369.769 467.467 380.701 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 572.585 280.376 601.285 289.139 612.821 293.277 584.297 284.552 0.8 0.8 0.8 epoly
1 0 0 0 387.675 309.923 417.012 317.32 407.191 316.579 0.670588 0.670588 0.670588 epoly
1 0 0 0 720.135 495.027 714.739 458.85 739.745 492.116 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 601.285 289.139 584.298 284.552 612.821 293.277 0.8 0.8 0.8 epoly
1 0 0 0 720.135 495.027 710.462 494.27 691.191 497.16 701.046 497.86 0.741176 0.741176 0.741176 epoly
1 0 0 0 721.618 439.244 753.948 452.016 728.524 419.567 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 565.778 432.937 579.102 393.385 583.185 429.199 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 687.452 536.597 677.41 536.532 701.76 571.972 711.638 571.455 0.537255 0.537255 0.537255 epoly
1 0 0 0 461.628 310.496 500.623 323.578 467.452 313.31 0.662745 0.662745 0.662745 epoly
1 0 0 0 642.109 291.723 653.78 306.409 664.372 310.233 652.768 295.74 0.533333 0.533333 0.533333 epoly
1 0 0 0 553.61 431.157 565.779 432.936 552.549 472.21 540.205 471.085 0.482353 0.482353 0.482353 epoly
1 0 0 0 579.1 393.389 590.707 395.751 626.222 387.258 614.89 384.689 0.752941 0.752941 0.752941 epoly
1 0 0 0 590.896 264.801 584.298 284.552 601.285 289.139 608.195 268.556 0.176471 0.176471 0.176471 epoly
1 0 0 0 721.618 439.244 728.524 419.567 719.052 417.57 712.05 437.574 0.478431 0.478431 0.478431 epoly
1 0 0 0 720.135 495.027 714.739 458.85 710.462 494.27 0.466667 0.466667 0.466667 epoly
1 0 0 0 420.318 343.724 429.685 343.476 436.025 323.793 426.881 323.294 0.466667 0.466667 0.466667 epoly
1 0 0 0 684.65 383.613 710.877 358.89 720.561 361.864 694.61 386.144 0.694118 0.694118 0.694118 epoly
1 0 0 0 777.022 413.745 791.227 373.739 764.056 397.982 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 650.88 283.751 671.229 290.179 678.109 270.054 657.695 263.703 0.235294 0.235294 0.235294 epoly
1 0 0 0 813.613 336.816 805.535 333.449 791.228 373.741 799.509 376.444 0.478431 0.478431 0.478431 epoly
1 0 0 0 642.109 291.723 617.283 317.114 653.78 306.409 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 447.782 306.707 423.313 297.642 433.471 302.791 0.662745 0.662745 0.662745 epoly
1 0 0 0 675.9 459.547 691.193 497.163 686.066 460.862 0.470588 0.470588 0.470588 epoly
1 0 0 0 714.737 458.851 753.949 452.015 727.094 475.289 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 523.86 433.133 520.344 397.072 503.847 401.223 507.152 436.839 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 540.205 471.087 527.448 469.924 507.152 436.837 519.942 438.505 0.537255 0.537255 0.537255 epoly
1 0 0 0 565.778 432.937 553.609 431.159 546.895 451.158 559.152 452.608 0.482353 0.482353 0.482353 epoly
1 0 0 0 435.983 258.081 426.829 255.086 420.26 275.658 429.637 277.896 0.466667 0.466667 0.466667 epoly
1 0 0 0 617.401 251.167 615.129 247.898 637.461 257.408 0.803922 0.803922 0.803922 epoly
1 0 0 0 413.714 296.155 423.314 297.642 394.133 289.579 0.666667 0.666667 0.666667 epoly
1 0 0 0 494.081 276.993 513.791 283.409 507.195 303.529 487.549 297.036 0.231373 0.231373 0.231373 epoly
1 0 0 0 619.638 273.04 590.896 264.801 608.195 268.556 0.8 0.8 0.8 epoly
1 0 0 0 791.226 373.743 782.667 370.949 756.391 340.165 765.176 343.389 0.533333 0.533333 0.533333 epoly
1 0 0 0 715.962 531.78 725.641 531.925 687.451 536.598 677.409 536.533 0.741176 0.741176 0.741176 epoly
1 0 0 0 712.465 303.206 702.565 299.223 664.371 310.232 674.623 313.934 0.752941 0.752941 0.752941 epoly
1 0 0 0 712.628 476.327 710.46 494.271 691.189 497.161 693.578 479.419 0.305882 0.305882 0.305882 epoly
1 0 0 0 474.044 293 468.075 290.6 461.628 310.496 467.452 313.31 0.172549 0.172549 0.172549 epoly
1 0 0 0 714.739 458.85 720.135 495.027 710.462 494.27 705.074 457.506 0.466667 0.466667 0.466667 epoly
1 0 0 0 407.191 316.579 417.012 317.32 426.883 323.295 0.666667 0.666667 0.666667 epoly
1 0 0 0 648.363 538.786 630.188 541.043 619.147 541.051 637.474 538.756 0.741176 0.741176 0.741176 epoly
1 0 0 0 474.044 293 507.195 303.529 468.075 290.6 0.662745 0.662745 0.662745 epoly
1 0 0 0 630.825 423.394 612.588 427.25 623.734 429.081 641.823 425.313 0.74902 0.74902 0.74902 epoly
1 0 0 0 660.73 286.014 630.71 277.379 671.227 290.178 0.8 0.8 0.8 epoly
1 0 0 0 608.194 268.556 615.129 247.898 597.516 244.981 590.895 264.801 0.176471 0.176471 0.176471 epoly
1 0 0 0 603.352 503.638 599.054 466.958 614.72 504.238 0.47451 0.47451 0.47451 epoly
1 0 0 0 637.459 257.407 667.706 265.546 644.232 237.366 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 446.752 330.071 426.881 323.294 429.685 343.476 448.804 350.081 0.756863 0.756863 0.756863 epoly
1 0 0 0 599.054 466.962 594.84 431.004 612.59 427.251 617.04 463.663 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 393.968 153.953 370.615 148.615 364.348 168.736 387.499 174.578 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 601.731 278.873 606.029 313.443 619.639 273.041 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 576.438 449.144 587.352 465.736 599.055 466.961 588.182 450.623 0.537255 0.537255 0.537255 epoly
1 0 0 0 626.22 387.26 614.888 384.69 592.517 353.555 603.948 356.567 0.533333 0.533333 0.533333 epoly
1 0 0 0 460.904 400.802 474.562 403.07 487.547 363.464 474.055 360.531 0.486275 0.486275 0.486275 epoly
1 0 0 0 762.916 453.467 757.095 417.674 748.121 415.652 753.948 452.019 0.466667 0.466667 0.466667 epoly
1 0 0 0 753.948 452.019 748.121 415.652 757.095 417.674 762.916 453.467 0.466667 0.466667 0.466667 epoly
1 0 0 0 717.52 474.202 705.072 457.507 714.737 458.851 727.094 475.289 0.537255 0.537255 0.537255 epoly
1 0 0 0 637.459 257.407 644.232 237.366 633.344 232.35 626.479 252.731 0.486275 0.486275 0.486275 epoly
1 0 0 0 709.264 415.507 677.758 403.534 687.812 405.74 719.053 417.571 0.658824 0.658824 0.658824 epoly
1 0 0 0 699.404 553.824 725.641 531.925 711.638 571.455 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 712.465 303.206 681.387 294.209 671.227 290.178 702.565 299.223 0.8 0.8 0.8 epoly
1 0 0 0 646.555 461.598 641.825 425.312 657.228 462.883 0.470588 0.470588 0.470588 epoly
1 0 0 0 714.74 458.851 695.087 456.122 712.629 476.328 0.466667 0.466667 0.466667 epoly
1 0 0 0 725.64 531.929 735.004 532.069 748.912 492.905 739.745 492.116 0.478431 0.478431 0.478431 epoly
1 0 0 0 576.438 449.144 552.549 472.212 587.352 465.736 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 756.391 340.168 765.176 343.392 805.535 333.451 797.185 329.97 0.74902 0.74902 0.74902 epoly
1 0 0 0 606.913 485.659 614.72 504.24 632.802 501.468 624.948 482.625 0.376471 0.376471 0.376471 epoly
1 0 0 0 400.614 269.161 429.637 277.896 420.26 275.658 0.666667 0.666667 0.666667 epoly
1 0 0 0 446.752 330.071 455.206 330.323 436.025 323.793 426.881 323.294 0.666667 0.666667 0.666667 epoly
1 0 0 0 615.13 247.898 597.517 244.981 626.479 252.731 0.803922 0.803922 0.803922 epoly
1 0 0 0 428.336 366.971 442.425 369.769 460.904 400.8 446.788 398.455 0.537255 0.537255 0.537255 epoly
1 0 0 0 599.054 466.962 594.84 431.004 583.185 429.199 587.351 465.737 0.47451 0.47451 0.47451 epoly
1 0 0 0 603.352 503.638 599.054 466.958 585.613 506.388 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 579.1 393.387 592.518 353.554 596.751 389.097 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 433.471 302.791 423.313 297.642 413.714 296.155 0.662745 0.662745 0.662745 epoly
1 0 0 0 709.264 415.507 719.053 417.571 694.611 386.142 684.651 383.611 0.533333 0.533333 0.533333 epoly
1 0 0 0 567.11 390.945 579.102 393.385 565.778 432.937 553.609 431.159 0.482353 0.482353 0.482353 epoly
1 0 0 0 594.401 309.646 569.87 335.208 581.72 338.53 606.03 313.439 0.698039 0.698039 0.698039 epoly
1 0 0 0 678.108 270.053 637.46 257.407 667.706 265.546 0.803922 0.803922 0.803922 epoly
1 0 0 0 604.161 225.092 597.517 244.981 615.13 247.898 622.09 227.165 0.176471 0.176471 0.176471 epoly
1 0 0 0 748.121 415.652 768.258 411.629 777.022 413.745 757.095 417.674 0.745098 0.745098 0.745098 epoly
1 0 0 0 791.228 373.741 805.535 333.449 778.05 358.389 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 592.517 353.556 579.1 393.389 603.571 368.938 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 428.336 366.971 453.435 378.015 467.467 380.701 442.425 369.769 0.666667 0.666667 0.666667 epoly
1 0 0 0 728.524 419.567 753.948 452.019 748.121 415.652 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 626.221 387.255 630.825 423.394 641.823 425.313 637.186 389.742 0.470588 0.470588 0.470588 epoly
1 0 0 0 453.435 378.015 442.425 369.769 467.467 380.701 0.666667 0.666667 0.666667 epoly
1 0 0 0 827.816 296.91 819.945 292.869 805.535 333.451 813.613 336.818 0.478431 0.478431 0.478431 epoly
1 0 0 0 557.489 467.823 540.205 471.085 552.549 472.21 569.715 469.017 0.74902 0.74902 0.74902 epoly
1 0 0 0 695.086 456.121 712.628 476.327 693.578 479.419 675.899 459.549 0.803922 0.803922 0.803922 epoly
1 0 0 0 675.9 459.549 693.58 479.42 712.629 476.328 695.087 456.122 0.803922 0.803922 0.803922 epoly
1 0 0 0 468.076 290.6 460.083 288.827 474.545 270.634 0.466667 0.466667 0.466667 epoly
1 0 0 0 599.054 466.958 617.041 463.659 632.803 501.467 614.72 504.238 0.372549 0.372549 0.372549 epoly
1 0 0 0 630.71 277.379 660.73 286.014 667.706 265.546 637.46 257.407 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 573.731 505.822 552.549 472.21 580.529 485.815 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 722.043 307.06 761.6 296.026 734.531 321.772 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 497.308 378.887 507.303 394.679 520.345 397.073 510.361 381.509 0.537255 0.537255 0.537255 epoly
1 0 0 0 615.129 247.898 617.401 251.167 610.716 271.062 608.194 268.556 0.466667 0.466667 0.466667 epoly
1 0 0 0 608.194 268.556 610.716 271.062 617.401 251.167 615.129 247.898 0.466667 0.466667 0.466667 epoly
1 0 0 0 448.804 350.081 442.425 369.769 453.435 378.015 460.107 357.499 0.172549 0.172549 0.172549 epoly
1 0 0 0 461.631 310.497 455.207 330.324 426.882 323.294 433.47 302.791 0.490196 0.490196 0.490196 epoly
1 0 0 0 579.1 393.387 567.108 390.946 560.346 411.089 572.427 413.197 0.482353 0.482353 0.482353 epoly
1 0 0 0 594.84 431.004 583.185 429.199 601.071 425.359 612.59 427.251 0.74902 0.74902 0.74902 epoly
1 0 0 0 557.487 467.822 565.778 432.935 569.714 469.016 0.478431 0.478431 0.478431 epoly
1 0 0 0 712.051 437.575 719.053 417.571 677.758 403.534 670.891 423.387 0.235294 0.235294 0.235294 epoly
1 0 0 0 805.535 333.451 791.226 373.743 785.084 338.487 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 426.829 255.086 435.983 258.081 407.119 248.67 0.8 0.8 0.8 epoly
1 0 0 0 755.18 395.631 768.258 411.629 777.022 413.745 764.056 397.982 0.533333 0.533333 0.533333 epoly
1 0 0 0 461.631 310.497 453.407 309.487 433.47 302.791 442.388 304.041 0.662745 0.662745 0.662745 epoly
1 0 0 0 633.344 232.35 604.161 225.092 622.09 227.165 0.803922 0.803922 0.803922 epoly
1 0 0 0 565.778 432.937 587.351 465.737 583.185 429.199 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 641.825 425.312 660.408 421.44 675.9 459.547 657.228 462.883 0.372549 0.372549 0.372549 epoly
1 0 0 0 415.425 340.256 387.674 309.923 421.844 320.245 0.427451 0.427451 0.427451 epoly
1 0 0 0 497.308 378.887 474.563 403.071 507.303 394.679 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 684.65 383.613 694.61 386.144 733.134 377.347 723.546 374.598 0.74902 0.74902 0.74902 epoly
1 0 0 0 583.185 429.197 587.351 465.735 569.714 469.016 565.778 432.935 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 755.18 395.631 728.524 419.57 768.258 411.629 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 569.87 335.208 594.401 309.646 559.285 320.326 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 601.068 425.358 608.225 391.558 612.588 427.25 0.47451 0.47451 0.47451 epoly
1 0 0 0 749.387 360.121 782.667 370.947 742.408 380.006 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 749.387 360.121 742.408 380.006 733.133 377.347 740.211 357.127 0.478431 0.478431 0.478431 epoly
1 0 0 0 461.631 310.497 442.388 304.041 440.081 282.213 460.085 288.828 0.764706 0.764706 0.764706 epoly
1 0 0 0 660.73 286.014 630.71 277.379 653.778 306.408 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 507.152 436.837 520.344 397.07 523.861 433.131 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 646.555 461.598 632.801 501.468 628.224 464.915 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 626.221 387.255 630.825 423.394 612.588 427.25 608.225 391.558 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 653.159 576.21 642.239 576.81 619.147 541.051 630.188 541.043 0.537255 0.537255 0.537255 epoly
1 0 0 0 474.054 360.531 448.804 350.081 460.107 357.499 0.662745 0.662745 0.662745 epoly
1 0 0 0 583.364 294.839 594.401 309.649 606.03 313.442 595.038 298.829 0.533333 0.533333 0.533333 epoly
1 0 0 0 567.109 390.947 554.713 388.424 520.344 397.072 532.966 399.388 0.752941 0.752941 0.752941 epoly
1 0 0 0 692.542 573.285 711.638 571.455 701.76 571.972 682.484 573.825 0.741176 0.741176 0.741176 epoly
1 0 0 0 725.046 318.118 712.464 303.206 722.043 307.06 734.531 321.772 0.533333 0.533333 0.533333 epoly
1 0 0 0 624.947 482.625 617.041 463.659 599.054 466.958 606.911 485.659 0.380392 0.380392 0.380392 epoly
1 0 0 0 553.61 431.157 557.489 467.823 569.715 469.017 565.779 432.936 0.478431 0.478431 0.478431 epoly
1 0 0 0 756.392 340.164 747.315 336.832 733.134 377.347 742.41 380.007 0.478431 0.478431 0.478431 epoly
1 0 0 0 583.364 294.839 559.285 320.328 594.401 309.649 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 592.322 486.709 621.581 500.811 585.615 506.389 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 592.322 486.709 585.615 506.389 573.731 505.822 580.529 485.815 0.482353 0.482353 0.482353 epoly
1 0 0 0 461.631 310.497 453.407 309.487 446.753 330.071 455.207 330.324 0.466667 0.466667 0.466667 epoly
1 0 0 0 783.671 314.828 756.391 340.168 770.473 300.041 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 500.608 414.933 474.563 403.069 493.939 435.114 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 381.239 330.194 415.425 340.256 421.844 320.245 387.674 309.922 0.423529 0.423529 0.423529 epoly
1 0 0 0 748.121 415.652 742.41 380.005 768.258 411.629 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 458.027 365.212 460.904 400.802 474.055 360.531 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 756.391 340.165 782.667 370.947 749.387 360.121 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 754.444 316.468 722.044 307.06 747.314 336.834 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 487.546 363.463 514.02 374.352 507.302 394.679 481.043 383.301 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 500.623 323.578 467.452 313.31 474.044 293 507.195 303.529 0.431373 0.431373 0.431373 epoly
1 0 0 0 507.195 303.529 474.044 293 467.452 313.31 500.623 323.578 0.435294 0.435294 0.435294 epoly
1 0 0 0 720.135 495.027 725.64 531.929 739.745 492.116 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 567.109 390.947 539.511 379.726 526.975 377.083 554.713 388.424 0.662745 0.662745 0.662745 epoly
1 0 0 0 592.517 353.556 606.031 313.439 610.415 348.706 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 699.404 553.824 711.638 571.455 701.76 571.972 689.441 554.043 0.537255 0.537255 0.537255 epoly
1 0 0 0 677.409 536.533 682.482 573.826 667.034 536.466 0.470588 0.470588 0.470588 epoly
1 0 0 0 714.739 458.85 705.074 457.506 730.268 491.299 739.745 492.116 0.537255 0.537255 0.537255 epoly
1 0 0 0 580.706 350.442 592.518 353.554 579.1 393.387 567.108 390.946 0.482353 0.482353 0.482353 epoly
1 0 0 0 440.081 282.213 442.388 304.041 433.47 302.791 0.466667 0.466667 0.466667 epoly
1 0 0 0 615.129 247.898 608.194 268.556 630.711 277.379 637.461 257.408 0.486275 0.486275 0.486275 epoly
1 0 0 0 740.211 357.127 747.314 336.834 756.391 340.165 749.387 360.121 0.478431 0.478431 0.478431 epoly
1 0 0 0 507.302 394.679 474.563 403.069 500.608 414.933 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 805.535 333.451 819.945 292.869 792.143 318.515 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 571.139 427.334 553.609 431.159 565.778 432.937 583.185 429.199 0.752941 0.752941 0.752941 epoly
1 0 0 0 646.555 461.598 651.382 498.62 657.228 462.883 0.470588 0.470588 0.470588 epoly
1 0 0 0 664.371 310.232 702.565 299.223 671.227 290.178 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 660.73 286.014 653.778 306.408 664.371 310.232 671.227 290.178 0.482353 0.482353 0.482353 epoly
1 0 0 0 761.599 296.028 722.044 307.06 754.444 316.468 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 742.408 380.007 782.669 370.945 755.18 395.631 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 372.058 168.401 348.917 162.62 364.348 168.736 387.499 174.578 0.8 0.8 0.8 epoly
1 0 0 0 540.206 471.085 552.549 472.21 573.731 505.822 561.447 505.237 0.537255 0.537255 0.537255 epoly
1 0 0 0 461.631 310.497 453.407 309.487 460.085 288.828 468.077 290.6 0.466667 0.466667 0.466667 epoly
1 0 0 0 603.352 503.638 614.72 504.238 632.803 501.467 621.581 500.811 0.745098 0.745098 0.745098 epoly
1 0 0 0 426.882 323.294 455.207 330.324 446.753 330.071 0.666667 0.666667 0.666667 epoly
1 0 0 0 603.352 503.638 607.738 541.061 585.613 506.388 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 725.641 531.925 699.404 553.824 689.441 554.043 715.962 531.78 0.694118 0.694118 0.694118 epoly
1 0 0 0 715.962 531.78 689.441 554.043 699.404 553.824 725.641 531.925 0.694118 0.694118 0.694118 epoly
1 0 0 0 368.122 168.572 348.916 162.62 342.596 183.01 361.739 189.043 0.227451 0.227451 0.227451 epoly
1 0 0 0 744.678 450.518 753.949 452.015 714.737 458.851 705.072 457.507 0.745098 0.745098 0.745098 epoly
1 0 0 0 461.631 310.497 481.042 317.009 466.804 336.91 446.753 330.071 0.572549 0.572549 0.572549 epoly
1 0 0 0 494.082 276.993 480.269 295.503 487.55 297.036 0.466667 0.466667 0.466667 epoly
1 0 0 0 500.608 414.933 493.939 435.114 507.153 436.837 513.737 416.99 0.482353 0.482353 0.482353 epoly
1 0 0 0 540.206 471.085 568.337 484.89 580.529 485.815 552.549 472.21 0.662745 0.662745 0.662745 epoly
1 0 0 0 742.41 380.005 748.121 415.652 738.847 413.562 733.134 377.345 0.466667 0.466667 0.466667 epoly
1 0 0 0 701.76 571.972 677.41 536.532 682.484 573.825 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 646.555 461.598 657.228 462.883 675.9 459.547 665.394 458.188 0.745098 0.745098 0.745098 epoly
1 0 0 0 677.758 403.534 709.264 415.507 684.651 383.611 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 540.205 471.087 536.55 434.882 523.861 433.13 527.448 469.924 0.478431 0.478431 0.478431 epoly
1 0 0 0 754.444 316.468 747.314 336.834 756.391 340.165 763.419 320.139 0.482353 0.482353 0.482353 epoly
1 0 0 0 372.058 168.401 387.499 174.578 370.615 148.615 355.261 142.157 0.537255 0.537255 0.537255 epoly
1 0 0 0 630.825 423.394 626.221 387.255 641.823 425.313 0.470588 0.470588 0.470588 epoly
1 0 0 0 651.382 498.62 646.555 461.598 628.224 464.915 632.801 501.468 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 507.195 303.529 480.268 295.502 487.549 297.036 0.662745 0.662745 0.662745 epoly
1 0 0 0 461.631 310.497 453.407 309.487 473.525 316.244 481.042 317.009 0.662745 0.662745 0.662745 epoly
1 0 0 0 603.571 368.938 614.89 384.689 626.222 387.258 614.955 371.734 0.533333 0.533333 0.533333 epoly
1 0 0 0 507.302 394.677 520.344 397.07 507.152 436.837 493.937 435.113 0.486275 0.486275 0.486275 epoly
1 0 0 0 609.081 444.572 617.039 463.662 599.052 466.961 591.144 448.14 0.372549 0.372549 0.372549 epoly
1 0 0 0 791.226 373.743 785.084 338.487 776.51 335.137 782.667 370.949 0.462745 0.462745 0.462745 epoly
1 0 0 0 782.667 370.949 776.51 335.137 785.084 338.487 791.226 373.743 0.466667 0.466667 0.466667 epoly
1 0 0 0 746.008 393.202 733.133 377.347 742.408 380.007 755.18 395.631 0.533333 0.533333 0.533333 epoly
1 0 0 0 660.73 286.014 671.227 290.178 678.108 270.053 667.706 265.546 0.482353 0.482353 0.482353 epoly
1 0 0 0 727.094 475.289 753.949 452.015 739.745 492.116 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 733.134 377.347 747.315 336.832 720.561 361.864 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 567.11 390.945 571.139 427.334 583.185 429.199 579.102 393.385 0.47451 0.47451 0.47451 epoly
1 0 0 0 753.948 452.019 762.916 453.467 777.022 413.745 768.258 411.629 0.478431 0.478431 0.478431 epoly
1 0 0 0 603.571 368.938 579.1 393.389 614.89 384.689 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 756.391 340.168 747.315 336.836 761.599 296.028 770.473 300.041 0.478431 0.478431 0.478431 epoly
1 0 0 0 682.482 573.826 677.409 536.533 696.423 534.19 701.759 571.973 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 461.631 310.497 468.077 290.6 480.27 295.503 473.525 316.244 0.172549 0.172549 0.172549 epoly
1 0 0 0 426.883 323.295 420.32 343.724 415.425 340.256 421.844 320.245 0.172549 0.172549 0.172549 epoly
1 0 0 0 514.02 374.352 487.546 363.463 507.302 394.679 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 453.407 309.487 461.631 310.497 433.47 302.791 0.662745 0.662745 0.662745 epoly
1 0 0 0 689.441 554.043 715.962 531.78 677.409 536.533 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 342.596 183.01 348.917 162.62 387.498 174.578 381.051 195.129 0.227451 0.227451 0.227451 epoly
1 0 0 0 621.58 500.813 617.039 463.66 628.224 464.915 632.801 501.468 0.47451 0.47451 0.47451 epoly
1 0 0 0 626.22 387.26 621.708 351.837 610.415 348.706 614.888 384.69 0.470588 0.470588 0.470588 epoly
1 0 0 0 513.737 416.99 520.344 397.072 507.302 394.679 500.608 414.933 0.482353 0.482353 0.482353 epoly
1 0 0 0 500.637 279.119 513.789 283.408 507.194 303.528 493.955 299.582 0.490196 0.490196 0.490196 epoly
1 0 0 0 630.825 423.394 626.221 387.255 612.588 427.25 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 507.152 436.837 527.448 469.924 523.861 433.13 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 599.054 466.962 617.04 463.663 601.071 425.359 583.185 429.199 0.372549 0.372549 0.372549 epoly
1 0 0 0 594.402 309.647 606.031 313.439 592.517 353.556 580.705 350.444 0.486275 0.486275 0.486275 epoly
1 0 0 0 453.407 309.487 461.631 310.497 446.753 330.071 0.466667 0.466667 0.466667 epoly
1 0 0 0 763.419 320.139 770.473 300.041 761.599 296.028 754.444 316.468 0.482353 0.482353 0.482353 epoly
1 0 0 0 776.51 335.137 797.185 329.97 805.535 333.451 785.084 338.487 0.74902 0.74902 0.74902 epoly
1 0 0 0 494.081 276.993 487.038 274.685 513.791 283.409 0.8 0.8 0.8 epoly
1 0 0 0 460.083 288.827 468.076 290.6 487.55 297.036 480.269 295.503 0.662745 0.662745 0.662745 epoly
1 0 0 0 756.391 340.165 782.667 370.949 776.51 335.137 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 603.352 503.638 585.613 506.388 573.73 505.822 591.602 503.017 0.745098 0.745098 0.745098 epoly
1 0 0 0 584.89 386.551 567.108 390.946 579.1 393.387 596.751 389.097 0.752941 0.752941 0.752941 epoly
1 0 0 0 674.708 245.004 685.013 249.857 678.108 270.053 667.706 265.546 0.482353 0.482353 0.482353 epoly
1 0 0 0 626.221 387.255 644.712 382.835 660.407 421.442 641.823 425.313 0.364706 0.364706 0.364706 epoly
1 0 0 0 601.285 289.139 572.585 280.376 594.4 309.648 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 583.185 429.197 565.778 432.935 557.487 467.822 575.252 464.469 0.282353 0.282353 0.282353 epoly
1 0 0 0 453.407 309.487 461.631 310.497 460.085 288.828 0.466667 0.466667 0.466667 epoly
1 0 0 0 599.052 466.961 575.249 464.466 591.144 448.14 0.47451 0.47451 0.47451 epoly
1 0 0 0 617.039 463.66 635.524 460.269 646.555 461.598 628.224 464.915 0.745098 0.745098 0.745098 epoly
1 0 0 0 584.888 386.55 592.517 353.553 596.75 389.096 0.47451 0.47451 0.47451 epoly
1 0 0 0 642.109 291.723 667.707 265.544 653.78 306.409 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 783.671 314.828 797.185 329.97 805.535 333.451 792.143 318.515 0.533333 0.533333 0.533333 epoly
1 0 0 0 695.086 456.121 675.899 459.549 691.189 497.161 710.46 494.271 0.388235 0.388235 0.388235 epoly
1 0 0 0 592.517 353.555 614.888 384.69 610.415 348.706 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 599.054 466.958 603.352 503.638 621.581 500.811 617.041 463.659 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 752.424 291.877 761.6 296.026 722.043 307.06 712.464 303.206 0.752941 0.752941 0.752941 epoly
1 0 0 0 460.083 288.827 480.269 295.503 494.082 276.993 474.545 270.634 0.572549 0.572549 0.572549 epoly
1 0 0 0 610.415 348.704 614.888 384.688 596.75 389.096 592.517 353.553 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 520.344 397.072 554.713 388.424 526.975 377.083 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 514.02 374.352 507.302 394.679 520.344 397.072 526.975 377.083 0.486275 0.486275 0.486275 epoly
1 0 0 0 626.221 387.255 608.225 391.558 601.068 425.358 619.454 421.41 0.301961 0.301961 0.301961 epoly
1 0 0 0 453.407 309.487 461.631 310.497 473.525 316.244 0.662745 0.662745 0.662745 epoly
1 0 0 0 783.671 314.828 756.391 340.168 797.185 329.97 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 677.409 536.533 667.034 536.466 686.224 534.083 696.423 534.19 0.741176 0.741176 0.741176 epoly
1 0 0 0 712.628 476.327 695.086 456.121 710.46 494.271 0.466667 0.466667 0.466667 epoly
1 0 0 0 591.144 448.14 583.186 429.198 601.072 425.357 609.081 444.572 0.368627 0.368627 0.368627 epoly
1 0 0 0 467.452 313.31 500.623 323.578 473.525 316.244 0.662745 0.662745 0.662745 epoly
1 0 0 0 557.489 467.823 553.61 431.157 540.205 471.085 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 641.825 425.312 646.555 461.598 665.394 458.188 660.408 421.44 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 493.817 392.205 481.043 383.301 507.302 394.679 0.662745 0.662745 0.662745 epoly
1 0 0 0 601.071 425.359 617.04 463.663 612.59 427.251 0.47451 0.47451 0.47451 epoly
1 0 0 0 361.739 189.043 381.052 195.129 387.499 174.578 368.122 168.572 0.227451 0.227451 0.227451 epoly
1 0 0 0 720.135 495.027 739.745 492.116 730.268 491.299 710.462 494.27 0.741176 0.741176 0.741176 epoly
1 0 0 0 580.706 350.442 584.89 386.551 596.751 389.097 592.518 353.554 0.47451 0.47451 0.47451 epoly
1 0 0 0 510.744 431.32 493.937 435.113 507.152 436.837 523.861 433.131 0.752941 0.752941 0.752941 epoly
1 0 0 0 487.546 363.463 481.043 383.301 493.817 392.205 500.625 371.528 0.172549 0.172549 0.172549 epoly
1 0 0 0 487.548 363.464 480.274 364.482 487.038 343.81 494.074 343.556 0.466667 0.466667 0.466667 epoly
1 0 0 0 601.285 289.139 594.4 309.648 606.029 313.441 612.821 293.277 0.486275 0.486275 0.486275 epoly
1 0 0 0 720.56 361.866 747.314 336.834 760.407 352.259 733.133 377.349 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 653.159 576.21 648.363 538.786 637.474 538.756 642.239 576.81 0.470588 0.470588 0.470588 epoly
1 0 0 0 648.361 538.785 642.238 576.809 637.472 538.756 0.470588 0.470588 0.470588 epoly
1 0 0 0 748.121 415.652 753.948 452.019 768.258 411.629 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 480.27 295.503 468.077 290.6 460.085 288.828 0.662745 0.662745 0.662745 epoly
1 0 0 0 591.144 448.14 575.249 464.466 583.186 429.198 0.47451 0.47451 0.47451 epoly
1 0 0 0 727.094 475.289 739.745 492.116 730.268 491.299 717.52 474.202 0.537255 0.537255 0.537255 epoly
1 0 0 0 705.072 457.507 710.461 494.271 695.084 456.118 0.466667 0.466667 0.466667 epoly
1 0 0 0 710.877 358.89 723.546 374.598 733.134 377.347 720.561 361.864 0.533333 0.533333 0.533333 epoly
1 0 0 0 742.41 380.005 733.134 377.345 759.195 409.441 768.258 411.629 0.533333 0.533333 0.533333 epoly
1 0 0 0 725.045 318.117 761.598 296.026 734.529 321.772 0.694118 0.694118 0.694118 epoly
1 0 0 0 487.038 274.685 494.081 276.993 487.549 297.036 480.268 295.502 0.466667 0.466667 0.466667 epoly
1 0 0 0 480.27 295.503 507.195 303.529 474.044 293 0.662745 0.662745 0.662745 epoly
1 0 0 0 756.391 340.168 783.671 314.828 774.912 311.016 747.315 336.836 0.694118 0.694118 0.694118 epoly
1 0 0 0 365.531 189.31 342.596 183.01 381.051 195.129 0.8 0.8 0.8 epoly
1 0 0 0 447.782 306.707 433.471 302.791 426.883 323.295 441.277 326.867 0.490196 0.490196 0.490196 epoly
1 0 0 0 348.917 162.62 372.058 168.401 355.261 142.157 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 710.877 358.89 684.65 383.613 723.546 374.598 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 617.039 463.66 612.589 427.249 635.524 460.269 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 514.02 374.352 487.546 363.463 500.625 371.528 0.662745 0.662745 0.662745 epoly
1 0 0 0 747.314 336.834 720.56 361.866 737.931 333.39 0.694118 0.694118 0.694118 epoly
1 0 0 0 598.74 345.469 580.705 350.444 592.517 353.556 610.415 348.706 0.756863 0.756863 0.756863 epoly
1 0 0 0 392.042 312.788 387.674 309.923 415.425 340.256 420.32 343.724 0.647059 0.647059 0.647059 epoly
1 0 0 0 607.738 541.061 595.941 541.07 573.73 505.822 585.613 506.388 0.537255 0.537255 0.537255 epoly
1 0 0 0 466.804 336.91 481.042 317.009 473.525 316.244 0.466667 0.466667 0.466667 epoly
1 0 0 0 487.548 363.464 494.074 343.556 507.458 350.775 500.626 371.528 0.172549 0.172549 0.172549 epoly
1 0 0 0 507.196 303.529 500.623 323.578 473.524 316.244 480.269 295.503 0.490196 0.490196 0.490196 epoly
1 0 0 0 500.623 323.578 507.195 303.529 480.27 295.503 473.525 316.244 0.486275 0.486275 0.486275 epoly
1 0 0 0 656.308 536.397 667.034 536.466 648.361 538.785 637.472 538.756 0.741176 0.741176 0.741176 epoly
1 0 0 0 630.825 423.394 641.823 425.313 660.407 421.442 649.569 419.431 0.74902 0.74902 0.74902 epoly
1 0 0 0 619.638 273.04 608.195 268.556 601.285 289.139 612.821 293.277 0.486275 0.486275 0.486275 epoly
1 0 0 0 619.147 541.051 642.239 576.81 637.474 538.756 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 632.803 501.467 617.041 463.659 621.581 500.811 0.47451 0.47451 0.47451 epoly
1 0 0 0 725.641 531.925 715.962 531.78 701.76 571.972 711.638 571.455 0.478431 0.478431 0.478431 epoly
1 0 0 0 507.302 394.677 510.744 431.32 523.861 433.131 520.344 397.07 0.482353 0.482353 0.482353 epoly
1 0 0 0 614.888 384.688 610.415 348.704 626.221 387.258 0.470588 0.470588 0.470588 epoly
1 0 0 0 744.678 450.518 717.52 474.202 727.094 475.289 753.949 452.015 0.694118 0.694118 0.694118 epoly
1 0 0 0 753.949 452.015 727.094 475.289 717.52 474.202 744.678 450.518 0.694118 0.694118 0.694118 epoly
1 0 0 0 782.667 370.947 773.817 368.059 733.133 377.347 742.408 380.006 0.745098 0.745098 0.745098 epoly
1 0 0 0 773.818 368.057 782.669 370.945 742.408 380.007 733.133 377.347 0.745098 0.745098 0.745098 epoly
1 0 0 0 546.895 451.158 575.252 464.469 540.205 471.085 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 546.895 451.158 540.205 471.085 527.449 469.922 534.227 449.658 0.482353 0.482353 0.482353 epoly
1 0 0 0 453.435 378.015 428.336 366.971 446.788 398.455 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 730.268 491.299 705.074 457.506 710.462 494.27 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 392.042 312.788 426.883 323.295 421.844 320.245 387.674 309.923 0.666667 0.666667 0.666667 epoly
1 0 0 0 719.052 417.57 744.677 450.519 712.05 437.574 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 675.9 459.547 660.408 421.44 665.394 458.188 0.470588 0.470588 0.470588 epoly
1 0 0 0 701.761 571.972 687.659 611.872 682.484 573.825 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 387.498 174.578 348.917 162.62 372.058 168.401 0.8 0.8 0.8 epoly
1 0 0 0 571.139 427.334 567.11 390.945 553.609 431.159 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 642.109 291.723 653.78 306.409 642.829 302.456 631.095 287.572 0.533333 0.533333 0.533333 epoly
1 0 0 0 621.581 500.811 609.977 500.133 573.731 505.822 585.615 506.389 0.745098 0.745098 0.745098 epoly
1 0 0 0 702.161 435.849 709.263 415.506 719.052 417.57 712.05 437.574 0.478431 0.478431 0.478431 epoly
1 0 0 0 783.671 314.828 770.473 300.041 761.599 296.028 774.912 311.016 0.533333 0.533333 0.533333 epoly
1 0 0 0 773.816 368.059 740.211 357.127 749.387 360.121 782.667 370.947 0.8 0.8 0.8 epoly
1 0 0 0 782.667 370.947 749.387 360.121 740.211 357.127 773.817 368.059 0.8 0.8 0.8 epoly
1 0 0 0 755.18 395.631 782.669 370.945 768.258 411.629 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 342.596 183.01 365.531 189.31 372.058 168.401 348.917 162.62 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 612.589 427.249 617.039 463.66 605.477 462.363 601.07 425.356 0.47451 0.47451 0.47451 epoly
1 0 0 0 594.402 309.647 598.74 345.469 610.415 348.706 606.031 313.439 0.470588 0.470588 0.470588 epoly
1 0 0 0 782.667 370.949 791.226 373.743 805.535 333.451 797.185 329.97 0.478431 0.478431 0.478431 epoly
1 0 0 0 642.829 302.456 606.029 313.443 631.095 287.572 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 710.461 494.271 705.072 457.507 724.604 454.062 730.267 491.301 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 660.407 421.44 675.897 459.543 657.506 438.873 0.470588 0.470588 0.470588 epoly
1 0 0 0 500.623 323.578 493.826 323.063 500.64 302.239 507.196 303.529 0.466667 0.466667 0.466667 epoly
1 0 0 0 507.196 303.529 500.64 302.239 493.826 323.063 500.623 323.578 0.466667 0.466667 0.466667 epoly
1 0 0 0 487.038 274.685 480.268 295.502 507.195 303.529 513.791 283.409 0.490196 0.490196 0.490196 epoly
1 0 0 0 717.52 474.202 744.678 450.518 705.072 457.507 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 413.714 296.155 394.133 289.579 387.675 309.923 407.191 316.579 0.227451 0.227451 0.227451 epoly
1 0 0 0 774.911 311.014 747.314 336.834 734.529 321.772 761.598 296.026 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 541.031 429.321 553.609 431.159 546.895 451.158 534.227 449.658 0.482353 0.482353 0.482353 epoly
1 0 0 0 587.351 465.735 575.252 464.469 557.487 467.822 569.714 469.016 0.74902 0.74902 0.74902 epoly
1 0 0 0 621.581 500.811 592.322 486.709 580.529 485.815 609.977 500.133 0.662745 0.662745 0.662745 epoly
1 0 0 0 646.554 461.597 660.407 421.44 665.392 458.188 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 480.274 364.482 487.548 363.464 500.626 371.528 0.662745 0.662745 0.662745 epoly
1 0 0 0 747.314 336.834 737.931 333.39 725.045 318.117 734.529 321.772 0.533333 0.533333 0.533333 epoly
1 0 0 0 557.489 467.823 561.447 505.239 540.205 471.085 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 507.194 303.528 521.197 309.037 493.955 299.582 0.662745 0.662745 0.662745 epoly
1 0 0 0 773.816 368.059 782.667 370.947 756.391 340.165 747.314 336.834 0.533333 0.533333 0.533333 epoly
1 0 0 0 621.58 500.813 632.801 501.468 646.555 461.598 635.524 460.269 0.478431 0.478431 0.478431 epoly
1 0 0 0 610.415 348.704 628.809 343.72 644.711 382.837 626.221 387.258 0.356863 0.356863 0.356863 epoly
1 0 0 0 667.707 265.544 642.109 291.723 631.095 287.572 656.953 260.884 0.694118 0.694118 0.694118 epoly
1 0 0 0 453.435 378.015 446.788 398.455 460.904 400.8 467.467 380.701 0.486275 0.486275 0.486275 epoly
1 0 0 0 630.825 423.394 619.454 421.41 601.068 425.358 612.588 427.25 0.74902 0.74902 0.74902 epoly
1 0 0 0 587.351 465.735 583.185 429.197 575.252 464.469 0.47451 0.47451 0.47451 epoly
1 0 0 0 719.482 282.925 752.424 291.879 712.466 303.206 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 682.482 573.826 701.759 571.973 686.224 534.083 667.034 536.466 0.407843 0.407843 0.407843 epoly
1 0 0 0 642.239 576.808 619.147 541.051 649.261 556.639 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 719.482 282.925 712.466 303.206 702.565 299.223 709.681 278.593 0.482353 0.482353 0.482353 epoly
1 0 0 0 695.084 456.116 675.897 459.543 660.407 421.44 679.506 417.462 0.388235 0.388235 0.388235 epoly
1 0 0 0 621.581 500.811 607.738 541.061 603.352 503.638 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 678.108 270.053 699.545 274.113 667.706 265.546 0.803922 0.803922 0.803922 epoly
1 0 0 0 610.415 348.704 592.517 353.553 584.888 386.55 603.169 382.031 0.305882 0.305882 0.305882 epoly
1 0 0 0 500.623 323.578 507.196 303.529 521.199 309.038 514.316 329.945 0.172549 0.172549 0.172549 epoly
1 0 0 0 630.825 423.394 626.221 387.255 619.454 421.41 0.470588 0.470588 0.470588 epoly
1 0 0 0 633.344 232.35 622.09 227.165 615.13 247.898 626.479 252.731 0.486275 0.486275 0.486275 epoly
1 0 0 0 701.76 571.972 715.962 531.78 689.441 554.043 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 473.524 316.244 500.623 323.578 493.826 323.063 0.662745 0.662745 0.662745 epoly
1 0 0 0 594.4 309.65 619.708 283.281 631.095 287.572 606.029 313.443 0.698039 0.698039 0.698039 epoly
1 0 0 0 433.472 302.791 426.884 323.295 387.675 309.923 394.133 289.578 0.227451 0.227451 0.227451 epoly
1 0 0 0 413.714 296.155 394.133 289.579 400.614 269.161 420.26 275.658 0.227451 0.227451 0.227451 epoly
1 0 0 0 752.424 291.877 725.046 318.118 734.531 321.772 761.6 296.026 0.694118 0.694118 0.694118 epoly
1 0 0 0 626.221 387.255 630.825 423.394 649.569 419.431 644.712 382.835 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 661.336 574.961 642.238 576.809 648.361 538.785 667.034 536.466 0.278431 0.278431 0.278431 epoly
1 0 0 0 649.261 556.639 619.148 541.051 656.308 536.397 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 507.458 350.775 494.074 343.556 487.038 343.81 0.662745 0.662745 0.662745 epoly
1 0 0 0 705.072 457.507 695.084 456.118 714.807 452.595 724.604 454.062 0.745098 0.745098 0.745098 epoly
1 0 0 0 500.637 279.119 528.105 288.053 513.789 283.408 0.8 0.8 0.8 epoly
1 0 0 0 474.054 360.531 460.107 357.499 453.435 378.015 467.467 380.701 0.486275 0.486275 0.486275 epoly
1 0 0 0 715.963 531.782 701.759 571.973 696.423 534.19 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 584.89 386.551 580.706 350.442 567.108 390.946 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 748.121 415.652 768.258 411.629 759.195 409.441 738.847 413.562 0.745098 0.745098 0.745098 epoly
1 0 0 0 716.823 257.889 726.523 262.571 719.482 282.925 709.681 278.593 0.482353 0.482353 0.482353 epoly
1 0 0 0 720.56 361.866 733.133 377.349 751.133 349.036 737.931 333.39 0.290196 0.290196 0.290196 epoly
1 0 0 0 674.708 245.004 706.79 253.046 685.013 249.857 0.803922 0.803922 0.803922 epoly
1 0 0 0 557.489 467.823 540.205 471.085 527.449 469.922 544.847 466.588 0.74902 0.74902 0.74902 epoly
1 0 0 0 632.802 501.466 626.214 538.727 621.58 500.81 0.47451 0.47451 0.47451 epoly
1 0 0 0 686.224 534.083 701.759 571.973 696.423 534.19 0.470588 0.470588 0.470588 epoly
1 0 0 0 528.105 288.053 521.197 309.037 507.194 303.528 513.789 283.408 0.172549 0.172549 0.172549 epoly
1 0 0 0 568.337 484.89 540.206 471.085 561.447 505.237 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 500.64 302.239 507.196 303.529 480.269 295.503 0.662745 0.662745 0.662745 epoly
1 0 0 0 426.829 255.086 407.119 248.67 400.614 269.161 420.26 275.658 0.227451 0.227451 0.227451 epoly
1 0 0 0 725.046 318.118 752.424 291.877 712.464 303.206 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 677.244 613.08 672.088 574.382 682.484 573.825 687.659 611.872 0.470588 0.470588 0.470588 epoly
1 0 0 0 554.712 388.424 567.108 390.946 560.346 411.089 547.859 408.91 0.482353 0.482353 0.482353 epoly
1 0 0 0 493.826 323.063 500.623 323.578 514.316 329.945 0.662745 0.662745 0.662745 epoly
1 0 0 0 776.51 335.137 782.667 370.949 797.185 329.97 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 593.516 461.018 575.249 464.466 599.052 466.961 617.039 463.662 0.74902 0.74902 0.74902 epoly
1 0 0 0 755.18 395.631 768.258 411.629 759.195 409.441 746.008 393.202 0.533333 0.533333 0.533333 epoly
1 0 0 0 733.133 377.347 738.845 413.563 723.544 374.598 0.466667 0.466667 0.466667 epoly
1 0 0 0 649.569 419.429 660.407 421.44 646.554 461.597 635.523 460.269 0.482353 0.482353 0.482353 epoly
1 0 0 0 706.79 253.046 699.545 274.113 678.108 270.053 685.013 249.857 0.176471 0.176471 0.176471 epoly
1 0 0 0 407.191 316.579 426.883 323.295 433.471 302.791 413.714 296.155 0.227451 0.227451 0.227451 epoly
1 0 0 0 640.319 497.905 651.382 498.618 632.802 501.466 621.58 500.81 0.745098 0.745098 0.745098 epoly
1 0 0 0 614.888 384.688 626.221 387.258 644.711 382.837 633.535 380.156 0.752941 0.752941 0.752941 epoly
1 0 0 0 733.133 377.347 773.817 368.059 740.211 357.127 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 598.74 345.469 594.402 309.647 610.415 348.706 0.47451 0.47451 0.47451 epoly
1 0 0 0 385.461 333.489 381.24 330.194 387.675 309.923 392.042 312.788 0.172549 0.172549 0.172549 epoly
1 0 0 0 510.744 431.32 507.302 394.677 493.937 435.113 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 617.039 463.66 621.58 500.813 635.524 460.269 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 365.531 189.31 381.051 195.129 387.498 174.578 372.058 168.401 0.501961 0.501961 0.501961 epoly
1 0 0 0 607.738 541.059 619.147 541.051 642.239 576.808 630.946 577.427 0.537255 0.537255 0.537255 epoly
1 0 0 0 387.675 309.923 426.884 323.295 392.042 312.788 0.670588 0.670588 0.670588 epoly
1 0 0 0 612.589 427.249 601.07 425.356 624.115 458.895 635.524 460.269 0.537255 0.537255 0.537255 epoly
1 0 0 0 672.088 574.382 691.547 572.506 701.761 571.972 682.484 573.825 0.741176 0.741176 0.741176 epoly
1 0 0 0 467.452 313.31 473.525 316.244 480.27 295.503 474.044 293 0.172549 0.172549 0.172549 epoly
1 0 0 0 672.088 574.382 677.244 613.08 653.159 576.208 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 660.407 421.442 644.712 382.835 649.569 419.431 0.470588 0.470588 0.470588 epoly
1 0 0 0 753.949 452.015 744.678 450.518 730.268 491.299 739.745 492.116 0.478431 0.478431 0.478431 epoly
1 0 0 0 782.669 370.945 755.18 395.631 746.008 393.202 773.818 368.057 0.694118 0.694118 0.694118 epoly
1 0 0 0 773.818 368.057 746.008 393.202 755.18 395.631 782.669 370.945 0.694118 0.694118 0.694118 epoly
1 0 0 0 573.731 505.822 609.977 500.133 580.529 485.815 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 568.337 484.89 561.447 505.237 573.731 505.822 580.529 485.815 0.482353 0.482353 0.482353 epoly
1 0 0 0 619.148 541.051 649.261 556.639 638.067 556.914 607.738 541.059 0.662745 0.662745 0.662745 epoly
1 0 0 0 607.738 541.059 638.067 556.914 649.261 556.639 619.147 541.051 0.662745 0.662745 0.662745 epoly
1 0 0 0 761.599 296.028 747.315 336.836 774.912 311.016 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 480.277 433.332 460.905 400.8 487.035 412.806 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 521.199 309.038 507.196 303.529 500.64 302.239 0.658824 0.658824 0.658824 epoly
1 0 0 0 759.195 409.441 733.134 377.345 738.847 413.562 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 593.516 461.018 609.081 444.572 591.144 448.14 575.249 464.466 0.588235 0.588235 0.588235 epoly
1 0 0 0 575.249 464.466 591.144 448.14 609.081 444.572 593.516 461.018 0.584314 0.584314 0.584314 epoly
1 0 0 0 740.211 357.127 773.816 368.059 747.314 336.834 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 607.738 541.061 603.352 503.638 591.602 503.017 595.941 541.07 0.47451 0.47451 0.47451 epoly
1 0 0 0 595.941 541.07 591.602 503.017 603.352 503.638 607.738 541.061 0.47451 0.47451 0.47451 epoly
1 0 0 0 730.268 491.299 715.961 531.784 710.462 494.27 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 598.74 345.469 594.402 309.647 580.705 350.444 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 413.714 296.155 420.26 275.658 440.083 282.213 433.471 302.791 0.227451 0.227451 0.227451 epoly
1 0 0 0 657.506 438.873 675.897 459.543 654.525 456.783 0.470588 0.470588 0.470588 epoly
1 0 0 0 619.148 541.051 607.738 541.059 645.214 536.325 656.308 536.397 0.745098 0.745098 0.745098 epoly
1 0 0 0 594.4 309.65 606.029 313.443 642.829 302.456 631.503 298.367 0.760784 0.760784 0.760784 epoly
1 0 0 0 695.084 456.116 676.826 435.085 657.506 438.873 675.897 459.543 0.803922 0.803922 0.803922 epoly
1 0 0 0 675.897 459.543 657.506 438.873 676.826 435.085 695.084 456.116 0.803922 0.803922 0.803922 epoly
1 0 0 0 398.648 292.012 394.133 289.578 387.675 309.923 392.042 312.788 0.172549 0.172549 0.172549 epoly
1 0 0 0 378.608 147.416 393.968 153.952 387.498 174.578 372.057 168.401 0.505882 0.505882 0.505882 epoly
1 0 0 0 398.648 292.012 433.472 302.791 394.133 289.578 0.666667 0.666667 0.666667 epoly
1 0 0 0 738.845 413.563 733.133 377.347 753.194 372.767 759.193 409.443 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 660.73 286.014 692.326 295.103 653.778 306.408 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 660.73 286.014 653.778 306.408 642.828 302.455 649.877 281.709 0.482353 0.482353 0.482353 epoly
1 0 0 0 594.402 309.647 612.694 304.085 628.809 343.722 610.415 348.706 0.352941 0.352941 0.352941 epoly
1 0 0 0 440.123 350.581 420.319 343.724 426.882 323.294 446.753 330.071 0.227451 0.227451 0.227451 epoly
1 0 0 0 746.008 393.202 773.818 368.057 733.133 377.347 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 561.447 505.239 548.741 504.633 527.449 469.922 540.205 471.085 0.537255 0.537255 0.537255 epoly
1 0 0 0 691.545 572.507 686.224 534.083 696.423 534.19 701.759 571.973 0.470588 0.470588 0.470588 epoly
1 0 0 0 591.602 503.017 609.977 500.134 621.581 500.811 603.352 503.638 0.745098 0.745098 0.745098 epoly
1 0 0 0 614.888 384.688 603.169 382.031 584.888 386.55 596.75 389.096 0.752941 0.752941 0.752941 epoly
1 0 0 0 546.895 451.158 562.737 463.159 534.227 449.658 0.662745 0.662745 0.662745 epoly
1 0 0 0 573.73 505.822 595.941 541.07 591.602 503.017 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 667.707 265.544 656.953 260.884 642.829 302.456 653.78 306.409 0.482353 0.482353 0.482353 epoly
1 0 0 0 500.608 414.933 528.024 427.421 493.939 435.114 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 500.608 414.933 493.939 435.114 480.277 433.332 487.035 412.806 0.482353 0.482353 0.482353 epoly
1 0 0 0 575.249 464.466 593.516 461.018 601.072 425.357 583.186 429.198 0.278431 0.278431 0.278431 epoly
1 0 0 0 609.081 444.572 593.516 461.018 617.039 463.662 0.47451 0.47451 0.47451 epoly
1 0 0 0 773.819 368.059 733.133 377.349 760.407 352.259 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 672.088 574.382 653.159 576.208 642.239 576.808 661.337 574.959 0.741176 0.741176 0.741176 epoly
1 0 0 0 654.527 456.782 635.523 460.269 646.554 461.597 665.392 458.188 0.745098 0.745098 0.745098 epoly
1 0 0 0 614.888 384.688 610.415 348.704 603.169 382.031 0.470588 0.470588 0.470588 epoly
1 0 0 0 667.706 265.546 692.326 295.103 660.73 286.014 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 710.461 494.271 730.267 491.301 714.807 452.595 695.084 456.118 0.396078 0.396078 0.396078 epoly
1 0 0 0 656.952 260.886 633.345 232.35 664.053 239.987 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 398.648 292.012 394.133 289.578 400.614 269.161 405.277 271.158 0.172549 0.172549 0.172549 epoly
1 0 0 0 610.415 348.704 614.888 384.688 633.535 380.156 628.809 343.72 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 645.214 536.327 626.214 538.727 632.802 501.466 651.382 498.618 0.282353 0.282353 0.282353 epoly
1 0 0 0 426.883 323.295 392.042 312.788 420.32 343.724 0.427451 0.427451 0.427451 epoly
1 0 0 0 575.252 464.469 562.737 463.159 527.449 469.922 540.205 471.085 0.74902 0.74902 0.74902 epoly
1 0 0 0 560.348 411.089 553.611 431.159 528.023 427.42 534.944 406.656 0.482353 0.482353 0.482353 epoly
1 0 0 0 686.224 534.083 705.954 531.632 715.963 531.782 696.423 534.19 0.741176 0.741176 0.741176 epoly
1 0 0 0 649.877 281.709 656.952 260.886 667.706 265.546 660.73 286.014 0.482353 0.482353 0.482353 epoly
1 0 0 0 735.087 448.971 702.161 435.849 712.05 437.574 744.677 450.519 0.658824 0.658824 0.658824 epoly
1 0 0 0 730.268 491.299 744.678 450.518 717.52 474.202 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 453.407 309.487 433.47 302.791 426.882 323.294 446.753 330.071 0.227451 0.227451 0.227451 epoly
1 0 0 0 747.314 336.834 774.911 311.014 737.931 333.39 0.694118 0.694118 0.694118 epoly
1 0 0 0 580.529 485.815 609.977 500.133 602.947 520.638 573.731 505.823 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 500.637 279.119 521.197 309.037 493.955 299.582 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 751.133 349.036 733.133 377.349 760.407 352.259 0.694118 0.694118 0.694118 epoly
1 0 0 0 385.461 333.489 349.732 322.998 381.24 330.194 0.670588 0.670588 0.670588 epoly
1 0 0 0 541.031 429.321 569.774 442.307 553.609 431.159 0.662745 0.662745 0.662745 epoly
1 0 0 0 733.133 377.347 723.544 374.598 743.814 369.901 753.194 372.767 0.74902 0.74902 0.74902 epoly
1 0 0 0 446.788 398.455 460.905 400.8 480.277 433.332 466.147 431.488 0.537255 0.537255 0.537255 epoly
1 0 0 0 349.732 322.998 356.329 302.019 387.675 309.923 381.24 330.194 0.494118 0.494118 0.494118 epoly
1 0 0 0 500.608 414.933 487.035 412.806 493.817 392.205 507.302 394.679 0.482353 0.482353 0.482353 epoly
1 0 0 0 774.911 311.014 761.598 296.026 725.045 318.117 737.931 333.39 0.231373 0.231373 0.231373 epoly
1 0 0 0 480.269 295.503 487.039 274.685 500.637 279.119 493.955 299.582 0.490196 0.490196 0.490196 epoly
1 0 0 0 575.252 464.469 546.895 451.158 534.227 449.658 562.737 463.159 0.662745 0.662745 0.662745 epoly
1 0 0 0 744.679 450.52 730.267 491.301 724.604 454.062 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 735.087 448.971 744.677 450.519 719.052 417.57 709.263 415.506 0.533333 0.533333 0.533333 epoly
1 0 0 0 510.744 431.32 514.257 468.721 493.937 435.113 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 723.545 374.6 751.133 349.036 760.407 352.259 733.133 377.349 0.694118 0.694118 0.694118 epoly
1 0 0 0 633.254 518.353 607.738 541.062 621.58 500.811 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 446.788 398.455 472.994 410.606 487.035 412.806 460.905 400.8 0.666667 0.666667 0.666667 epoly
1 0 0 0 649.569 419.429 654.527 456.782 665.392 458.188 660.407 421.44 0.470588 0.470588 0.470588 epoly
1 0 0 0 719.482 282.925 742.932 287.587 709.681 278.593 0.803922 0.803922 0.803922 epoly
1 0 0 0 656.308 536.397 661.336 574.961 667.034 536.466 0.470588 0.470588 0.470588 epoly
1 0 0 0 676.826 435.085 679.506 417.462 660.407 421.44 657.506 438.873 0.305882 0.305882 0.305882 epoly
1 0 0 0 660.405 421.441 654.526 456.784 649.568 419.43 0.470588 0.470588 0.470588 epoly
1 0 0 0 569.774 442.307 562.737 463.159 546.895 451.158 553.609 431.159 0.172549 0.172549 0.172549 epoly
1 0 0 0 553.611 431.159 548.803 434.83 555.794 413.983 560.348 411.089 0.466667 0.466667 0.466667 epoly
1 0 0 0 560.348 411.089 555.794 413.983 548.803 434.83 553.611 431.159 0.466667 0.466667 0.466667 epoly
1 0 0 0 601.072 425.357 593.516 461.018 609.081 444.572 0.47451 0.47451 0.47451 epoly
1 0 0 0 714.807 452.595 730.267 491.301 724.604 454.062 0.466667 0.466667 0.466667 epoly
1 0 0 0 674.708 245.004 706.79 253.046 667.706 265.546 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 595.943 541.068 573.732 505.823 602.947 520.639 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 674.708 245.004 667.706 265.546 656.952 260.886 664.053 239.987 0.482353 0.482353 0.482353 epoly
1 0 0 0 453.407 309.487 460.085 288.828 440.081 282.213 433.47 302.791 0.227451 0.227451 0.227451 epoly
1 0 0 0 705.952 531.634 700.463 493.488 710.462 494.27 715.961 531.784 0.470588 0.470588 0.470588 epoly
1 0 0 0 413.714 296.155 403.359 294.551 394.133 289.579 0.666667 0.666667 0.666667 epoly
1 0 0 0 617.039 463.66 635.524 460.269 624.115 458.895 605.477 462.363 0.745098 0.745098 0.745098 epoly
1 0 0 0 387.675 309.923 356.329 302.019 392.042 312.788 0.670588 0.670588 0.670588 epoly
1 0 0 0 598.74 345.469 610.415 348.706 628.809 343.722 617.285 340.354 0.756863 0.756863 0.756863 epoly
1 0 0 0 560.346 411.089 576.837 421.377 547.859 408.91 0.662745 0.662745 0.662745 epoly
1 0 0 0 642.829 302.456 656.953 260.884 631.095 287.572 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 677.244 613.08 687.659 611.872 701.761 571.972 691.547 572.506 0.478431 0.478431 0.478431 epoly
1 0 0 0 752.424 291.879 742.932 287.587 702.565 299.223 712.466 303.206 0.752941 0.752941 0.752941 epoly
1 0 0 0 514.02 374.352 500.625 371.528 493.817 392.205 507.302 394.679 0.486275 0.486275 0.486275 epoly
1 0 0 0 668.841 415.355 679.504 417.463 660.405 421.441 649.568 419.43 0.74902 0.74902 0.74902 epoly
1 0 0 0 675.897 459.543 695.084 456.116 674.071 453.198 654.525 456.783 0.745098 0.745098 0.745098 epoly
1 0 0 0 644.711 382.837 628.809 343.72 633.535 380.156 0.470588 0.470588 0.470588 epoly
1 0 0 0 661.336 574.961 656.308 536.397 637.472 538.756 642.238 576.809 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 433.472 302.791 398.648 292.012 392.042 312.788 426.884 323.295 0.431373 0.431373 0.431373 epoly
1 0 0 0 716.823 257.889 750.326 266.348 726.523 262.571 0.803922 0.803922 0.803922 epoly
1 0 0 0 677.244 613.08 666.47 614.33 642.239 576.808 653.159 576.208 0.537255 0.537255 0.537255 epoly
1 0 0 0 622.09 227.165 633.345 232.35 656.952 260.886 645.827 256.066 0.533333 0.533333 0.533333 epoly
1 0 0 0 553.611 431.159 560.348 411.089 576.839 421.378 569.776 442.308 0.172549 0.172549 0.172549 epoly
1 0 0 0 747.314 336.834 737.931 333.39 751.133 349.036 760.407 352.259 0.533333 0.533333 0.533333 epoly
1 0 0 0 700.463 493.488 720.467 490.455 730.268 491.299 710.462 494.27 0.745098 0.745098 0.745098 epoly
1 0 0 0 528.023 427.42 553.611 431.159 548.803 434.83 0.662745 0.662745 0.662745 epoly
1 0 0 0 752.424 291.879 719.482 282.925 709.681 278.593 742.932 287.587 0.803922 0.803922 0.803922 epoly
1 0 0 0 551.752 446.035 527.449 469.924 541.031 429.321 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 782.669 370.945 773.818 368.057 759.195 409.441 768.258 411.629 0.478431 0.478431 0.478431 epoly
1 0 0 0 686.976 259.383 692.325 295.105 667.705 265.546 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 510.744 431.32 493.937 435.113 480.276 433.331 497.178 429.448 0.752941 0.752941 0.752941 epoly
1 0 0 0 628.808 343.72 644.709 382.834 625.435 360.321 0.470588 0.470588 0.470588 epoly
1 0 0 0 400.614 269.161 410.143 273.243 420.26 275.658 0.666667 0.666667 0.666667 epoly
1 0 0 0 398.648 292.012 362.951 280.962 394.133 289.578 0.666667 0.666667 0.666667 epoly
1 0 0 0 500.608 414.933 528.024 427.421 487.035 412.806 0.662745 0.662745 0.662745 epoly
1 0 0 0 622.09 227.165 653.029 234.796 664.053 239.987 633.345 232.35 0.803922 0.803922 0.803922 epoly
1 0 0 0 554.712 388.424 583.927 400.369 567.108 390.946 0.662745 0.662745 0.662745 epoly
1 0 0 0 750.326 266.348 742.932 287.587 719.482 282.925 726.523 262.571 0.176471 0.176471 0.176471 epoly
1 0 0 0 362.951 280.962 369.597 259.826 400.614 269.161 394.133 289.578 0.498039 0.498039 0.498039 epoly
1 0 0 0 528.024 427.421 500.608 414.933 507.302 394.679 534.945 406.656 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 528.105 288.053 500.637 279.119 493.955 299.582 521.197 309.037 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 676.826 435.085 695.084 456.116 679.506 417.462 0.470588 0.470588 0.470588 epoly
1 0 0 0 614.887 384.688 628.807 343.719 633.533 380.156 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 759.195 409.441 744.677 450.522 738.847 413.562 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 453.407 309.487 446.753 330.071 466.804 336.91 473.525 316.244 0.227451 0.227451 0.227451 epoly
1 0 0 0 607.738 541.062 595.942 541.07 609.976 500.133 621.58 500.811 0.478431 0.478431 0.478431 epoly
1 0 0 0 595.941 541.07 607.738 541.061 621.581 500.811 609.977 500.134 0.478431 0.478431 0.478431 epoly
1 0 0 0 413.714 296.155 403.359 294.551 420.26 275.658 0.466667 0.466667 0.466667 epoly
1 0 0 0 624.115 458.895 601.07 425.356 605.477 462.363 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 387.498 174.578 396.433 174.491 372.057 168.401 0.8 0.8 0.8 epoly
1 0 0 0 583.927 400.369 576.837 421.377 560.346 411.089 567.108 390.946 0.172549 0.172549 0.172549 epoly
1 0 0 0 706.79 253.046 674.708 245.004 667.706 265.546 699.545 274.113 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 663.716 378.29 644.709 382.834 628.808 343.72 647.719 338.596 0.368627 0.368627 0.368627 epoly
1 0 0 0 555.794 413.983 560.348 411.089 534.944 406.656 0.662745 0.662745 0.662745 epoly
1 0 0 0 761.599 296.028 803.391 284.37 774.912 311.016 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 561.447 505.237 573.732 505.823 595.943 541.068 583.738 541.077 0.537255 0.537255 0.537255 epoly
1 0 0 0 720.466 490.457 714.807 452.595 724.604 454.062 730.267 491.301 0.466667 0.466667 0.466667 epoly
1 0 0 0 411.966 284.931 420.262 275.659 440.085 282.214 432.116 291.65 0.592157 0.592157 0.592157 epoly
1 0 0 0 593.518 461.021 601.07 425.356 605.477 462.363 0.47451 0.47451 0.47451 epoly
1 0 0 0 400.614 269.161 369.597 259.826 405.277 271.158 0.666667 0.666667 0.666667 epoly
1 0 0 0 548.803 434.83 553.611 431.159 569.776 442.308 0.662745 0.662745 0.662745 epoly
1 0 0 0 493.817 392.205 534.945 406.656 507.302 394.679 0.662745 0.662745 0.662745 epoly
1 0 0 0 691.545 572.507 701.759 571.973 715.963 531.782 705.954 531.632 0.478431 0.478431 0.478431 epoly
1 0 0 0 723.545 374.6 733.133 377.349 773.819 368.059 764.662 365.071 0.74902 0.74902 0.74902 epoly
1 0 0 0 619.455 421.408 624.115 458.895 605.477 462.363 601.07 425.356 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 594.402 309.647 598.74 345.469 617.285 340.354 612.694 304.085 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 527.449 469.922 562.737 463.159 534.227 449.658 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 407.121 248.671 400.617 269.162 369.598 259.826 376.269 238.612 0.498039 0.498039 0.498039 epoly
1 0 0 0 561.447 505.237 590.841 520.294 602.947 520.639 573.732 505.823 0.662745 0.662745 0.662745 epoly
1 0 0 0 729.718 272.557 702.564 299.225 716.822 257.888 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 590.841 520.294 573.731 505.823 602.947 520.638 0.662745 0.662745 0.662745 epoly
1 0 0 0 453.407 309.487 473.525 316.244 480.27 295.503 460.085 288.828 0.227451 0.227451 0.227451 epoly
1 0 0 0 631.094 287.574 656.952 260.886 669.191 275.68 642.828 302.458 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 686.976 259.383 667.705 265.546 656.95 260.886 676.4 254.551 0.756863 0.756863 0.756863 epoly
1 0 0 0 702.161 435.849 735.087 448.971 709.263 415.506 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 561.447 505.239 557.489 467.823 544.847 466.588 548.741 504.633 0.478431 0.478431 0.478431 epoly
1 0 0 0 738.845 413.563 759.193 409.443 743.814 369.901 723.544 374.598 0.384314 0.384314 0.384314 epoly
1 0 0 0 672.088 574.382 677.244 613.08 691.547 572.506 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 557.487 467.822 548.74 504.632 544.846 466.587 0.478431 0.478431 0.478431 epoly
1 0 0 0 674.072 453.198 654.526 456.784 660.405 421.441 679.504 417.463 0.301961 0.301961 0.301961 epoly
1 0 0 0 619.708 283.281 631.503 298.367 642.829 302.456 631.095 287.572 0.533333 0.533333 0.533333 epoly
1 0 0 0 527.449 469.924 514.258 468.722 528.023 427.42 541.031 429.321 0.482353 0.482353 0.482353 epoly
1 0 0 0 378.608 147.416 403.204 152.956 393.968 153.952 0.8 0.8 0.8 epoly
1 0 0 0 580.529 485.815 573.731 505.823 590.841 520.294 597.97 499.432 0.172549 0.172549 0.172549 epoly
1 0 0 0 765.852 307.074 752.423 291.879 761.599 296.028 774.912 311.016 0.533333 0.533333 0.533333 epoly
1 0 0 0 714.807 452.595 735.089 448.972 744.679 450.52 724.604 454.062 0.745098 0.745098 0.745098 epoly
1 0 0 0 759.195 409.441 773.818 368.057 746.008 393.202 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 645.216 536.326 607.738 541.062 633.254 518.353 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 619.708 283.281 594.4 309.65 631.503 298.367 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 656.952 260.886 631.094 287.574 645.827 256.066 0.694118 0.694118 0.694118 epoly
1 0 0 0 440.123 350.581 430.755 351.12 420.319 343.724 0.666667 0.666667 0.666667 epoly
1 0 0 0 576.839 421.378 560.348 411.089 555.794 413.983 0.662745 0.662745 0.662745 epoly
1 0 0 0 514.257 468.721 500.609 467.477 480.276 433.331 493.937 435.113 0.537255 0.537255 0.537255 epoly
1 0 0 0 403.359 294.551 410.143 273.243 400.614 269.161 394.133 289.579 0.172549 0.172549 0.172549 epoly
1 0 0 0 407.121 248.671 396.517 245.203 389.777 266.504 400.617 269.162 0.466667 0.466667 0.466667 epoly
1 0 0 0 642.239 576.808 656.31 536.395 661.337 574.959 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 562.737 463.159 575.252 464.469 557.487 467.822 544.846 466.587 0.74902 0.74902 0.74902 epoly
1 0 0 0 403.204 152.956 396.433 174.491 387.498 174.578 393.968 153.952 0.172549 0.172549 0.172549 epoly
1 0 0 0 640.319 497.905 645.214 536.327 651.382 498.618 0.470588 0.470588 0.470588 epoly
1 0 0 0 654.527 456.782 649.569 419.429 635.523 460.269 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 773.819 368.059 759.193 409.443 753.194 372.767 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 609.977 500.133 580.529 485.815 597.97 499.432 0.662745 0.662745 0.662745 epoly
1 0 0 0 466.787 268.093 487.04 274.686 480.27 295.503 460.085 288.828 0.231373 0.231373 0.231373 epoly
1 0 0 0 527.449 469.922 548.741 504.633 544.847 466.588 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 617.283 340.352 628.807 343.719 614.887 384.688 603.168 382.03 0.482353 0.482353 0.482353 epoly
1 0 0 0 692.326 295.103 681.732 290.841 642.828 302.455 653.778 306.408 0.756863 0.756863 0.756863 epoly
1 0 0 0 534.944 406.656 507.301 394.679 541.89 385.815 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 661.671 436.107 635.523 460.271 649.568 419.43 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 702.565 299.223 742.932 287.587 709.681 278.593 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 743.814 369.901 759.193 409.443 753.194 372.767 0.466667 0.466667 0.466667 epoly
1 0 0 0 638.067 556.914 607.738 541.059 630.946 577.427 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 591.602 503.017 595.941 541.07 609.977 500.134 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 493.826 323.063 487.038 343.81 466.803 336.909 473.524 316.244 0.231373 0.231373 0.231373 epoly
1 0 0 0 420.262 275.659 410.145 273.244 389.777 266.504 400.617 269.162 0.662745 0.662745 0.662745 epoly
1 0 0 0 426.882 323.294 437.629 329.799 446.753 330.071 0.666667 0.666667 0.666667 epoly
1 0 0 0 735.087 448.973 729.257 411.401 738.847 413.562 744.677 450.522 0.466667 0.466667 0.466667 epoly
1 0 0 0 440.083 282.213 423.848 301.442 433.471 302.791 0.466667 0.466667 0.466667 epoly
1 0 0 0 528.024 427.421 514.564 425.454 480.277 433.332 493.939 435.114 0.752941 0.752941 0.752941 epoly
1 0 0 0 607.738 541.062 633.254 518.353 621.708 517.969 595.942 541.07 0.694118 0.694118 0.694118 epoly
1 0 0 0 595.942 541.07 621.708 517.969 633.254 518.353 607.738 541.062 0.694118 0.694118 0.694118 epoly
1 0 0 0 692.326 295.103 660.73 286.014 649.877 281.709 681.732 290.841 0.8 0.8 0.8 epoly
1 0 0 0 681.732 290.841 649.877 281.709 660.73 286.014 692.326 295.103 0.8 0.8 0.8 epoly
1 0 0 0 640.319 497.905 645.214 536.327 621.58 500.81 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 705.952 531.634 715.961 531.784 730.268 491.299 720.467 490.455 0.478431 0.478431 0.478431 epoly
1 0 0 0 562.738 463.16 527.449 469.924 551.752 446.035 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 628.809 343.722 612.694 304.085 617.285 340.354 0.470588 0.470588 0.470588 epoly
1 0 0 0 702.564 299.225 692.326 295.105 706.789 253.045 716.822 257.888 0.482353 0.482353 0.482353 epoly
1 0 0 0 645.214 536.327 640.319 497.905 621.58 500.81 626.214 538.727 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 645.214 536.325 607.738 541.059 638.067 556.914 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 420.262 275.659 400.617 269.162 396.517 245.203 416.955 251.856 0.756863 0.756863 0.756863 epoly
1 0 0 0 369.598 259.826 400.617 269.162 389.777 266.504 0.666667 0.666667 0.666667 epoly
1 0 0 0 668.841 415.355 663.717 378.29 679.504 417.463 0.470588 0.470588 0.470588 epoly
1 0 0 0 686.224 534.083 691.545 572.507 705.954 531.632 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 528.024 427.421 500.608 414.933 487.035 412.806 514.564 425.454 0.662745 0.662745 0.662745 epoly
1 0 0 0 507.618 305.013 480.269 295.503 493.955 299.582 521.197 309.037 0.662745 0.662745 0.662745 epoly
1 0 0 0 692.325 295.105 681.731 290.843 656.95 260.886 667.705 265.546 0.533333 0.533333 0.533333 epoly
1 0 0 0 681.732 290.841 692.326 295.103 667.706 265.546 656.952 260.886 0.533333 0.533333 0.533333 epoly
1 0 0 0 625.436 360.322 644.71 382.834 621.969 377.384 0.470588 0.470588 0.470588 epoly
1 0 0 0 663.716 378.29 644.56 355.362 625.435 360.321 644.709 382.834 0.819608 0.819608 0.819608 epoly
1 0 0 0 644.71 382.834 625.436 360.322 644.562 355.363 663.717 378.29 0.819608 0.819608 0.819608 epoly
1 0 0 0 729.257 411.401 749.82 407.178 759.195 409.441 738.847 413.562 0.745098 0.745098 0.745098 epoly
1 0 0 0 403.359 294.551 413.714 296.155 420.26 275.658 410.143 273.243 0.466667 0.466667 0.466667 epoly
1 0 0 0 500.64 302.239 480.269 295.503 473.524 316.244 493.826 323.063 0.231373 0.231373 0.231373 epoly
1 0 0 0 411.966 284.931 416.955 251.853 420.262 275.659 0.466667 0.466667 0.466667 epoly
1 0 0 0 638.067 556.914 630.946 577.427 642.239 576.808 649.261 556.639 0.478431 0.478431 0.478431 epoly
1 0 0 0 554.712 388.424 576.837 421.377 547.859 408.91 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 674.071 453.198 695.084 456.116 676.826 435.085 0.470588 0.470588 0.470588 epoly
1 0 0 0 548.741 504.631 527.449 469.922 555.726 483.934 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 528.024 427.421 514.257 468.721 510.744 431.32 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 677.244 613.08 672.088 574.382 661.337 574.959 666.47 614.33 0.470588 0.470588 0.470588 epoly
1 0 0 0 507.618 305.013 521.197 309.037 500.637 279.119 487.039 274.685 0.537255 0.537255 0.537255 epoly
1 0 0 0 396.517 245.203 400.617 269.162 389.777 266.504 0.466667 0.466667 0.466667 epoly
1 0 0 0 633.254 518.353 621.58 500.811 609.976 500.133 621.708 517.969 0.537255 0.537255 0.537255 epoly
1 0 0 0 569.774 442.307 541.031 429.321 534.227 449.658 562.737 463.159 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 534.944 406.656 541.89 385.815 554.712 388.424 547.859 408.91 0.482353 0.482353 0.482353 epoly
1 0 0 0 527.449 469.924 551.752 446.035 538.769 444.4 514.258 468.722 0.698039 0.698039 0.698039 epoly
1 0 0 0 514.258 468.722 538.769 444.4 551.752 446.035 527.449 469.924 0.698039 0.698039 0.698039 epoly
1 0 0 0 480.274 364.482 500.626 371.528 507.458 350.775 487.038 343.81 0.231373 0.231373 0.231373 epoly
1 0 0 0 396.517 245.203 407.121 248.671 376.269 238.612 0.8 0.8 0.8 epoly
1 0 0 0 403.359 294.551 413.714 296.155 433.471 302.791 423.848 301.442 0.666667 0.666667 0.666667 epoly
1 0 0 0 645.216 536.324 656.31 536.395 642.239 576.808 630.946 577.427 0.478431 0.478431 0.478431 epoly
1 0 0 0 635.523 460.271 624.114 458.897 638.358 417.35 649.568 419.43 0.478431 0.478431 0.478431 epoly
1 0 0 0 706.79 253.046 696.408 248.034 656.952 260.886 667.706 265.546 0.756863 0.756863 0.756863 epoly
1 0 0 0 566.876 501.713 548.74 504.632 557.487 467.822 575.252 464.469 0.270588 0.270588 0.270588 epoly
1 0 0 0 555.726 483.934 527.449 469.922 562.737 463.159 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 507.301 394.679 534.944 406.656 521.579 404.324 493.816 392.204 0.662745 0.662745 0.662745 epoly
1 0 0 0 742.932 287.587 702.564 299.225 729.718 272.557 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 640.319 497.905 621.58 500.81 609.976 500.133 628.874 497.167 0.745098 0.745098 0.745098 epoly
1 0 0 0 621.97 377.383 603.168 382.03 614.887 384.688 633.533 380.156 0.752941 0.752941 0.752941 epoly
1 0 0 0 663.717 378.29 683.262 373.618 699.14 413.372 679.504 417.463 0.368627 0.368627 0.368627 epoly
1 0 0 0 507.435 420.08 487.034 412.805 493.816 392.204 514.286 399.397 0.231373 0.231373 0.231373 epoly
1 0 0 0 473.524 316.244 480.27 295.503 521.197 309.037 514.314 329.944 0.231373 0.231373 0.231373 epoly
1 0 0 0 619.455 421.408 601.07 425.356 593.518 461.021 612.31 457.474 0.294118 0.294118 0.294118 epoly
1 0 0 0 749.818 407.18 743.814 369.901 753.194 372.767 759.193 409.443 0.466667 0.466667 0.466667 epoly
1 0 0 0 403.359 294.551 423.848 301.442 440.083 282.213 420.26 275.658 0.596078 0.596078 0.596078 epoly
1 0 0 0 507.301 394.679 493.816 392.204 528.621 383.115 541.89 385.815 0.756863 0.756863 0.756863 epoly
1 0 0 0 649.261 556.639 656.308 536.397 645.214 536.325 638.067 556.914 0.478431 0.478431 0.478431 epoly
1 0 0 0 706.79 253.046 674.708 245.004 664.053 239.987 696.408 248.034 0.803922 0.803922 0.803922 epoly
1 0 0 0 642.239 576.808 666.47 614.33 661.337 574.959 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 631.094 287.574 642.828 302.458 658.141 271.057 645.827 256.066 0.286275 0.286275 0.286275 epoly
1 0 0 0 720.466 490.457 730.267 491.301 744.679 450.52 735.089 448.972 0.478431 0.478431 0.478431 epoly
1 0 0 0 794.681 279.899 803.391 284.37 761.599 296.028 752.423 291.879 0.752941 0.752941 0.752941 epoly
1 0 0 0 430.755 351.12 437.629 329.799 426.882 323.294 420.319 343.724 0.172549 0.172549 0.172549 epoly
1 0 0 0 472.994 410.606 446.788 398.455 466.147 431.488 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 349.732 322.998 385.461 333.489 392.042 312.788 356.329 302.019 0.423529 0.423529 0.423529 epoly
1 0 0 0 493.826 323.063 514.316 329.945 507.458 350.775 487.038 343.81 0.231373 0.231373 0.231373 epoly
1 0 0 0 551.752 446.035 541.031 429.321 528.023 427.42 538.769 444.4 0.537255 0.537255 0.537255 epoly
1 0 0 0 700.463 493.488 705.952 531.634 720.467 490.455 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 706.791 253.046 692.325 295.105 686.976 259.383 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 595.942 541.07 607.738 541.062 645.216 536.326 633.734 536.252 0.745098 0.745098 0.745098 epoly
1 0 0 0 750.326 266.348 716.823 257.889 709.681 278.593 742.932 287.587 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 743.814 369.901 764.662 365.071 773.819 368.059 753.194 372.767 0.74902 0.74902 0.74902 epoly
1 0 0 0 416.955 251.853 437.586 258.569 440.085 282.214 420.262 275.659 0.760784 0.760784 0.760784 epoly
1 0 0 0 702.564 299.225 729.718 272.557 719.785 267.908 692.326 295.105 0.694118 0.694118 0.694118 epoly
1 0 0 0 692.326 295.105 719.785 267.908 729.718 272.557 702.564 299.225 0.694118 0.694118 0.694118 epoly
1 0 0 0 528.024 427.421 534.945 406.656 493.817 392.205 487.035 412.806 0.231373 0.231373 0.231373 epoly
1 0 0 0 674.074 453.197 635.523 460.271 661.671 436.107 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 617.283 340.352 621.97 377.383 633.533 380.156 628.807 343.719 0.470588 0.470588 0.470588 epoly
1 0 0 0 644.56 355.362 647.719 338.596 628.808 343.72 625.435 360.321 0.313725 0.313725 0.313725 epoly
1 0 0 0 628.806 343.721 621.968 377.384 617.282 340.353 0.470588 0.470588 0.470588 epoly
1 0 0 0 642.828 302.455 681.732 290.841 649.877 281.709 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 562.737 463.159 541.031 429.321 569.774 442.307 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 657.506 438.873 654.525 456.783 674.071 453.198 676.826 435.085 0.298039 0.298039 0.298039 epoly
1 0 0 0 514.258 468.72 527.449 469.922 548.741 504.631 535.592 504.004 0.537255 0.537255 0.537255 epoly
1 0 0 0 433.472 302.791 423.849 301.442 430.704 280.047 440.084 282.213 0.466667 0.466667 0.466667 epoly
1 0 0 0 583.927 400.369 554.712 388.424 547.859 408.91 576.837 421.377 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 676.826 435.085 679.506 417.462 699.143 413.371 696.697 431.189 0.305882 0.305882 0.305882 epoly
1 0 0 0 668.841 415.355 674.072 453.198 679.504 417.463 0.470588 0.470588 0.470588 epoly
1 0 0 0 493.826 323.063 514.316 329.945 521.199 309.038 500.64 302.239 0.231373 0.231373 0.231373 epoly
1 0 0 0 751.133 349.036 764.662 365.071 773.819 368.059 760.407 352.259 0.533333 0.533333 0.533333 epoly
1 0 0 0 579.451 502.375 583.737 541.078 561.445 505.236 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 440.085 282.214 437.586 258.569 432.116 291.65 0.466667 0.466667 0.466667 epoly
1 0 0 0 480.277 433.332 514.564 425.454 487.035 412.806 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 472.994 410.606 466.147 431.488 480.277 433.332 487.035 412.806 0.486275 0.486275 0.486275 epoly
1 0 0 0 527.449 469.922 555.726 483.934 542.675 482.943 514.258 468.72 0.662745 0.662745 0.662745 epoly
1 0 0 0 514.258 468.72 542.675 482.943 555.726 483.934 527.449 469.922 0.666667 0.666667 0.666667 epoly
1 0 0 0 751.133 349.036 723.545 374.6 764.662 365.071 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 650.214 575.556 630.946 577.427 642.239 576.808 661.337 574.959 0.741176 0.741176 0.741176 epoly
1 0 0 0 636.356 335.092 647.717 338.597 628.806 343.721 617.282 340.353 0.756863 0.756863 0.756863 epoly
1 0 0 0 410.145 273.244 420.262 275.659 416.955 251.856 0.466667 0.466667 0.466667 epoly
1 0 0 0 644.71 382.834 663.717 378.29 641.314 372.602 621.969 377.384 0.74902 0.74902 0.74902 epoly
1 0 0 0 649.877 281.709 681.732 290.841 656.952 260.886 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 500.61 467.477 497.178 429.448 510.744 431.32 514.257 468.721 0.482353 0.482353 0.482353 epoly
1 0 0 0 514.257 468.721 510.744 431.32 497.178 429.448 500.609 467.477 0.482353 0.482353 0.482353 epoly
1 0 0 0 430.755 351.12 440.123 350.581 446.753 330.071 437.629 329.799 0.466667 0.466667 0.466667 epoly
1 0 0 0 676.826 435.085 657.807 413.177 679.506 417.462 0.470588 0.470588 0.470588 epoly
1 0 0 0 653.029 234.796 622.09 227.165 645.827 256.066 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 480.27 295.503 451.456 286.914 460.085 288.828 0.662745 0.662745 0.662745 epoly
1 0 0 0 486.767 333.377 487.039 343.811 466.804 336.91 466.119 326.383 0.768627 0.768627 0.768627 epoly
1 0 0 0 645.214 536.327 633.733 536.253 609.976 500.133 621.58 500.81 0.537255 0.537255 0.537255 epoly
1 0 0 0 527.449 469.922 514.258 468.72 549.784 461.804 562.737 463.159 0.74902 0.74902 0.74902 epoly
1 0 0 0 514.258 468.722 527.449 469.924 562.738 463.16 549.785 461.804 0.74902 0.74902 0.74902 epoly
1 0 0 0 729.718 272.557 716.822 257.888 706.789 253.045 719.785 267.908 0.533333 0.533333 0.533333 epoly
1 0 0 0 668.841 415.355 679.504 417.463 699.14 413.372 688.665 411.163 0.74902 0.74902 0.74902 epoly
1 0 0 0 635.523 460.271 661.671 436.107 650.532 434.291 624.114 458.897 0.694118 0.694118 0.694118 epoly
1 0 0 0 624.114 458.897 650.532 434.291 661.671 436.107 635.523 460.271 0.694118 0.694118 0.694118 epoly
1 0 0 0 668.841 415.355 674.072 453.198 649.568 419.43 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 735.087 448.973 744.677 450.522 759.195 409.441 749.82 407.178 0.478431 0.478431 0.478431 epoly
1 0 0 0 674.072 453.198 668.841 415.355 649.568 419.43 654.526 456.784 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 466.803 336.909 465.407 315.418 473.524 316.244 0.466667 0.466667 0.466667 epoly
1 0 0 0 582.193 443.973 612.309 457.474 575.252 464.469 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 500.641 326.29 473.524 316.244 514.314 329.944 0.662745 0.662745 0.662745 epoly
1 0 0 0 433.472 302.791 440.084 282.213 451.458 286.915 444.532 308.398 0.172549 0.172549 0.172549 epoly
1 0 0 0 582.193 443.973 575.252 464.469 562.737 463.159 569.774 442.307 0.482353 0.482353 0.482353 epoly
1 0 0 0 480.269 295.503 507.618 305.013 487.039 274.685 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 369.597 259.826 405.277 271.158 398.648 292.012 362.95 280.962 0.431373 0.431373 0.431373 epoly
1 0 0 0 362.951 280.962 398.648 292.012 405.277 271.158 369.597 259.826 0.427451 0.427451 0.427451 epoly
1 0 0 0 514.286 399.397 534.945 406.657 528.024 427.421 507.435 420.08 0.231373 0.231373 0.231373 epoly
1 0 0 0 742.931 287.587 716.822 257.888 750.325 266.348 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 595.941 541.067 609.977 500.131 614.57 538.694 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 497.178 429.448 514.564 425.454 528.024 427.421 510.744 431.32 0.752941 0.752941 0.752941 epoly
1 0 0 0 714.807 452.595 720.466 490.457 735.089 448.972 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 644.56 355.362 663.716 378.29 647.719 338.596 0.470588 0.470588 0.470588 epoly
1 0 0 0 480.276 433.331 500.609 467.477 497.178 429.448 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 609.976 500.133 595.942 541.07 621.708 517.969 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 645.216 536.324 650.214 575.556 661.337 574.959 656.31 536.395 0.47451 0.47451 0.47451 epoly
1 0 0 0 466.787 268.093 458.409 265.349 487.04 274.686 0.8 0.8 0.8 epoly
1 0 0 0 403.204 152.956 378.608 147.416 372.057 168.401 396.433 174.491 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 460.085 288.828 451.457 286.914 430.703 280.046 440.082 282.213 0.662745 0.662745 0.662745 epoly
1 0 0 0 681.733 290.841 642.827 302.457 669.19 275.679 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 579.451 502.375 561.445 505.236 548.74 504.63 566.876 501.711 0.745098 0.745098 0.745098 epoly
1 0 0 0 699.139 413.37 714.804 452.591 696.694 431.187 0.466667 0.466667 0.466667 epoly
1 0 0 0 446.754 330.071 466.805 336.91 451.49 358.317 430.756 351.12 0.580392 0.580392 0.580392 epoly
1 0 0 0 656.952 260.886 696.408 248.034 664.053 239.987 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 590.841 520.294 561.447 505.237 583.738 541.077 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 653.029 234.796 645.827 256.066 656.952 260.886 664.053 239.987 0.486275 0.486275 0.486275 epoly
1 0 0 0 528.023 427.421 541.031 429.321 562.737 463.159 549.784 461.804 0.537255 0.537255 0.537255 epoly
1 0 0 0 692.325 295.105 686.976 259.383 676.4 254.551 681.731 290.843 0.466667 0.466667 0.466667 epoly
1 0 0 0 681.731 290.843 676.4 254.551 686.976 259.383 692.325 295.105 0.466667 0.466667 0.466667 epoly
1 0 0 0 661.671 436.107 649.568 419.43 638.358 417.35 650.532 434.291 0.537255 0.537255 0.537255 epoly
1 0 0 0 460.085 288.828 440.082 282.213 437.584 258.57 458.41 265.349 0.768627 0.768627 0.768627 epoly
1 0 0 0 521.197 309.037 480.27 295.503 507.618 305.013 0.658824 0.658824 0.658824 epoly
1 0 0 0 624.115 458.895 612.31 457.474 593.518 461.021 605.477 462.363 0.74902 0.74902 0.74902 epoly
1 0 0 0 446.754 330.071 437.63 329.799 458.437 336.909 466.805 336.91 0.666667 0.666667 0.666667 epoly
1 0 0 0 692.326 295.105 702.564 299.225 742.932 287.587 733.106 283.144 0.756863 0.756863 0.756863 epoly
1 0 0 0 487.034 412.805 514.563 425.454 507.573 446.504 480.277 433.331 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 658.141 271.057 642.828 302.458 669.191 275.68 0.694118 0.694118 0.694118 epoly
1 0 0 0 473.524 316.244 500.641 326.29 507.618 305.013 480.27 295.503 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 528.023 427.421 556.919 440.583 569.774 442.307 541.031 429.321 0.662745 0.662745 0.662745 epoly
1 0 0 0 423.849 301.442 433.472 302.791 444.532 308.398 0.666667 0.666667 0.666667 epoly
1 0 0 0 668.841 415.355 649.568 419.43 638.358 417.35 657.806 413.174 0.74902 0.74902 0.74902 epoly
1 0 0 0 624.115 458.895 619.455 421.408 612.31 457.474 0.47451 0.47451 0.47451 epoly
1 0 0 0 759.709 271.009 794.679 279.9 752.423 291.879 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 759.709 271.009 752.423 291.879 742.931 287.587 750.325 266.348 0.482353 0.482353 0.482353 epoly
1 0 0 0 735.086 448.968 714.804 452.591 699.139 413.37 719.336 409.163 0.392157 0.392157 0.392157 epoly
1 0 0 0 403.361 294.552 362.95 280.962 398.648 292.012 0.666667 0.666667 0.666667 epoly
1 0 0 0 641.313 372.602 621.968 377.384 628.806 343.721 647.717 338.597 0.309804 0.309804 0.309804 epoly
1 0 0 0 657.804 413.174 663.716 378.29 668.839 415.355 0.470588 0.470588 0.470588 epoly
1 0 0 0 676.4 254.551 696.409 248.034 706.791 253.046 686.976 259.383 0.760784 0.760784 0.760784 epoly
1 0 0 0 631.501 298.368 658.139 271.057 669.19 275.679 642.827 302.457 0.694118 0.694118 0.694118 epoly
1 0 0 0 528.023 427.42 514.258 468.722 538.769 444.4 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 749.818 407.18 759.193 409.443 773.819 368.059 764.662 365.071 0.478431 0.478431 0.478431 epoly
1 0 0 0 656.95 260.886 681.731 290.843 676.4 254.551 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 794.681 279.899 765.852 307.074 774.912 311.016 803.391 284.37 0.694118 0.694118 0.694118 epoly
1 0 0 0 562.737 463.159 566.876 501.713 575.252 464.469 0.478431 0.478431 0.478431 epoly
1 0 0 0 466.804 336.91 451.487 358.317 466.119 326.383 0.466667 0.466667 0.466667 epoly
1 0 0 0 683.261 373.617 688.664 411.163 668.839 415.355 663.716 378.29 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 663.717 378.29 668.841 415.355 688.665 411.163 683.262 373.618 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 437.63 329.799 446.754 330.071 430.756 351.12 0.466667 0.466667 0.466667 epoly
1 0 0 0 437.584 258.57 440.082 282.213 430.703 280.046 0.466667 0.466667 0.466667 epoly
1 0 0 0 590.841 520.294 583.738 541.077 595.943 541.068 602.947 520.639 0.478431 0.478431 0.478431 epoly
1 0 0 0 473.526 316.244 466.805 336.91 437.63 329.799 444.531 308.397 0.490196 0.490196 0.490196 epoly
1 0 0 0 500.61 467.475 480.277 433.331 507.573 446.504 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 405.277 271.158 410.145 273.244 403.361 294.552 398.648 292.012 0.172549 0.172549 0.172549 epoly
1 0 0 0 609.976 500.133 624.116 458.893 628.874 497.167 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 564.082 419.282 534.944 406.656 547.859 408.91 576.837 421.377 0.662745 0.662745 0.662745 epoly
1 0 0 0 621.97 377.383 617.283 340.352 603.168 382.03 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 729.257 411.401 735.087 448.973 749.82 407.178 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 451.458 286.915 440.084 282.213 430.704 280.047 0.662745 0.662745 0.662745 epoly
1 0 0 0 597.971 499.43 609.977 500.131 595.941 541.067 583.737 541.076 0.478431 0.478431 0.478431 epoly
1 0 0 0 706.79 253.046 716.822 257.888 742.931 287.587 733.105 283.144 0.533333 0.533333 0.533333 epoly
1 0 0 0 493.826 323.063 486.485 322.507 487.038 343.81 0.466667 0.466667 0.466667 epoly
1 0 0 0 624.114 458.897 635.523 460.271 674.074 453.197 663.013 451.659 0.74902 0.74902 0.74902 epoly
1 0 0 0 458.409 265.349 466.787 268.093 460.085 288.828 451.456 286.914 0.466667 0.466667 0.466667 epoly
1 0 0 0 507.458 350.775 479.438 344.085 487.038 343.81 0.662745 0.662745 0.662745 epoly
1 0 0 0 555.794 413.983 534.944 406.656 528.023 427.42 548.803 434.83 0.231373 0.231373 0.231373 epoly
1 0 0 0 405.277 271.158 369.597 259.826 410.145 273.244 0.666667 0.666667 0.666667 epoly
1 0 0 0 507.435 420.08 500.626 423.417 487.034 412.805 0.662745 0.662745 0.662745 epoly
1 0 0 0 664.053 239.987 696.409 248.034 689.057 269.478 656.952 260.886 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 706.79 253.046 740.611 261.522 750.325 266.348 716.822 257.888 0.803922 0.803922 0.803922 epoly
1 0 0 0 566.876 501.713 562.737 463.159 544.846 466.587 548.74 504.632 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 765.852 307.074 794.681 279.899 752.423 291.879 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 583.737 541.078 571.104 541.087 548.74 504.63 561.445 505.236 0.537255 0.537255 0.537255 epoly
1 0 0 0 564.082 419.282 576.837 421.377 554.712 388.424 541.89 385.815 0.537255 0.537255 0.537255 epoly
1 0 0 0 609.977 500.133 597.97 499.432 590.841 520.294 602.947 520.638 0.478431 0.478431 0.478431 epoly
1 0 0 0 473.526 316.244 465.409 315.419 458.437 336.908 466.805 336.91 0.466667 0.466667 0.466667 epoly
1 0 0 0 656.952 260.886 645.827 256.066 658.141 271.057 669.191 275.68 0.533333 0.533333 0.533333 epoly
1 0 0 0 472.418 365.582 451.487 358.317 466.804 336.91 487.039 343.811 0.568627 0.568627 0.568627 epoly
1 0 0 0 507.5 211.771 535.79 219.096 500.654 232.82 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 500.624 371.527 528.621 383.115 521.579 404.324 493.816 392.204 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 500.641 326.29 514.314 329.944 507.457 350.774 493.691 347.488 0.486275 0.486275 0.486275 epoly
1 0 0 0 507.5 211.771 500.654 232.82 486.77 227.49 493.708 206.067 0.494118 0.494118 0.494118 epoly
1 0 0 0 706.789 253.045 692.326 295.105 719.785 267.908 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 657.807 413.177 677.821 408.88 699.143 413.371 679.506 417.462 0.74902 0.74902 0.74902 epoly
1 0 0 0 681.733 290.841 656.952 260.886 689.057 269.478 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 528.023 427.421 534.944 406.656 576.838 421.378 569.774 442.307 0.231373 0.231373 0.231373 epoly
1 0 0 0 493.826 323.063 486.485 322.507 514.316 329.945 0.662745 0.662745 0.662745 epoly
1 0 0 0 621.708 517.969 633.734 536.252 645.216 536.326 633.254 518.353 0.537255 0.537255 0.537255 epoly
1 0 0 0 674.072 453.198 663.011 451.66 638.358 417.35 649.568 419.43 0.537255 0.537255 0.537255 epoly
1 0 0 0 500.61 467.477 514.257 468.721 528.024 427.421 514.564 425.454 0.482353 0.482353 0.482353 epoly
1 0 0 0 493.816 392.204 507.739 401.909 514.286 399.397 0.662745 0.662745 0.662745 epoly
1 0 0 0 432.115 291.65 423.847 301.441 403.357 294.551 411.964 284.931 0.584314 0.584314 0.584314 epoly
1 0 0 0 558.36 481.826 575.256 464.472 566.876 501.712 0.478431 0.478431 0.478431 epoly
1 0 0 0 621.708 517.969 595.942 541.07 633.734 536.252 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 699.14 413.372 683.262 373.618 688.665 411.163 0.466667 0.466667 0.466667 epoly
1 0 0 0 486.485 322.507 465.407 315.418 466.803 336.909 487.038 343.81 0.768627 0.768627 0.768627 epoly
1 0 0 0 458.409 265.349 451.456 286.914 480.27 295.503 487.04 274.686 0.494118 0.494118 0.494118 epoly
1 0 0 0 641.314 372.602 663.717 378.29 644.562 355.363 0.470588 0.470588 0.470588 epoly
1 0 0 0 437.63 329.799 466.805 336.91 458.437 336.908 0.666667 0.666667 0.666667 epoly
1 0 0 0 349.734 322.999 356.331 302.019 396.602 315.78 389.868 336.929 0.227451 0.227451 0.227451 epoly
1 0 0 0 466.146 431.488 480.277 433.331 500.61 467.475 486.481 466.187 0.537255 0.537255 0.537255 epoly
1 0 0 0 645.214 536.327 640.319 497.905 628.874 497.167 633.733 536.253 0.47451 0.47451 0.47451 epoly
1 0 0 0 403.357 294.551 416.954 251.853 411.964 284.931 0.466667 0.466667 0.466667 epoly
1 0 0 0 650.214 575.556 645.216 536.324 630.946 577.427 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 500.641 326.29 514.314 329.944 521.197 309.037 507.618 305.013 0.486275 0.486275 0.486275 epoly
1 0 0 0 624.114 458.895 638.359 417.348 643.285 455.329 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 500.672 184.562 514.37 190.645 507.5 211.771 493.708 206.067 0.494118 0.494118 0.494118 epoly
1 0 0 0 683.261 373.618 699.137 413.369 680.577 391.001 0.470588 0.470588 0.470588 epoly
1 0 0 0 743.814 369.901 749.818 407.18 764.662 365.071 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 612.31 457.472 624.116 458.893 609.976 500.133 597.969 499.432 0.482353 0.482353 0.482353 epoly
1 0 0 0 517.973 226.056 521.651 262.219 500.654 232.82 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 486.767 333.377 472.418 365.582 487.039 343.811 0.466667 0.466667 0.466667 epoly
1 0 0 0 451.49 358.317 466.805 336.91 458.437 336.909 0.466667 0.466667 0.466667 epoly
1 0 0 0 451.457 286.914 460.085 288.828 458.41 265.349 0.466667 0.466667 0.466667 epoly
1 0 0 0 631.501 298.368 642.827 302.457 681.733 290.841 670.764 286.428 0.756863 0.756863 0.756863 epoly
1 0 0 0 735.086 448.968 717.14 427.179 696.694 431.187 714.804 452.591 0.803922 0.803922 0.803922 epoly
1 0 0 0 437.585 258.568 432.115 291.65 411.964 284.931 416.954 251.853 0.501961 0.501961 0.501961 epoly
1 0 0 0 416.955 251.853 411.966 284.931 432.116 291.65 437.586 258.569 0.498039 0.498039 0.498039 epoly
1 0 0 0 649.588 392.957 663.719 378.295 657.803 413.175 0.470588 0.470588 0.470588 epoly
1 0 0 0 528.024 427.421 500.626 423.417 507.435 420.08 0.662745 0.662745 0.662745 epoly
1 0 0 0 528.621 383.115 493.816 392.204 521.579 404.324 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 638.358 417.35 624.114 458.897 650.532 434.291 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 466.146 431.488 493.54 444.843 507.573 446.504 480.277 433.331 0.666667 0.666667 0.666667 epoly
1 0 0 0 486.485 322.507 493.826 323.063 473.524 316.244 465.407 315.418 0.662745 0.662745 0.662745 epoly
1 0 0 0 493.54 444.843 480.277 433.331 507.573 446.504 0.666667 0.666667 0.666667 epoly
1 0 0 0 602.516 538.661 583.737 541.076 595.941 541.067 614.57 538.694 0.745098 0.745098 0.745098 epoly
1 0 0 0 549.784 461.802 575.254 464.472 558.359 481.825 0.478431 0.478431 0.478431 epoly
1 0 0 0 538.769 444.4 549.785 461.804 562.738 463.16 551.752 446.035 0.537255 0.537255 0.537255 epoly
1 0 0 0 575.256 464.472 593.523 461.025 585.539 498.708 566.876 501.712 0.278431 0.278431 0.278431 epoly
1 0 0 0 487.034 412.805 480.277 433.331 493.54 444.843 500.627 423.417 0.172549 0.172549 0.172549 epoly
1 0 0 0 602.514 538.66 609.976 500.131 614.568 538.693 0.47451 0.47451 0.47451 epoly
1 0 0 0 548.803 434.83 569.776 442.308 576.839 421.378 555.794 413.983 0.231373 0.231373 0.231373 epoly
1 0 0 0 465.409 315.419 473.526 316.244 444.531 308.397 0.662745 0.662745 0.662745 epoly
1 0 0 0 609.976 500.133 633.733 536.253 628.874 497.167 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 538.769 444.4 514.258 468.722 549.785 461.804 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 719.333 409.162 699.137 413.369 683.261 373.618 703.368 368.811 0.380392 0.380392 0.380392 epoly
1 0 0 0 681.731 290.843 692.325 295.105 706.791 253.046 696.409 248.034 0.482353 0.482353 0.482353 epoly
1 0 0 0 628.874 497.165 633.733 536.251 614.568 538.693 609.976 500.131 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 514.621 283.655 528.106 288.053 521.197 309.037 507.618 305.013 0.490196 0.490196 0.490196 epoly
1 0 0 0 641.315 372.599 663.719 378.295 649.588 392.957 0.470588 0.470588 0.470588 epoly
1 0 0 0 486.485 322.507 493.826 323.063 487.038 343.81 479.438 344.085 0.466667 0.466667 0.466667 epoly
1 0 0 0 514.286 399.397 507.739 401.909 534.945 406.657 0.662745 0.662745 0.662745 epoly
1 0 0 0 548.74 504.63 562.737 463.157 566.876 501.711 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 514.563 425.454 487.034 412.805 500.627 423.417 0.662745 0.662745 0.662745 epoly
1 0 0 0 593.522 461.024 576.963 478.52 558.359 481.825 575.254 464.472 0.588235 0.588235 0.588235 epoly
1 0 0 0 575.256 464.472 558.36 481.826 576.964 478.521 593.523 461.025 0.584314 0.584314 0.584314 epoly
1 0 0 0 683.261 373.617 663.716 378.29 657.804 413.174 677.818 408.876 0.321569 0.321569 0.321569 epoly
1 0 0 0 663.719 378.295 683.264 373.623 677.818 408.878 657.803 413.175 0.313725 0.313725 0.313725 epoly
1 0 0 0 645.827 256.066 656.952 260.886 681.733 290.841 670.764 286.428 0.533333 0.533333 0.533333 epoly
1 0 0 0 487.039 343.811 507.459 350.775 493.551 372.915 472.42 365.581 0.560784 0.560784 0.560784 epoly
1 0 0 0 612.309 457.474 600.085 456.002 562.737 463.159 575.252 464.469 0.74902 0.74902 0.74902 epoly
1 0 0 0 597.971 499.43 602.516 538.661 614.57 538.694 609.977 500.131 0.47451 0.47451 0.47451 epoly
1 0 0 0 517.973 226.056 500.654 232.82 486.77 227.49 504.192 220.53 0.776471 0.776471 0.776471 epoly
1 0 0 0 556.919 440.583 528.023 427.421 569.774 442.307 0.662745 0.662745 0.662745 epoly
1 0 0 0 500.626 423.417 507.739 401.909 493.816 392.204 487.034 412.805 0.172549 0.172549 0.172549 epoly
1 0 0 0 534.944 406.656 564.082 419.282 541.89 385.815 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 542.675 482.943 514.258 468.72 535.592 504.004 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 645.827 256.066 678.197 264.678 689.057 269.478 656.952 260.886 0.803922 0.803922 0.803922 epoly
1 0 0 0 487.039 343.811 479.439 344.085 500.644 351.331 507.459 350.775 0.662745 0.662745 0.662745 epoly
1 0 0 0 678.197 264.678 656.952 260.886 689.057 269.478 0.803922 0.803922 0.803922 epoly
1 0 0 0 497.178 429.448 500.61 467.477 514.564 425.454 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 369.597 259.826 362.95 280.962 403.361 294.552 410.145 273.244 0.227451 0.227451 0.227451 epoly
1 0 0 0 396.517 245.203 376.269 238.612 369.598 259.826 389.777 266.504 0.227451 0.227451 0.227451 epoly
1 0 0 0 625.436 360.322 621.969 377.384 641.314 372.602 644.562 355.363 0.305882 0.305882 0.305882 epoly
1 0 0 0 534.944 406.656 541.89 385.815 528.621 383.115 521.579 404.324 0.482353 0.482353 0.482353 epoly
1 0 0 0 612.309 457.474 582.193 443.973 569.774 442.307 600.085 456.002 0.658824 0.658824 0.658824 epoly
1 0 0 0 638.358 417.35 652.709 375.493 657.806 413.174 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 636.356 335.092 641.313 372.602 647.717 338.597 0.470588 0.470588 0.470588 epoly
1 0 0 0 593.522 461.024 575.254 464.472 549.784 461.802 568.328 458.192 0.74902 0.74902 0.74902 epoly
1 0 0 0 663.719 378.295 649.588 392.957 669.552 388.349 683.264 373.623 0.588235 0.588235 0.588235 epoly
1 0 0 0 683.264 373.623 669.552 388.349 649.588 392.957 663.719 378.295 0.588235 0.588235 0.588235 epoly
1 0 0 0 719.785 267.908 733.106 283.144 742.932 287.587 729.718 272.557 0.533333 0.533333 0.533333 epoly
1 0 0 0 626.758 415.196 638.359 417.348 624.114 458.895 612.308 457.473 0.482353 0.482353 0.482353 epoly
1 0 0 0 664.053 239.987 656.952 260.886 678.197 264.678 685.659 242.845 0.176471 0.176471 0.176471 epoly
1 0 0 0 373.84 333.352 349.734 322.999 389.868 336.929 0.670588 0.670588 0.670588 epoly
1 0 0 0 549.784 461.804 514.258 468.72 542.675 482.943 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 507.74 401.909 493.816 392.204 521.579 404.324 0.662745 0.662745 0.662745 epoly
1 0 0 0 719.785 267.908 692.326 295.105 733.106 283.144 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 617.025 496.404 597.969 499.432 609.976 500.133 628.874 497.167 0.745098 0.745098 0.745098 epoly
1 0 0 0 717.14 427.179 719.336 409.163 699.139 413.37 696.694 431.187 0.313725 0.313725 0.313725 epoly
1 0 0 0 432.115 291.65 437.585 258.568 423.847 301.441 0.466667 0.466667 0.466667 epoly
1 0 0 0 479.439 344.085 487.039 343.811 472.42 365.581 0.466667 0.466667 0.466667 epoly
1 0 0 0 576.838 421.378 534.944 406.656 564.083 419.282 0.662745 0.662745 0.662745 epoly
1 0 0 0 500.624 371.527 493.816 392.204 507.74 401.909 514.881 380.319 0.172549 0.172549 0.172549 epoly
1 0 0 0 500.625 371.528 493.55 372.915 500.643 351.33 507.458 350.774 0.466667 0.466667 0.466667 epoly
1 0 0 0 486.485 322.507 479.438 344.085 507.458 350.775 514.316 329.945 0.490196 0.490196 0.490196 epoly
1 0 0 0 683.264 373.623 663.719 378.295 641.315 372.599 661.228 367.676 0.74902 0.74902 0.74902 epoly
1 0 0 0 696.409 248.034 664.053 239.987 685.659 242.845 0.803922 0.803922 0.803922 epoly
1 0 0 0 699.143 413.371 677.821 408.88 696.697 431.189 0.466667 0.466667 0.466667 epoly
1 0 0 0 794.679 279.9 785.66 275.27 742.931 287.587 752.423 291.879 0.752941 0.752941 0.752941 epoly
1 0 0 0 641.313 372.602 636.356 335.092 617.282 340.353 621.968 377.384 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 542.675 482.943 535.592 504.004 548.741 504.631 555.726 483.934 0.482353 0.482353 0.482353 epoly
1 0 0 0 528.023 427.421 556.919 440.583 564.083 419.282 534.944 406.656 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 437.54 187.205 418.548 159.57 444.454 165.491 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 507.457 350.774 522.051 358.645 493.691 347.488 0.662745 0.662745 0.662745 epoly
1 0 0 0 583.737 541.078 579.451 502.375 566.876 501.711 571.104 541.087 0.478431 0.478431 0.478431 epoly
1 0 0 0 500.626 423.417 507.435 420.08 514.286 399.397 507.739 401.909 0.466667 0.466667 0.466667 epoly
1 0 0 0 507.739 401.909 514.286 399.397 507.435 420.08 500.626 423.417 0.466667 0.466667 0.466667 epoly
1 0 0 0 396.602 315.78 356.331 302.019 380.662 311.824 0.666667 0.666667 0.666667 epoly
1 0 0 0 676.4 254.551 681.731 290.843 696.409 248.034 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 528.621 383.115 500.624 371.527 514.881 380.319 0.662745 0.662745 0.662745 epoly
1 0 0 0 650.532 434.291 663.013 451.659 674.074 453.197 661.671 436.107 0.537255 0.537255 0.537255 epoly
1 0 0 0 549.784 461.801 562.737 463.157 548.74 504.63 535.591 504.003 0.482353 0.482353 0.482353 epoly
1 0 0 0 794.679 279.9 759.709 271.009 750.325 266.348 785.66 275.27 0.803922 0.803922 0.803922 epoly
1 0 0 0 349.734 322.999 373.84 333.352 380.662 311.824 356.331 302.019 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 612.31 457.472 617.025 496.404 628.874 497.167 624.116 458.893 0.47451 0.47451 0.47451 epoly
1 0 0 0 650.532 434.291 624.114 458.897 663.013 451.659 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 657.807 413.177 676.826 435.085 696.697 431.189 677.821 408.88 0.811765 0.811765 0.811765 epoly
1 0 0 0 500.625 371.528 507.458 350.774 522.051 358.645 514.883 380.319 0.172549 0.172549 0.172549 epoly
1 0 0 0 556.919 440.583 528.023 427.421 549.784 461.804 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 696.694 431.185 677.818 408.876 680.579 390.999 699.14 413.368 0.470588 0.470588 0.470588 epoly
1 0 0 0 700.932 386.378 699.14 413.368 680.579 390.999 0.815686 0.815686 0.815686 epoly
1 0 0 0 719.333 409.162 700.93 386.379 680.577 391.001 699.137 413.369 0.811765 0.811765 0.811765 epoly
1 0 0 0 521.651 262.219 507.786 257.276 486.77 227.49 500.654 232.82 0.533333 0.533333 0.533333 epoly
1 0 0 0 674.072 453.198 668.841 415.355 657.806 413.174 663.011 451.66 0.470588 0.470588 0.470588 epoly
1 0 0 0 555.726 483.934 562.737 463.159 549.784 461.804 542.675 482.943 0.482353 0.482353 0.482353 epoly
1 0 0 0 717.14 427.179 735.086 448.968 719.336 409.163 0.466667 0.466667 0.466667 epoly
1 0 0 0 548.74 504.63 571.104 541.087 566.876 501.711 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 500.641 326.29 529.247 336.887 514.314 329.944 0.662745 0.662745 0.662745 epoly
1 0 0 0 507.5 211.771 522.124 213.365 493.708 206.067 0.8 0.8 0.8 epoly
1 0 0 0 641.315 372.598 652.709 375.493 638.358 417.35 626.756 415.197 0.482353 0.482353 0.482353 epoly
1 0 0 0 459.229 171.95 486.49 178.264 452.407 193.279 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 459.229 171.95 452.407 193.279 437.54 187.205 444.454 165.491 0.498039 0.498039 0.498039 epoly
1 0 0 0 410.145 273.244 416.955 251.856 396.517 245.203 389.777 266.504 0.227451 0.227451 0.227451 epoly
1 0 0 0 631.646 453.823 612.308 457.473 624.114 458.895 643.285 455.329 0.74902 0.74902 0.74902 epoly
1 0 0 0 628.874 497.165 609.976 500.131 602.514 538.66 621.843 536.174 0.282353 0.282353 0.282353 epoly
1 0 0 0 507.739 401.909 500.626 423.417 528.024 427.421 534.945 406.657 0.486275 0.486275 0.486275 epoly
1 0 0 0 529.247 336.887 522.051 358.645 507.457 350.774 514.314 329.944 0.172549 0.172549 0.172549 epoly
1 0 0 0 535.79 219.096 522.124 213.365 486.77 227.49 500.654 232.82 0.776471 0.776471 0.776471 epoly
1 0 0 0 688.664 411.163 677.818 408.876 657.804 413.174 668.839 415.355 0.74902 0.74902 0.74902 epoly
1 0 0 0 631.645 453.823 638.358 417.348 643.284 455.328 0.470588 0.470588 0.470588 epoly
1 0 0 0 389.867 336.928 396.601 315.78 437.63 329.799 430.756 351.12 0.227451 0.227451 0.227451 epoly
1 0 0 0 638.358 417.35 663.011 451.66 657.806 413.174 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 657.806 413.172 663.011 451.658 643.284 455.328 638.358 417.348 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 562.737 463.159 600.085 456.002 569.774 442.307 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 556.919 440.583 549.784 461.804 562.737 463.159 569.774 442.307 0.482353 0.482353 0.482353 epoly
1 0 0 0 493.55 372.915 500.625 371.528 514.883 380.319 0.662745 0.662745 0.662745 epoly
1 0 0 0 521.197 309.037 536.471 315.046 507.618 305.013 0.658824 0.658824 0.658824 epoly
1 0 0 0 500.672 184.562 529.335 191.284 514.37 190.645 0.803922 0.803922 0.803922 epoly
1 0 0 0 688.664 411.163 683.261 373.617 677.818 408.876 0.470588 0.470588 0.470588 epoly
1 0 0 0 493.551 372.915 507.459 350.775 500.644 351.331 0.466667 0.466667 0.466667 epoly
1 0 0 0 403.205 152.956 418.548 159.57 437.54 187.205 422.144 180.914 0.537255 0.537255 0.537255 epoly
1 0 0 0 740.611 261.522 706.79 253.046 733.105 283.144 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 602.516 538.661 597.971 499.43 583.737 541.076 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 593.518 461.021 585.538 498.708 581.142 459.632 0.47451 0.47451 0.47451 epoly
1 0 0 0 535.79 219.096 507.5 211.771 493.708 206.067 522.124 213.365 0.8 0.8 0.8 epoly
1 0 0 0 658.139 271.057 670.764 286.428 681.733 290.841 669.19 275.679 0.533333 0.533333 0.533333 epoly
1 0 0 0 469.203 185.879 472.396 221.975 452.405 193.279 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 472.418 365.582 486.767 333.377 466.119 326.383 451.487 358.317 0.313725 0.313725 0.313725 epoly
1 0 0 0 451.488 358.318 466.12 326.384 486.768 333.378 472.419 365.583 0.313725 0.313725 0.313725 epoly
1 0 0 0 626.758 415.196 631.646 453.823 643.285 455.329 638.359 417.348 0.470588 0.470588 0.470588 epoly
1 0 0 0 403.205 152.956 429.152 158.801 444.454 165.491 418.548 159.57 0.8 0.8 0.8 epoly
1 0 0 0 658.139 271.057 631.501 298.368 670.764 286.428 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 553.857 501.023 535.591 504.003 548.74 504.63 566.876 501.711 0.74902 0.74902 0.74902 epoly
1 0 0 0 529.335 191.284 522.124 213.365 507.5 211.771 514.37 190.645 0.172549 0.172549 0.172549 epoly
1 0 0 0 444.532 308.398 437.632 329.799 396.601 315.779 403.36 294.551 0.227451 0.227451 0.227451 epoly
1 0 0 0 466.12 326.384 451.488 358.318 465.407 315.418 0.466667 0.466667 0.466667 epoly
1 0 0 0 556.919 440.583 569.774 442.307 576.838 421.378 564.083 419.282 0.482353 0.482353 0.482353 epoly
1 0 0 0 600.086 456.002 612.31 457.474 593.518 461.021 581.142 459.632 0.74902 0.74902 0.74902 epoly
1 0 0 0 700.93 386.379 703.368 368.811 683.261 373.618 680.577 391.001 0.321569 0.321569 0.321569 epoly
1 0 0 0 683.259 373.619 677.816 408.878 672.434 370.7 0.470588 0.470588 0.470588 epoly
1 0 0 0 522.051 358.645 507.458 350.774 500.643 351.33 0.662745 0.662745 0.662745 epoly
1 0 0 0 514.621 283.655 543.723 293.119 528.106 288.053 0.8 0.8 0.8 epoly
1 0 0 0 437.585 258.568 416.954 251.853 403.357 294.551 423.847 301.441 0.227451 0.227451 0.227451 epoly
1 0 0 0 466.12 326.384 465.407 315.418 486.484 322.506 486.768 333.378 0.764706 0.764706 0.764706 epoly
1 0 0 0 646.379 410.916 626.756 415.197 638.358 417.35 657.806 413.174 0.74902 0.74902 0.74902 epoly
1 0 0 0 742.931 287.587 785.66 275.27 750.325 266.348 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 740.611 261.522 733.105 283.144 742.931 287.587 750.325 266.348 0.482353 0.482353 0.482353 epoly
1 0 0 0 373.84 333.352 389.868 336.929 396.602 315.78 380.662 311.824 0.494118 0.494118 0.494118 epoly
1 0 0 0 543.723 293.119 536.471 315.046 521.197 309.037 528.106 288.053 0.172549 0.172549 0.172549 epoly
1 0 0 0 692.739 365.765 703.366 368.812 683.259 373.619 672.434 370.7 0.74902 0.74902 0.74902 epoly
1 0 0 0 696.694 431.185 699.14 413.368 700.932 386.378 698.424 404.452 0.407843 0.407843 0.407843 epoly
1 0 0 0 549.784 461.801 553.857 501.023 566.876 501.711 562.737 463.157 0.478431 0.478431 0.478431 epoly
1 0 0 0 511.264 198.783 486.77 227.493 500.672 184.562 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 469.203 185.879 452.405 193.279 437.539 187.204 454.417 179.585 0.788235 0.788235 0.788235 epoly
1 0 0 0 571.273 397.9 583.928 400.369 576.838 421.377 564.083 419.282 0.482353 0.482353 0.482353 epoly
1 0 0 0 493.54 444.843 466.146 431.488 486.481 466.187 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 585.539 498.708 593.523 461.025 576.964 478.521 0.47451 0.47451 0.47451 epoly
1 0 0 0 415.299 347.761 389.867 336.928 430.756 351.12 0.666667 0.666667 0.666667 epoly
1 0 0 0 617.025 496.404 612.31 457.472 597.969 499.432 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 538.769 444.4 564.084 419.28 549.785 461.804 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 387.51 290.214 403.361 294.552 396.602 315.78 380.662 311.824 0.494118 0.494118 0.494118 epoly
1 0 0 0 641.315 372.598 646.379 410.916 657.806 413.174 652.709 375.493 0.470588 0.470588 0.470588 epoly
1 0 0 0 396.601 315.779 437.632 329.799 401.365 318.905 0.666667 0.666667 0.666667 epoly
1 0 0 0 700.93 386.379 719.333 409.162 703.368 368.811 0.466667 0.466667 0.466667 epoly
1 0 0 0 677.818 408.878 683.264 373.623 669.552 388.349 0.470588 0.470588 0.470588 epoly
1 0 0 0 633.733 536.251 621.843 536.174 602.514 538.66 614.568 538.693 0.745098 0.745098 0.745098 epoly
1 0 0 0 576.963 478.52 593.522 461.024 568.328 458.192 0.478431 0.478431 0.478431 epoly
1 0 0 0 602.516 538.661 607.159 578.735 583.737 541.076 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 437.63 329.799 396.601 315.78 422.266 326.054 0.666667 0.666667 0.666667 epoly
1 0 0 0 493.54 444.843 486.481 466.187 500.61 467.475 507.573 446.504 0.482353 0.482353 0.482353 epoly
1 0 0 0 486.77 227.49 522.124 213.365 493.708 206.067 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 604.753 495.615 585.538 498.708 593.518 461.021 612.31 457.474 0.278431 0.278431 0.278431 epoly
1 0 0 0 493.691 347.488 479.439 344.085 486.486 322.507 500.641 326.29 0.486275 0.486275 0.486275 epoly
1 0 0 0 423.849 301.442 444.532 308.398 451.458 286.915 430.704 280.047 0.227451 0.227451 0.227451 epoly
1 0 0 0 633.733 536.251 628.874 497.165 621.843 536.174 0.47451 0.47451 0.47451 epoly
1 0 0 0 486.484 322.506 472.419 365.583 486.768 333.378 0.466667 0.466667 0.466667 epoly
1 0 0 0 521.651 262.219 517.973 226.056 504.192 220.53 507.786 257.276 0.47451 0.47451 0.47451 epoly
1 0 0 0 678.197 264.678 645.827 256.066 670.764 286.428 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 389.867 336.928 415.299 347.761 422.266 326.054 396.601 315.78 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 408.285 297.206 403.36 294.551 396.601 315.779 401.365 318.905 0.172549 0.172549 0.172549 epoly
1 0 0 0 517.972 226.056 507.785 257.276 504.191 220.53 0.47451 0.47451 0.47451 epoly
1 0 0 0 408.285 297.206 444.532 308.398 403.36 294.551 0.666667 0.666667 0.666667 epoly
1 0 0 0 657.806 413.172 638.358 417.348 631.645 453.823 651.554 450.065 0.305882 0.305882 0.305882 epoly
1 0 0 0 486.77 227.493 472.396 221.975 486.489 178.264 500.672 184.562 0.494118 0.494118 0.494118 epoly
1 0 0 0 669.552 388.349 683.264 373.623 661.228 367.676 0.470588 0.470588 0.470588 epoly
1 0 0 0 437.63 329.799 430.756 351.12 451.49 358.317 458.437 336.909 0.227451 0.227451 0.227451 epoly
1 0 0 0 698.422 404.453 677.816 408.878 683.259 373.619 703.366 368.812 0.317647 0.317647 0.317647 epoly
1 0 0 0 472.396 221.975 457.506 216.26 437.539 187.204 452.405 193.279 0.533333 0.533333 0.533333 epoly
1 0 0 0 514.563 425.454 500.627 423.417 493.54 444.843 507.573 446.504 0.482353 0.482353 0.482353 epoly
1 0 0 0 631.646 453.823 626.758 415.196 612.308 457.473 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 522.125 213.366 535.79 219.096 517.972 226.056 504.191 220.53 0.776471 0.776471 0.776471 epoly
1 0 0 0 451.457 286.914 458.41 265.349 437.584 258.57 430.703 280.046 0.227451 0.227451 0.227451 epoly
1 0 0 0 486.77 227.49 507.786 257.276 504.192 220.53 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 602.516 538.661 583.737 541.076 571.104 541.085 590.032 538.627 0.745098 0.745098 0.745098 epoly
1 0 0 0 553.857 501.023 549.784 461.801 566.876 501.711 0.478431 0.478431 0.478431 epoly
1 0 0 0 678.197 264.678 670.764 286.428 681.733 290.841 689.057 269.478 0.482353 0.482353 0.482353 epoly
1 0 0 0 430.756 351.12 437.631 329.799 479.439 344.085 472.42 365.581 0.227451 0.227451 0.227451 epoly
1 0 0 0 465.409 315.419 444.531 308.397 437.63 329.799 458.437 336.908 0.231373 0.231373 0.231373 epoly
1 0 0 0 538.769 444.4 549.785 461.804 536.37 460.4 525.329 442.707 0.537255 0.537255 0.537255 epoly
1 0 0 0 486.49 178.264 471.796 171.74 437.54 187.205 452.407 193.279 0.788235 0.788235 0.788235 epoly
1 0 0 0 493.691 347.488 522.051 358.645 479.439 344.085 0.662745 0.662745 0.662745 epoly
1 0 0 0 536.37 460.4 500.61 467.477 525.329 442.707 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 522.126 213.366 486.77 227.493 511.264 198.783 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 522.051 358.645 493.691 347.488 500.641 326.29 529.247 336.888 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 529.247 336.887 500.641 326.29 493.691 347.488 522.051 358.645 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 558.36 481.826 566.876 501.712 585.539 498.708 576.964 478.521 0.368627 0.368627 0.368627 epoly
1 0 0 0 415.299 347.761 396.601 315.78 422.266 326.054 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 646.379 410.916 641.315 372.598 657.806 413.174 0.470588 0.470588 0.470588 epoly
1 0 0 0 553.857 501.023 549.784 461.801 535.591 504.003 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 486.49 178.264 459.229 171.95 444.454 165.491 471.796 171.74 0.803922 0.803922 0.803922 epoly
1 0 0 0 564.084 419.28 538.769 444.4 525.329 442.707 550.872 417.11 0.698039 0.698039 0.698039 epoly
1 0 0 0 696.409 248.034 685.659 242.845 678.197 264.678 689.057 269.478 0.482353 0.482353 0.482353 epoly
1 0 0 0 619.52 436.376 651.555 450.065 612.31 457.474 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 619.52 436.376 612.31 457.474 600.086 456.002 607.4 434.526 0.482353 0.482353 0.482353 epoly
1 0 0 0 549.784 461.801 568.328 458.192 585.54 498.706 566.876 501.711 0.364706 0.364706 0.364706 epoly
1 0 0 0 521.977 503.354 500.61 467.475 529.159 481.918 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 649.588 392.957 657.803 413.175 677.818 408.878 669.552 388.349 0.368627 0.368627 0.368627 epoly
1 0 0 0 486.486 322.507 529.247 336.888 500.641 326.29 0.662745 0.662745 0.662745 epoly
1 0 0 0 507.787 257.274 486.77 227.491 514.942 235.362 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 576.838 421.377 594.842 432.61 564.083 419.282 0.662745 0.662745 0.662745 epoly
1 0 0 0 486.49 178.264 472.396 221.975 469.203 185.879 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 677.818 408.876 696.694 431.185 698.424 404.452 0.811765 0.811765 0.811765 epoly
1 0 0 0 528.621 383.115 514.881 380.319 507.74 401.909 521.579 404.324 0.486275 0.486275 0.486275 epoly
1 0 0 0 529.335 191.284 500.672 184.562 493.708 206.067 522.124 213.365 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 646.379 410.916 641.315 372.598 626.756 415.197 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 486.481 466.189 511.407 440.954 525.329 442.707 500.61 467.477 0.701961 0.701961 0.701961 epoly
1 0 0 0 486.77 227.493 511.264 198.783 497.089 192.659 472.396 221.975 0.705882 0.705882 0.705882 epoly
1 0 0 0 472.396 221.975 497.089 192.659 511.264 198.783 486.77 227.493 0.705882 0.705882 0.705882 epoly
1 0 0 0 415.299 347.761 430.756 351.12 437.63 329.799 422.266 326.054 0.490196 0.490196 0.490196 epoly
1 0 0 0 444.532 308.398 408.285 297.206 401.365 318.905 437.632 329.799 0.431373 0.431373 0.431373 epoly
1 0 0 0 437.632 329.799 401.365 318.905 408.285 297.206 444.532 308.398 0.427451 0.427451 0.427451 epoly
1 0 0 0 525.969 250.578 507.785 257.276 517.972 226.056 535.79 219.096 0.294118 0.294118 0.294118 epoly
1 0 0 0 514.942 235.362 486.77 227.491 522.125 213.366 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 617.025 496.404 612.31 457.472 636.642 493.287 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 396.602 315.78 406.347 322.174 380.662 311.824 0.666667 0.666667 0.666667 epoly
1 0 0 0 451.488 358.318 472.419 365.583 486.484 322.506 465.407 315.418 0.227451 0.227451 0.227451 epoly
1 0 0 0 641.315 372.598 661.228 367.676 677.82 408.877 657.806 413.174 0.364706 0.364706 0.364706 epoly
1 0 0 0 600.086 456.002 585.538 498.708 581.142 459.632 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 444.531 308.397 451.458 286.914 493.559 300.846 486.486 322.507 0.227451 0.227451 0.227451 epoly
1 0 0 0 607.159 578.735 594.622 579.424 571.104 541.085 583.737 541.076 0.537255 0.537255 0.537255 epoly
1 0 0 0 614.743 412.968 626.757 415.198 619.52 436.376 607.4 434.526 0.482353 0.482353 0.482353 epoly
1 0 0 0 663.011 451.658 651.554 450.065 631.645 453.823 643.284 455.328 0.745098 0.745098 0.745098 epoly
1 0 0 0 571.273 397.9 602.293 410.658 583.928 400.369 0.662745 0.662745 0.662745 epoly
1 0 0 0 576.963 478.52 568.328 458.192 549.784 461.802 558.359 481.825 0.368627 0.368627 0.368627 epoly
1 0 0 0 542.675 482.943 572.663 497.954 535.592 504.004 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 457.56 362.448 430.756 351.12 472.42 365.581 0.666667 0.666667 0.666667 epoly
1 0 0 0 542.675 482.943 535.592 504.004 521.977 503.354 529.159 481.918 0.482353 0.482353 0.482353 epoly
1 0 0 0 543.723 293.119 514.621 283.655 507.618 305.013 536.471 315.046 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 429.152 158.801 403.205 152.956 422.144 180.914 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 663.011 451.658 657.806 413.172 651.554 450.065 0.470588 0.470588 0.470588 epoly
1 0 0 0 380.661 311.824 396.601 315.78 415.299 347.761 399.285 344.28 0.537255 0.537255 0.537255 epoly
1 0 0 0 511.264 198.783 500.672 184.562 486.489 178.264 497.089 192.659 0.533333 0.533333 0.533333 epoly
1 0 0 0 692.741 365.766 677.818 408.878 672.436 370.7 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 387.51 290.214 413.436 299.982 403.361 294.552 0.666667 0.666667 0.666667 epoly
1 0 0 0 602.293 410.658 594.842 432.61 576.838 421.377 583.928 400.369 0.172549 0.172549 0.172549 epoly
1 0 0 0 612.31 457.472 617.025 496.404 604.753 495.613 600.086 456 0.47451 0.47451 0.47451 epoly
1 0 0 0 500.661 279.102 493.561 300.846 451.457 286.914 458.41 265.349 0.231373 0.231373 0.231373 epoly
1 0 0 0 380.661 311.824 406.347 322.174 422.266 326.054 396.601 315.78 0.670588 0.670588 0.670588 epoly
1 0 0 0 669.552 388.349 661.228 367.676 641.315 372.599 649.588 392.957 0.372549 0.372549 0.372549 epoly
1 0 0 0 600.086 456.002 604.753 495.615 612.31 457.474 0.47451 0.47451 0.47451 epoly
1 0 0 0 522.124 213.366 500.672 184.562 529.335 191.284 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 486.481 466.187 500.61 467.475 521.977 503.354 507.869 502.681 0.537255 0.537255 0.537255 epoly
1 0 0 0 472.396 221.973 486.77 227.491 507.787 257.274 493.421 252.152 0.533333 0.533333 0.533333 epoly
1 0 0 0 479.439 344.085 437.631 329.799 464.677 340.56 0.662745 0.662745 0.662745 epoly
1 0 0 0 413.436 299.982 406.347 322.174 396.602 315.78 403.361 294.552 0.172549 0.172549 0.172549 epoly
1 0 0 0 553.857 501.023 566.876 501.711 585.54 498.706 572.663 497.954 0.74902 0.74902 0.74902 epoly
1 0 0 0 553.857 501.023 558.018 541.096 535.591 504.003 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 539.714 255.71 543.722 293.121 521.65 262.216 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 677.818 408.876 698.424 404.452 700.932 386.378 680.579 390.999 0.309804 0.309804 0.309804 epoly
1 0 0 0 437.54 187.205 471.796 171.74 444.454 165.491 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 430.756 351.12 457.56 362.448 464.677 340.56 437.631 329.799 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 486.481 466.187 515.153 480.856 529.159 481.918 500.61 467.475 0.666667 0.666667 0.666667 epoly
1 0 0 0 429.152 158.801 422.144 180.914 437.54 187.205 444.454 165.491 0.501961 0.501961 0.501961 epoly
1 0 0 0 472.396 221.973 500.677 229.833 514.942 235.362 486.77 227.491 0.8 0.8 0.8 epoly
1 0 0 0 486.77 227.491 514.942 235.362 500.677 229.833 472.396 221.973 0.8 0.8 0.8 epoly
1 0 0 0 692.739 365.765 698.422 404.453 703.366 368.812 0.466667 0.466667 0.466667 epoly
1 0 0 0 472.396 221.975 469.203 185.879 454.417 179.585 457.506 216.26 0.478431 0.478431 0.478431 epoly
1 0 0 0 457.506 216.26 454.417 179.585 469.203 185.879 472.396 221.975 0.478431 0.478431 0.478431 epoly
1 0 0 0 604.753 495.615 600.086 456.002 581.142 459.632 585.538 498.708 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 479.439 344.085 472.42 365.581 493.551 372.915 500.644 351.331 0.231373 0.231373 0.231373 epoly
1 0 0 0 486.481 466.189 500.61 467.477 536.37 460.4 522.467 458.945 0.752941 0.752941 0.752941 epoly
1 0 0 0 486.77 227.491 472.396 221.973 507.963 207.427 522.125 213.366 0.780392 0.780392 0.780392 epoly
1 0 0 0 472.396 221.975 486.77 227.493 522.126 213.366 507.964 207.427 0.780392 0.780392 0.780392 epoly
1 0 0 0 646.379 410.916 657.806 413.174 677.82 408.877 666.584 406.508 0.74902 0.74902 0.74902 epoly
1 0 0 0 556.919 440.583 587.42 454.477 549.784 461.804 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 471.821 318.587 444.531 308.397 486.486 322.507 0.662745 0.662745 0.662745 epoly
1 0 0 0 556.919 440.583 549.784 461.804 536.368 460.399 543.606 438.797 0.482353 0.482353 0.482353 epoly
1 0 0 0 542.9 197.413 573.014 204.557 535.79 219.096 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 542.9 197.413 535.79 219.096 522.124 213.366 529.335 191.284 0.490196 0.490196 0.490196 epoly
1 0 0 0 572.661 497.956 568.326 458.193 581.142 459.632 585.538 498.708 0.478431 0.478431 0.478431 epoly
1 0 0 0 443.329 260.431 458.41 265.349 451.457 286.914 436.281 282.39 0.494118 0.494118 0.494118 epoly
1 0 0 0 698.422 404.453 692.739 365.765 672.434 370.7 677.816 408.878 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 454.417 179.585 471.796 171.74 486.49 178.264 469.203 185.879 0.792157 0.792157 0.792157 epoly
1 0 0 0 451.457 286.914 493.561 300.846 457.534 289.426 0.662745 0.662745 0.662745 epoly
1 0 0 0 564.084 419.28 550.872 417.11 536.37 460.4 549.785 461.804 0.482353 0.482353 0.482353 epoly
1 0 0 0 437.539 187.204 457.506 216.26 454.417 179.585 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 401.365 318.905 437.632 329.799 406.348 322.175 0.666667 0.666667 0.666667 epoly
1 0 0 0 472.419 365.581 479.439 344.085 522.05 358.645 514.881 380.319 0.231373 0.231373 0.231373 epoly
1 0 0 0 553.857 501.023 535.591 504.003 521.975 503.353 540.368 500.31 0.74902 0.74902 0.74902 epoly
1 0 0 0 539.714 255.71 521.65 262.216 507.785 257.274 525.969 250.576 0.768627 0.768627 0.768627 epoly
1 0 0 0 564.083 419.282 587.42 454.477 556.92 440.583 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 550.871 417.112 528.622 383.115 558.165 395.342 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 486.489 178.264 500.672 184.562 522.124 213.366 507.963 207.427 0.533333 0.533333 0.533333 epoly
1 0 0 0 666.582 406.509 661.226 367.678 672.436 370.7 677.818 408.878 0.470588 0.470588 0.470588 epoly
1 0 0 0 493.559 300.846 451.458 286.914 478.993 296.529 0.662745 0.662745 0.662745 epoly
1 0 0 0 543.606 438.797 550.871 417.112 564.083 419.282 556.92 440.583 0.482353 0.482353 0.482353 epoly
1 0 0 0 568.326 458.193 587.421 454.477 600.086 456.002 581.142 459.632 0.74902 0.74902 0.74902 epoly
1 0 0 0 549.784 461.801 553.857 501.023 572.663 497.954 568.328 458.192 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 451.458 286.914 478.993 296.529 471.821 318.587 444.531 308.397 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 444.531 308.397 471.821 318.587 478.993 296.529 451.458 286.914 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 464.658 267.374 458.41 265.349 451.457 286.914 457.534 289.426 0.172549 0.172549 0.172549 epoly
1 0 0 0 444.453 165.491 471.795 171.739 464.637 194.042 437.539 187.204 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 486.489 178.264 515.276 184.932 529.335 191.284 500.672 184.562 0.803922 0.803922 0.803922 epoly
1 0 0 0 464.658 267.374 500.661 279.102 458.41 265.349 0.8 0.8 0.8 epoly
1 0 0 0 413.437 299.982 444.532 308.398 408.285 297.206 0.666667 0.666667 0.666667 epoly
1 0 0 0 529.248 336.888 522.051 358.645 479.438 344.085 486.484 322.506 0.231373 0.231373 0.231373 epoly
1 0 0 0 522.051 358.645 529.247 336.888 486.486 322.507 479.439 344.085 0.231373 0.231373 0.231373 epoly
1 0 0 0 612.31 457.472 600.086 456 624.543 492.427 636.642 493.287 0.537255 0.537255 0.537255 epoly
1 0 0 0 661.226 367.678 681.731 362.609 692.741 365.766 672.436 370.7 0.752941 0.752941 0.752941 epoly
1 0 0 0 619.52 436.376 639.679 448.414 607.4 434.526 0.658824 0.658824 0.658824 epoly
1 0 0 0 486.489 178.264 472.396 221.975 497.089 192.659 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 641.315 372.598 646.379 410.916 666.584 406.508 661.228 367.676 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 571.273 397.9 602.293 410.658 564.083 419.282 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 522.125 213.366 525.969 250.578 535.79 219.096 0.47451 0.47451 0.47451 epoly
1 0 0 0 437.632 329.799 444.532 308.398 413.437 299.982 406.348 322.175 0.490196 0.490196 0.490196 epoly
1 0 0 0 571.273 397.9 564.083 419.282 550.871 417.112 558.165 395.342 0.482353 0.482353 0.482353 epoly
1 0 0 0 493.55 372.915 514.883 380.319 522.051 358.645 500.643 351.33 0.231373 0.231373 0.231373 epoly
1 0 0 0 457.507 216.258 437.539 187.204 464.637 194.042 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 607.159 578.735 602.516 538.661 590.032 538.627 594.622 579.424 0.47451 0.47451 0.47451 epoly
1 0 0 0 457.56 362.448 472.42 365.581 479.439 344.085 464.677 340.56 0.486275 0.486275 0.486275 epoly
1 0 0 0 602.514 538.66 594.62 579.423 590.03 538.626 0.47451 0.47451 0.47451 epoly
1 0 0 0 536.37 460.4 550.872 417.11 525.329 442.707 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 651.555 450.065 639.679 448.414 600.086 456.002 612.31 457.474 0.745098 0.745098 0.745098 epoly
1 0 0 0 614.743 412.968 647.292 426.277 626.757 415.198 0.658824 0.658824 0.658824 epoly
1 0 0 0 525.969 250.578 522.125 213.366 504.191 220.53 507.785 257.276 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 558.018 541.096 544.456 541.106 521.975 503.353 535.591 504.003 0.537255 0.537255 0.537255 epoly
1 0 0 0 514.882 380.319 528.622 383.115 550.871 417.112 537.178 414.862 0.537255 0.537255 0.537255 epoly
1 0 0 0 543.722 293.121 529.898 288.612 507.785 257.274 521.65 262.216 0.533333 0.533333 0.533333 epoly
1 0 0 0 500.644 377.422 472.419 365.581 514.881 380.319 0.662745 0.662745 0.662745 epoly
1 0 0 0 451.46 286.915 444.533 308.398 413.436 299.982 420.553 277.702 0.490196 0.490196 0.490196 epoly
1 0 0 0 609.523 536.094 621.843 536.174 602.514 538.66 590.03 538.626 0.745098 0.745098 0.745098 epoly
1 0 0 0 651.555 450.065 619.52 436.376 607.4 434.526 639.679 448.414 0.658824 0.658824 0.658824 epoly
1 0 0 0 571.104 541.085 594.622 579.424 590.032 538.627 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 585.54 498.706 568.328 458.192 572.663 497.954 0.47451 0.47451 0.47451 epoly
1 0 0 0 582.907 415.033 587.419 454.478 564.081 419.281 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 471.821 318.587 486.486 322.507 479.439 344.085 464.677 340.56 0.490196 0.490196 0.490196 epoly
1 0 0 0 514.882 380.319 544.578 392.69 558.165 395.342 528.622 383.115 0.662745 0.662745 0.662745 epoly
1 0 0 0 479.438 344.085 522.051 358.645 486.191 347.919 0.662745 0.662745 0.662745 epoly
1 0 0 0 647.292 426.277 639.679 448.414 619.52 436.376 626.757 415.198 0.176471 0.176471 0.176471 epoly
1 0 0 0 543.724 293.12 536.472 315.046 493.557 300.845 500.658 279.101 0.231373 0.231373 0.231373 epoly
1 0 0 0 572.663 497.954 559.314 497.175 521.977 503.354 535.592 504.004 0.745098 0.745098 0.745098 epoly
1 0 0 0 457.506 216.26 472.396 221.975 486.49 178.264 471.796 171.74 0.494118 0.494118 0.494118 epoly
1 0 0 0 677.82 408.877 661.228 367.676 666.584 406.508 0.470588 0.470588 0.470588 epoly
1 0 0 0 522.05 358.645 479.439 344.085 507.915 355.349 0.662745 0.662745 0.662745 epoly
1 0 0 0 444.533 308.398 434.922 307.218 442.117 284.843 451.46 286.915 0.466667 0.466667 0.466667 epoly
1 0 0 0 451.46 286.915 442.117 284.843 434.922 307.218 444.533 308.398 0.466667 0.466667 0.466667 epoly
1 0 0 0 602.293 410.658 571.273 397.9 564.083 419.282 594.842 432.61 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 422.144 180.914 437.539 187.204 457.507 216.258 442.073 210.334 0.537255 0.537255 0.537255 epoly
1 0 0 0 472.419 365.581 500.644 377.422 507.915 355.349 479.439 344.085 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 493.412 325.853 486.484 322.506 479.438 344.085 486.191 347.919 0.172549 0.172549 0.172549 epoly
1 0 0 0 471.821 318.587 486.486 322.507 493.559 300.846 478.993 296.529 0.490196 0.490196 0.490196 epoly
1 0 0 0 500.661 279.102 464.658 267.374 457.534 289.426 493.561 300.846 0.439216 0.439216 0.439216 epoly
1 0 0 0 572.663 497.954 542.675 482.943 529.159 481.918 559.314 497.175 0.662745 0.662745 0.662745 epoly
1 0 0 0 493.412 325.853 529.248 336.888 486.484 322.506 0.662745 0.662745 0.662745 epoly
1 0 0 0 451.457 286.914 463.892 292.053 436.281 282.39 0.662745 0.662745 0.662745 epoly
1 0 0 0 572.661 497.956 585.538 498.708 600.086 456.002 587.421 454.477 0.482353 0.482353 0.482353 epoly
1 0 0 0 627.05 430.463 600.084 456.004 614.742 412.968 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 413.436 299.982 387.51 290.214 380.662 311.824 406.347 322.174 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 422.144 180.914 449.303 187.699 464.637 194.042 437.539 187.204 0.8 0.8 0.8 epoly
1 0 0 0 456.619 314.525 444.531 308.397 471.821 318.587 0.662745 0.662745 0.662745 epoly
1 0 0 0 525.328 442.709 550.871 417.112 562.43 434.772 536.368 460.402 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 449.303 187.699 437.539 187.204 464.637 194.042 0.8 0.8 0.8 epoly
1 0 0 0 582.907 415.033 564.081 419.281 550.87 417.111 569.839 412.753 0.752941 0.752941 0.752941 epoly
1 0 0 0 594.622 579.421 571.104 541.085 602.058 557.8 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 464.656 267.374 493.559 300.846 457.533 289.425 0.439216 0.439216 0.439216 epoly
1 0 0 0 572.663 497.954 558.018 541.096 553.857 501.023 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 511.407 440.954 522.467 458.945 536.37 460.4 525.329 442.707 0.537255 0.537255 0.537255 epoly
1 0 0 0 497.089 192.659 507.964 207.427 522.126 213.366 511.264 198.783 0.533333 0.533333 0.533333 epoly
1 0 0 0 444.533 308.398 451.46 286.915 463.894 292.054 456.621 314.525 0.172549 0.172549 0.172549 epoly
1 0 0 0 451.458 286.914 444.531 308.397 456.619 314.525 463.893 292.053 0.172549 0.172549 0.172549 epoly
1 0 0 0 617.025 496.404 636.642 493.287 624.543 492.427 604.753 495.613 0.745098 0.745098 0.745098 epoly
1 0 0 0 444.453 165.491 437.539 187.204 449.303 187.699 456.562 164.975 0.172549 0.172549 0.172549 epoly
1 0 0 0 413.436 299.982 444.533 308.398 434.922 307.218 0.666667 0.666667 0.666667 epoly
1 0 0 0 511.407 440.954 486.481 466.189 522.467 458.945 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 666.582 406.509 677.818 408.878 692.741 365.766 681.731 362.609 0.482353 0.482353 0.482353 epoly
1 0 0 0 550.871 417.112 525.328 442.709 537.178 414.862 0.698039 0.698039 0.698039 epoly
1 0 0 0 497.089 192.659 472.396 221.975 507.964 207.427 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 614.399 577.478 594.62 579.423 602.514 538.66 621.843 536.174 0.270588 0.270588 0.270588 epoly
1 0 0 0 602.058 557.8 571.104 541.085 609.523 536.094 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 493.412 325.853 486.484 322.506 493.557 300.845 500.661 303.701 0.172549 0.172549 0.172549 epoly
1 0 0 0 406.347 322.174 380.661 311.824 399.285 344.28 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 493.557 300.845 536.472 315.046 500.661 303.701 0.662745 0.662745 0.662745 epoly
1 0 0 0 443.329 260.431 471.194 269.493 458.41 265.349 0.8 0.8 0.8 epoly
1 0 0 0 507.785 257.274 522.125 213.363 525.969 250.576 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 478.993 296.529 451.458 286.914 463.893 292.053 0.662745 0.662745 0.662745 epoly
1 0 0 0 471.795 171.739 444.453 165.491 456.562 164.975 0.803922 0.803922 0.803922 epoly
1 0 0 0 587.42 454.477 574.29 452.896 536.368 460.399 549.784 461.804 0.74902 0.74902 0.74902 epoly
1 0 0 0 573.014 204.557 559.618 198.386 522.124 213.366 535.79 219.096 0.772549 0.772549 0.772549 epoly
1 0 0 0 585.539 498.706 577.093 538.593 572.662 497.954 0.47451 0.47451 0.47451 epoly
1 0 0 0 600.086 456.002 639.679 448.414 607.4 434.526 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 471.194 269.493 463.892 292.053 451.457 286.914 458.41 265.349 0.172549 0.172549 0.172549 epoly
1 0 0 0 515.153 480.856 486.481 466.187 507.869 502.681 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 401.365 318.905 406.348 322.175 413.437 299.982 408.285 297.206 0.172549 0.172549 0.172549 epoly
1 0 0 0 500.644 377.422 479.439 344.085 507.915 355.349 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 442.117 284.843 451.46 286.915 420.553 277.702 0.662745 0.662745 0.662745 epoly
1 0 0 0 500.677 229.833 472.396 221.973 493.421 252.152 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 454.417 179.585 457.506 216.26 471.796 171.74 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 500.644 377.422 514.881 380.319 507.74 401.909 493.402 399.408 0.486275 0.486275 0.486275 epoly
1 0 0 0 507.939 281.462 500.658 279.101 493.557 300.845 500.661 303.701 0.172549 0.172549 0.172549 epoly
1 0 0 0 587.42 454.477 556.919 440.583 543.606 438.797 574.29 452.896 0.662745 0.662745 0.662745 epoly
1 0 0 0 574.29 452.895 543.606 438.797 556.92 440.583 587.42 454.477 0.662745 0.662745 0.662745 epoly
1 0 0 0 486.489 178.264 515.276 184.932 507.963 207.427 479.429 200.161 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 434.922 307.218 444.533 308.398 456.621 314.525 0.666667 0.666667 0.666667 epoly
1 0 0 0 573.014 204.557 542.9 197.413 529.335 191.284 559.618 198.386 0.803922 0.803922 0.803922 epoly
1 0 0 0 507.939 281.462 543.724 293.12 500.658 279.101 0.8 0.8 0.8 epoly
1 0 0 0 600.084 456.004 587.419 454.479 602.292 410.658 614.742 412.968 0.482353 0.482353 0.482353 epoly
1 0 0 0 406.347 322.174 399.285 344.28 415.299 347.761 422.266 326.054 0.490196 0.490196 0.490196 epoly
1 0 0 0 507.963 207.427 472.396 221.973 500.677 229.833 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 624.543 492.427 600.086 456 604.753 495.613 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 592.033 494.793 604.753 495.613 585.539 498.706 572.662 497.954 0.745098 0.745098 0.745098 epoly
1 0 0 0 677.818 408.876 672.057 446.196 666.583 406.507 0.470588 0.470588 0.470588 epoly
1 0 0 0 568.326 458.193 572.661 497.956 587.421 454.477 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 558.019 541.094 571.104 541.085 594.622 579.421 581.625 580.135 0.537255 0.537255 0.537255 epoly
1 0 0 0 587.419 454.478 574.289 452.897 550.87 417.111 564.081 419.281 0.537255 0.537255 0.537255 epoly
1 0 0 0 574.29 452.895 587.42 454.477 564.083 419.282 550.871 417.112 0.537255 0.537255 0.537255 epoly
1 0 0 0 626.767 576.813 631.799 618.351 607.159 578.733 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 609.523 536.094 604.753 495.611 621.843 536.174 0.47451 0.47451 0.47451 epoly
1 0 0 0 521.977 503.354 559.314 497.175 529.159 481.918 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 515.153 480.856 507.869 502.681 521.977 503.354 529.159 481.918 0.482353 0.482353 0.482353 epoly
1 0 0 0 500.644 377.422 514.881 380.319 522.05 358.645 507.915 355.349 0.486275 0.486275 0.486275 epoly
1 0 0 0 529.248 336.888 493.412 325.853 486.191 347.919 522.051 358.645 0.431373 0.431373 0.431373 epoly
1 0 0 0 522.051 358.645 486.191 347.919 493.412 325.853 529.248 336.888 0.427451 0.427451 0.427451 epoly
1 0 0 0 558.019 541.094 589.171 558.117 602.058 557.8 571.104 541.085 0.666667 0.666667 0.666667 epoly
1 0 0 0 571.104 541.085 602.058 557.8 589.171 558.117 558.019 541.094 0.662745 0.662745 0.662745 epoly
1 0 0 0 500.677 229.833 493.421 252.152 507.787 257.274 514.942 235.362 0.494118 0.494118 0.494118 epoly
1 0 0 0 463.894 292.054 451.46 286.915 442.117 284.843 0.662745 0.662745 0.662745 epoly
1 0 0 0 479.439 344.085 493.259 351.933 464.677 340.56 0.662745 0.662745 0.662745 epoly
1 0 0 0 687.395 401.966 698.424 404.452 677.818 408.876 666.583 406.507 0.74902 0.74902 0.74902 epoly
1 0 0 0 544.456 541.106 540.368 500.31 553.857 501.023 558.018 541.096 0.478431 0.478431 0.478431 epoly
1 0 0 0 558.018 541.096 553.857 501.023 540.368 500.31 544.456 541.106 0.478431 0.478431 0.478431 epoly
1 0 0 0 543.722 293.121 539.714 255.71 525.969 250.576 529.898 288.612 0.47451 0.47451 0.47451 epoly
1 0 0 0 661.226 367.678 666.582 406.509 681.731 362.609 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 571.104 541.085 558.019 541.094 596.748 536.012 609.523 536.094 0.745098 0.745098 0.745098 epoly
1 0 0 0 507.963 207.425 522.125 213.363 507.785 257.274 493.42 252.152 0.494118 0.494118 0.494118 epoly
1 0 0 0 602.293 410.658 589.385 408.263 550.871 417.112 564.083 419.282 0.74902 0.74902 0.74902 epoly
1 0 0 0 493.412 325.853 456.618 314.524 486.484 322.506 0.662745 0.662745 0.662745 epoly
1 0 0 0 639.68 448.414 600.084 456.004 627.05 430.463 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 486.483 466.188 478.545 471.572 485.883 449.348 493.543 444.844 0.466667 0.466667 0.466667 epoly
1 0 0 0 456.618 314.524 463.891 292.053 493.557 300.845 486.484 322.506 0.490196 0.490196 0.490196 epoly
1 0 0 0 515.276 184.932 486.489 178.264 507.963 207.427 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 464.676 340.56 479.439 344.085 500.644 377.422 485.883 374.418 0.537255 0.537255 0.537255 epoly
1 0 0 0 540.368 500.31 559.315 497.175 572.663 497.954 553.857 501.023 0.74902 0.74902 0.74902 epoly
1 0 0 0 514.942 235.362 522.125 213.366 507.963 207.427 500.677 229.833 0.490196 0.490196 0.490196 epoly
1 0 0 0 602.293 410.658 571.273 397.9 558.165 395.342 589.385 408.263 0.658824 0.658824 0.658824 epoly
1 0 0 0 525.328 442.709 536.368 460.402 548.769 432.819 537.178 414.862 0.286275 0.286275 0.286275 epoly
1 0 0 0 521.975 503.353 544.456 541.106 540.368 500.31 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 471.821 318.587 500.664 329.358 486.486 322.507 0.662745 0.662745 0.662745 epoly
1 0 0 0 604.753 495.611 624.543 492.425 641.747 533.614 621.843 536.174 0.376471 0.376471 0.376471 epoly
1 0 0 0 507.785 257.274 529.898 288.612 525.969 250.576 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 464.676 340.56 493.258 351.933 507.915 355.349 479.439 344.085 0.662745 0.662745 0.662745 epoly
1 0 0 0 500.663 303.702 463.893 292.053 457.533 289.425 493.559 300.846 0.662745 0.662745 0.662745 epoly
1 0 0 0 626.767 576.813 607.159 578.733 594.622 579.421 614.4 577.477 0.741176 0.741176 0.741176 epoly
1 0 0 0 493.557 300.845 463.891 292.053 500.661 303.701 0.662745 0.662745 0.662745 epoly
1 0 0 0 602.294 410.658 587.419 454.478 582.907 415.033 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 596.748 536.014 577.093 538.593 585.539 498.706 604.753 495.613 0.27451 0.27451 0.27451 epoly
1 0 0 0 486.483 466.188 493.543 444.844 508.051 457.436 500.632 479.755 0.172549 0.172549 0.172549 epoly
1 0 0 0 507.743 401.91 500.629 423.418 471.221 419.121 478.538 396.814 0.486275 0.486275 0.486275 epoly
1 0 0 0 500.664 329.358 493.259 351.933 479.439 344.085 486.486 322.507 0.172549 0.172549 0.172549 epoly
1 0 0 0 500.663 303.702 493.559 300.846 464.656 267.374 471.195 269.493 0.647059 0.647059 0.647059 epoly
1 0 0 0 647.292 426.277 614.743 412.968 607.4 434.526 639.679 448.414 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 600.084 456.004 627.05 430.463 614.663 428.443 587.419 454.479 0.694118 0.694118 0.694118 epoly
1 0 0 0 587.419 454.479 614.663 428.443 627.05 430.463 600.084 456.004 0.694118 0.694118 0.694118 epoly
1 0 0 0 536.368 460.399 574.29 452.896 543.606 438.797 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 529.159 481.918 559.315 497.175 551.872 519.183 521.977 503.354 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 522.124 213.366 559.618 198.386 529.335 191.284 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 443.329 260.431 463.892 292.053 436.281 282.39 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 543.724 293.12 507.939 281.462 500.661 303.701 536.472 315.046 0.439216 0.439216 0.439216 epoly
1 0 0 0 515.276 184.932 507.963 207.427 522.124 213.366 529.335 191.284 0.494118 0.494118 0.494118 epoly
1 0 0 0 420.553 277.702 427.698 255.334 443.329 260.431 436.281 282.39 0.494118 0.494118 0.494118 epoly
1 0 0 0 693.187 442.208 672.057 446.196 677.818 408.876 698.424 404.452 0.305882 0.305882 0.305882 epoly
1 0 0 0 493.277 201.269 479.429 200.161 507.963 207.427 0.8 0.8 0.8 epoly
1 0 0 0 584.549 516.735 558.019 541.097 572.662 497.954 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 609.523 536.094 614.399 577.478 621.843 536.174 0.47451 0.47451 0.47451 epoly
1 0 0 0 511.72 245.254 493.42 252.152 507.785 257.274 525.969 250.576 0.772549 0.772549 0.772549 epoly
1 0 0 0 507.743 401.91 500.647 404.633 493.25 427.035 500.629 423.418 0.466667 0.466667 0.466667 epoly
1 0 0 0 500.629 423.418 493.25 427.035 500.647 404.633 507.743 401.91 0.466667 0.466667 0.466667 epoly
1 0 0 0 543.606 438.797 574.29 452.895 550.871 417.112 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 486.489 178.264 479.429 200.161 493.277 201.269 500.697 178.345 0.172549 0.172549 0.172549 epoly
1 0 0 0 544.458 541.104 521.977 503.354 551.872 519.183 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 544.578 392.69 514.882 380.319 537.178 414.862 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 627.05 430.463 614.742 412.968 602.292 410.658 614.663 428.443 0.537255 0.537255 0.537255 epoly
1 0 0 0 529.898 288.61 543.722 293.119 536.47 315.045 522.542 310.944 0.486275 0.486275 0.486275 epoly
1 0 0 0 478.545 471.572 486.483 466.188 500.632 479.755 0.666667 0.666667 0.666667 epoly
1 0 0 0 507.74 401.909 522.977 412.529 493.402 399.408 0.662745 0.662745 0.662745 epoly
1 0 0 0 486.191 347.919 522.051 358.645 493.26 351.933 0.662745 0.662745 0.662745 epoly
1 0 0 0 641.747 533.614 636.643 493.284 662.251 530.977 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 609.523 536.094 621.843 536.174 641.747 533.614 629.606 533.486 0.745098 0.745098 0.745098 epoly
1 0 0 0 515.276 184.932 486.489 178.264 500.697 178.345 0.803922 0.803922 0.803922 epoly
1 0 0 0 639.678 448.413 614.742 412.968 647.291 426.276 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 614.399 577.478 609.523 536.094 590.03 538.626 594.62 579.423 0.0588235 0.0588235 0.0588235 epoly
660.159 210.837 236.76 115.464 517.714 631.58 660.159 210.837 0 0 0 1 lines
1 0 0 0 624.543 492.427 609.523 536.097 604.753 495.613 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 631.799 618.351 619.386 619.791 594.622 579.421 607.159 578.733 0.537255 0.537255 0.537255 epoly
1 0 0 0 500.629 423.418 507.743 401.91 522.978 412.53 515.5 435.028 0.172549 0.172549 0.172549 epoly
1 0 0 0 471.221 419.121 500.629 423.418 493.25 427.035 0.666667 0.666667 0.666667 epoly
1 0 0 0 574.29 452.896 536.367 460.401 562.428 434.771 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 507.963 207.425 511.72 245.254 525.969 250.576 522.125 213.363 0.47451 0.47451 0.47451 epoly
1 0 0 0 550.871 417.112 589.385 408.263 558.165 395.342 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 544.578 392.69 537.178 414.862 550.871 417.112 558.165 395.342 0.482353 0.482353 0.482353 epoly
1 0 0 0 508.051 457.436 493.543 444.844 485.883 449.348 0.666667 0.666667 0.666667 epoly
1 0 0 0 449.375 336.907 429.26 304.264 456.619 314.525 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 449.303 187.699 422.144 180.914 442.073 210.334 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 500.644 377.422 530.485 389.94 514.881 380.319 0.662745 0.662745 0.662745 epoly
1 0 0 0 574.289 452.897 569.839 412.753 582.907 415.033 587.419 454.478 0.47451 0.47451 0.47451 epoly
1 0 0 0 587.419 454.478 582.907 415.033 569.839 412.753 574.289 452.897 0.47451 0.47451 0.47451 epoly
1 0 0 0 500.664 329.358 529.248 336.888 493.412 325.853 0.662745 0.662745 0.662745 epoly
1 0 0 0 471.194 269.493 443.329 260.431 436.281 282.39 463.892 292.053 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 558.019 541.097 544.457 541.106 559.314 497.174 572.662 497.954 0.478431 0.478431 0.478431 epoly
1 0 0 0 544.456 541.106 558.018 541.096 572.663 497.954 559.315 497.175 0.478431 0.478431 0.478431 epoly
1 0 0 0 587.419 454.479 600.084 456.004 639.68 448.414 627.363 446.701 0.74902 0.74902 0.74902 epoly
1 0 0 0 548.769 432.819 536.368 460.402 562.43 434.772 0.698039 0.698039 0.698039 epoly
1 0 0 0 636.643 493.284 641.747 533.614 629.606 533.486 624.543 492.425 0.47451 0.47451 0.47451 epoly
1 0 0 0 659.053 428.328 693.186 442.206 651.554 450.065 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 530.485 389.94 522.977 412.529 507.74 401.909 514.881 380.319 0.172549 0.172549 0.172549 epoly
1 0 0 0 514.884 380.319 508.074 382.141 515.531 359.559 522.052 358.645 0.466667 0.466667 0.466667 epoly
1 0 0 0 522.051 358.645 529.248 336.888 500.664 329.358 493.26 351.933 0.486275 0.486275 0.486275 epoly
1 0 0 0 659.053 428.328 651.554 450.065 639.678 448.414 647.291 426.276 0.478431 0.478431 0.478431 epoly
1 0 0 0 500.647 404.633 507.743 401.91 478.538 396.814 0.662745 0.662745 0.662745 epoly
1 0 0 0 507.869 502.682 521.977 503.354 544.458 541.104 530.392 541.114 0.537255 0.537255 0.537255 epoly
1 0 0 0 624.541 492.427 636.641 493.286 649.28 511.888 637.254 511.36 0.537255 0.537255 0.537255 epoly
1 0 0 0 569.839 412.753 589.385 408.263 602.294 410.658 582.907 415.033 0.752941 0.752941 0.752941 epoly
1 0 0 0 493.25 427.035 500.629 423.418 515.5 435.028 0.666667 0.666667 0.666667 epoly
1 0 0 0 522.465 458.946 548.768 432.818 562.428 434.771 536.367 460.401 0.698039 0.698039 0.698039 epoly
1 0 0 0 550.87 417.111 574.289 452.897 569.839 412.753 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 471.821 318.587 500.664 329.358 464.677 340.56 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 471.821 318.587 464.677 340.56 449.375 336.907 456.62 314.525 0.490196 0.490196 0.490196 epoly
1 0 0 0 507.869 502.682 537.916 518.785 551.872 519.183 521.977 503.354 0.666667 0.666667 0.666667 epoly
1 0 0 0 449.303 187.699 442.073 210.334 457.507 216.258 464.637 194.042 0.498039 0.498039 0.498039 epoly
1 0 0 0 537.916 518.785 521.977 503.354 551.872 519.183 0.666667 0.666667 0.666667 epoly
1 0 0 0 624.541 492.427 652.641 466.837 636.641 493.286 0.694118 0.694118 0.694118 epoly
1 0 0 0 604.753 495.611 609.523 536.094 629.606 533.486 624.543 492.425 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 602.293 410.658 614.742 412.968 639.678 448.413 627.361 446.701 0.537255 0.537255 0.537255 epoly
1 0 0 0 529.159 481.918 521.977 503.354 537.916 518.785 545.47 496.366 0.172549 0.172549 0.172549 epoly
1 0 0 0 514.884 380.319 522.052 358.645 538.026 367.261 530.487 389.941 0.172549 0.172549 0.172549 epoly
1 0 0 0 536.472 315.046 529.248 336.888 500.663 329.357 508.097 306.691 0.486275 0.486275 0.486275 epoly
1 0 0 0 463.893 292.053 471.195 269.493 464.656 267.374 457.533 289.425 0.172549 0.172549 0.172549 epoly
1 0 0 0 596.75 536.013 558.019 541.097 584.549 516.735 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 558.165 395.342 589.385 408.263 581.823 430.624 550.872 417.112 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 522.978 412.53 507.743 401.91 500.647 404.633 0.662745 0.662745 0.662745 epoly
1 0 0 0 602.293 410.658 635.091 424.148 647.291 426.276 614.742 412.968 0.658824 0.658824 0.658824 epoly
1 0 0 0 413.436 299.982 429.26 304.264 449.375 336.907 433.504 333.118 0.537255 0.537255 0.537255 epoly
1 0 0 0 596.748 536.014 592.033 494.793 604.753 495.613 609.523 536.097 0.47451 0.47451 0.47451 epoly
1 0 0 0 550.871 417.112 537.178 414.862 548.769 432.819 562.43 434.772 0.537255 0.537255 0.537255 epoly
1 0 0 0 594.622 579.421 609.525 536.093 614.4 577.477 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 478.993 296.529 463.893 292.053 456.619 314.525 471.821 318.587 0.490196 0.490196 0.490196 epoly
1 0 0 0 592.033 494.793 596.748 536.014 604.753 495.613 0.47451 0.47451 0.47451 epoly
1 0 0 0 471.795 171.739 456.562 164.975 449.303 187.699 464.637 194.042 0.498039 0.498039 0.498039 epoly
1 0 0 0 559.315 497.175 529.159 481.918 545.47 496.366 0.662745 0.662745 0.662745 epoly
1 0 0 0 482.4 335.043 485.883 374.42 464.676 340.56 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 602.292 410.658 587.419 454.479 614.663 428.443 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 413.436 299.982 440.851 310.31 456.619 314.525 429.26 304.264 0.666667 0.666667 0.666667 epoly
1 0 0 0 529.248 336.888 523.017 336.885 530.534 314.121 536.472 315.046 0.466667 0.466667 0.466667 epoly
1 0 0 0 536.472 315.046 530.534 314.121 523.017 336.885 529.248 336.888 0.466667 0.466667 0.466667 epoly
1 0 0 0 589.171 558.117 558.019 541.094 581.625 580.135 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 574.29 452.896 550.872 417.112 581.823 430.624 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 540.368 500.31 544.456 541.106 559.315 497.175 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 592.033 494.793 611.995 491.536 624.543 492.427 604.753 495.613 0.745098 0.745098 0.745098 epoly
1 0 0 0 558.019 541.097 584.549 516.735 571.244 516.294 544.457 541.106 0.694118 0.694118 0.694118 epoly
1 0 0 0 544.457 541.106 571.244 516.294 584.549 516.735 558.019 541.097 0.694118 0.694118 0.694118 epoly
1 0 0 0 687.395 401.966 693.187 442.208 698.424 404.452 0.470588 0.470588 0.470588 epoly
1 0 0 0 508.074 382.141 514.884 380.319 530.487 389.941 0.662745 0.662745 0.662745 epoly
1 0 0 0 592.033 494.793 596.748 536.014 572.662 497.954 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 536.47 315.045 553.194 321.625 522.542 310.944 0.658824 0.658824 0.658824 epoly
1 0 0 0 596.748 536.014 592.033 494.793 572.662 497.954 577.093 538.593 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 596.748 536.012 558.019 541.094 589.171 558.117 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 500.664 329.358 471.821 318.587 464.677 340.56 493.259 351.933 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 641.747 533.614 624.543 492.425 629.606 533.486 0.47451 0.47451 0.47451 epoly
1 0 0 0 448.228 287.411 420.553 277.702 436.281 282.39 463.892 292.053 0.662745 0.662745 0.662745 epoly
1 0 0 0 511.72 245.254 507.963 207.425 493.42 252.152 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 636.643 493.284 624.543 492.425 650.306 530.798 662.251 530.977 0.537255 0.537255 0.537255 epoly
1 0 0 0 522.465 458.946 536.367 460.401 574.29 452.896 560.669 451.256 0.74902 0.74902 0.74902 epoly
1 0 0 0 529.248 336.888 536.472 315.046 553.196 321.625 545.596 344.489 0.172549 0.172549 0.172549 epoly
1 0 0 0 456.618 314.524 493.412 325.853 500.661 303.701 463.891 292.053 0.431373 0.431373 0.431373 epoly
1 0 0 0 500.663 329.357 529.248 336.888 523.017 336.885 0.662745 0.662745 0.662745 epoly
1 0 0 0 442.117 284.843 420.553 277.702 413.436 299.982 434.922 307.218 0.227451 0.227451 0.227451 epoly
1 0 0 0 482.4 335.043 464.676 340.56 449.374 336.907 467.193 331.231 0.764706 0.764706 0.764706 epoly
1 0 0 0 693.187 442.208 687.395 401.966 666.583 406.507 672.057 446.196 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 589.171 558.117 581.625 580.135 594.622 579.421 602.058 557.8 0.478431 0.478431 0.478431 epoly
1 0 0 0 500.644 377.422 522.977 412.529 493.402 399.408 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 538.026 367.261 522.052 358.645 515.531 359.559 0.662745 0.662745 0.662745 epoly
1 0 0 0 493.258 351.933 464.676 340.56 485.883 374.418 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 478.526 246.842 457.507 216.258 485.887 224.101 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 529.898 288.61 560.826 298.668 543.722 293.119 0.8 0.8 0.8 epoly
1 0 0 0 631.799 618.351 626.767 576.813 614.4 577.477 619.386 619.791 0.47451 0.47451 0.47451 epoly
1 0 0 0 448.228 287.411 463.892 292.053 443.329 260.431 427.698 255.334 0.537255 0.537255 0.537255 epoly
1 0 0 0 584.549 516.735 572.662 497.954 559.314 497.174 571.244 516.294 0.537255 0.537255 0.537255 epoly
1 0 0 0 478.538 396.814 485.883 374.418 500.644 377.422 493.402 399.408 0.486275 0.486275 0.486275 epoly
1 0 0 0 596.75 536.01 609.525 536.093 594.622 579.421 581.625 580.135 0.478431 0.478431 0.478431 epoly
1 0 0 0 574.289 452.897 587.419 454.478 602.294 410.658 589.385 408.263 0.482353 0.482353 0.482353 epoly
1 0 0 0 652.641 466.837 665.953 485.758 649.28 511.888 636.641 493.286 0.290196 0.290196 0.290196 epoly
1 0 0 0 592.033 494.793 572.662 497.954 559.314 497.174 578.84 493.943 0.745098 0.745098 0.745098 epoly
1 0 0 0 560.826 298.668 553.194 321.625 536.47 315.045 543.722 293.119 0.172549 0.172549 0.172549 epoly
1 0 0 0 486.191 347.919 493.26 351.933 500.664 329.358 493.412 325.853 0.172549 0.172549 0.172549 epoly
1 0 0 0 530.534 314.121 536.472 315.046 508.097 306.691 0.658824 0.658824 0.658824 epoly
1 0 0 0 413.436 299.982 420.553 277.702 463.893 292.053 456.619 314.525 0.227451 0.227451 0.227451 epoly
1 0 0 0 537.179 414.863 550.872 417.112 574.29 452.896 560.669 451.256 0.537255 0.537255 0.537255 epoly
1 0 0 0 602.058 557.8 609.523 536.094 596.748 536.012 589.171 558.117 0.478431 0.478431 0.478431 epoly
1 0 0 0 523.017 336.885 529.248 336.888 545.596 344.489 0.662745 0.662745 0.662745 epoly
1 0 0 0 649.28 511.888 677.658 486.766 662.251 530.977 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 594.622 579.421 619.386 619.791 614.4 577.477 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 607.09 450.647 611.993 491.538 587.419 454.476 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 500.677 229.833 530.581 238.145 493.421 252.152 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 493.258 351.933 485.883 374.418 500.644 377.422 507.915 355.349 0.486275 0.486275 0.486275 epoly
1 0 0 0 500.677 229.833 493.421 252.152 478.526 246.842 485.887 224.101 0.494118 0.494118 0.494118 epoly
1 0 0 0 537.179 414.863 568.315 428.563 581.823 430.624 550.872 417.112 0.662745 0.662745 0.662745 epoly
1 0 0 0 463.893 292.053 500.663 303.702 471.195 269.493 0.435294 0.435294 0.435294 epoly
1 0 0 0 568.315 428.563 550.872 417.112 581.823 430.624 0.662745 0.662745 0.662745 epoly
1 0 0 0 614.663 428.443 627.363 446.701 639.68 448.414 627.05 430.463 0.537255 0.537255 0.537255 epoly
1 0 0 0 544.457 541.106 558.019 541.097 596.75 536.013 583.495 535.927 0.745098 0.745098 0.745098 epoly
1 0 0 0 558.165 395.342 550.872 417.112 568.315 428.563 575.992 405.778 0.172549 0.172549 0.172549 epoly
1 0 0 0 614.663 428.443 587.419 454.479 627.363 446.701 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 617.017 514.303 650.304 530.797 609.523 536.094 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 617.017 514.303 609.523 536.094 596.748 536.012 604.356 513.818 0.478431 0.478431 0.478431 epoly
1 0 0 0 553.196 321.625 536.472 315.046 530.534 314.121 0.658824 0.658824 0.658824 epoly
1 0 0 0 485.883 374.42 470.568 371.304 449.374 336.907 464.676 340.56 0.537255 0.537255 0.537255 epoly
1 0 0 0 442.074 210.334 457.507 216.258 478.526 246.842 463.073 241.333 0.537255 0.537255 0.537255 epoly
1 0 0 0 530.485 389.94 500.644 377.422 493.402 399.408 522.977 412.529 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 500.677 229.833 485.887 224.101 493.277 201.269 507.963 207.427 0.494118 0.494118 0.494118 epoly
1 0 0 0 434.922 307.218 456.621 314.525 463.894 292.054 442.117 284.843 0.227451 0.227451 0.227451 epoly
1 0 0 0 589.385 408.263 558.165 395.342 575.992 405.778 0.658824 0.658824 0.658824 epoly
1 0 0 0 596.748 536.014 609.523 536.097 624.543 492.427 611.995 491.536 0.478431 0.478431 0.478431 epoly
1 0 0 0 511.72 245.254 515.561 283.936 493.42 252.152 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 693.186 442.206 681.726 440.355 639.678 448.414 651.554 450.065 0.745098 0.745098 0.745098 epoly
1 0 0 0 442.074 210.334 470.54 218.153 485.887 224.101 457.507 216.258 0.8 0.8 0.8 epoly
1 0 0 0 601.572 578.165 581.625 580.135 594.622 579.421 614.4 577.477 0.741176 0.741176 0.741176 epoly
1 0 0 0 607.09 450.647 587.419 454.476 574.289 452.895 594.125 448.971 0.74902 0.74902 0.74902 epoly
1 0 0 0 624.541 492.427 650.304 530.797 617.017 514.303 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 569.839 412.753 574.289 452.897 589.385 408.263 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 596.748 536.014 583.494 535.929 559.314 497.174 572.662 497.954 0.537255 0.537255 0.537255 epoly
1 0 0 0 604.356 513.818 611.993 491.535 624.541 492.427 617.017 514.303 0.478431 0.478431 0.478431 epoly
1 0 0 0 500.664 329.358 485.565 325.38 449.375 336.907 464.677 340.56 0.764706 0.764706 0.764706 epoly
1 0 0 0 641.747 533.614 662.251 530.977 650.306 530.798 629.606 533.486 0.745098 0.745098 0.745098 epoly
1 0 0 0 693.186 442.206 659.053 428.328 647.291 426.276 681.726 440.355 0.658824 0.658824 0.658824 epoly
1 0 0 0 664.436 468.178 693.188 442.204 677.658 486.769 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 440.851 310.31 413.436 299.982 456.619 314.525 0.662745 0.662745 0.662745 epoly
1 0 0 0 420.553 277.702 448.228 287.411 427.698 255.334 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 515.276 184.932 500.697 178.345 493.277 201.269 507.963 207.427 0.494118 0.494118 0.494118 epoly
1 0 0 0 544.456 541.104 559.315 497.173 563.678 538.555 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 500.664 329.358 471.821 318.587 456.62 314.525 485.565 325.38 0.662745 0.662745 0.662745 epoly
1 0 0 0 649.28 511.888 662.251 530.977 650.306 530.798 637.254 511.36 0.537255 0.537255 0.537255 epoly
1 0 0 0 559.314 497.174 544.457 541.106 571.244 516.294 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 596.75 536.01 601.572 578.165 614.4 577.477 609.525 536.093 0.47451 0.47451 0.47451 epoly
1 0 0 0 511.72 245.254 493.42 252.152 478.525 246.842 496.938 239.733 0.772549 0.772549 0.772549 epoly
1 0 0 0 529.898 288.61 553.194 321.625 522.542 310.944 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 537.916 518.785 507.869 502.682 530.392 541.114 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 649.28 511.888 665.953 485.758 637.254 511.36 0.694118 0.694118 0.694118 epoly
1 0 0 0 500.677 229.833 530.581 238.145 485.887 224.101 0.8 0.8 0.8 epoly
1 0 0 0 500.664 329.358 485.883 374.42 482.4 335.043 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 463.893 292.053 420.553 277.702 448.228 287.411 0.662745 0.662745 0.662745 epoly
1 0 0 0 508.097 306.691 515.561 283.934 529.898 288.61 522.542 310.944 0.486275 0.486275 0.486275 epoly
1 0 0 0 530.581 238.145 500.677 229.833 507.963 207.427 538.136 215.111 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 677.658 486.766 649.28 511.888 637.254 511.36 665.953 485.758 0.694118 0.694118 0.694118 epoly
1 0 0 0 413.436 299.982 440.851 310.31 448.228 287.411 420.553 277.702 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 650.306 530.798 624.543 492.425 629.606 533.486 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 635.091 424.148 602.293 410.658 627.361 446.701 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 592.033 494.793 596.748 536.014 611.995 491.536 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 548.768 432.818 560.669 451.256 574.29 452.896 562.428 434.771 0.537255 0.537255 0.537255 epoly
1 0 0 0 611.993 491.538 598.972 490.613 574.289 452.895 587.419 454.476 0.537255 0.537255 0.537255 epoly
1 0 0 0 493.277 201.269 538.136 215.111 507.963 207.427 0.8 0.8 0.8 epoly
1 0 0 0 644.932 489.144 650.304 530.8 624.541 492.427 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 548.768 432.818 522.465 458.946 560.669 451.256 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 592.033 494.793 596.748 536.014 578.84 493.943 0.47451 0.47451 0.47451 epoly
1 0 0 0 537.916 518.785 530.392 541.114 544.458 541.104 551.872 519.183 0.482353 0.482353 0.482353 epoly
1 0 0 0 440.851 310.31 413.436 299.982 433.504 333.118 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 559.314 497.174 574.291 452.893 578.84 493.943 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 508.238 410.108 478.538 396.814 493.402 399.408 522.977 412.529 0.662745 0.662745 0.662745 epoly
1 0 0 0 664.436 468.178 677.658 486.769 665.953 485.761 652.642 466.84 0.537255 0.537255 0.537255 epoly
1 0 0 0 545.47 496.364 559.315 497.173 544.456 541.104 530.391 541.113 0.482353 0.482353 0.482353 epoly
1 0 0 0 500.647 404.633 478.538 396.814 471.221 419.121 493.25 427.035 0.231373 0.231373 0.231373 epoly
1 0 0 0 665.953 485.761 624.541 492.429 652.642 466.84 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 639.678 448.414 681.726 440.355 647.291 426.276 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 652.641 466.837 624.541 492.427 637.254 511.36 665.953 485.758 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 635.091 424.148 627.361 446.701 639.678 448.413 647.291 426.276 0.482353 0.482353 0.482353 epoly
1 0 0 0 508.238 410.108 522.977 412.529 500.644 377.422 485.883 374.418 0.537255 0.537255 0.537255 epoly
1 0 0 0 515.561 283.936 500.682 279.083 478.525 246.842 493.42 252.152 0.533333 0.533333 0.533333 epoly
1 0 0 0 559.315 497.175 545.47 496.366 537.916 518.785 551.872 519.183 0.482353 0.482353 0.482353 epoly
1 0 0 0 560.826 298.668 529.898 288.61 522.542 310.944 553.194 321.625 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 478.545 471.572 500.632 479.755 508.051 457.436 485.883 449.348 0.227451 0.227451 0.227451 epoly
1 0 0 0 693.188 442.204 664.436 468.178 652.642 466.84 681.728 440.354 0.694118 0.694118 0.694118 epoly
1 0 0 0 449.375 336.907 485.565 325.38 456.62 314.525 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 440.851 310.31 433.504 333.118 449.375 336.907 456.619 314.525 0.490196 0.490196 0.490196 epoly
1 0 0 0 538.135 215.111 507.962 207.427 545.72 191.984 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 644.932 489.144 624.541 492.427 611.993 491.535 632.574 488.178 0.745098 0.745098 0.745098 epoly
1 0 0 0 470.568 371.304 467.193 331.231 482.4 335.043 485.883 374.42 0.482353 0.482353 0.482353 epoly
1 0 0 0 485.883 374.42 482.4 335.043 467.193 331.231 470.568 371.304 0.482353 0.482353 0.482353 epoly
1 0 0 0 596.748 536.014 592.033 494.793 611.995 491.536 617.01 533.356 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 471.222 419.121 478.538 396.814 522.977 412.529 515.498 435.028 0.227451 0.227451 0.227451 epoly
1 0 0 0 471.221 419.121 485.885 374.416 489.447 414.684 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 571.244 516.294 583.495 535.927 596.75 536.013 584.549 516.735 0.537255 0.537255 0.537255 epoly
1 0 0 0 530.581 238.145 515.926 232.402 478.526 246.842 493.421 252.152 0.772549 0.772549 0.772549 epoly
1 0 0 0 611.994 491.538 640.403 465.451 652.642 466.84 624.541 492.429 0.694118 0.694118 0.694118 epoly
1 0 0 0 571.244 516.294 544.457 541.106 583.495 535.927 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 493.25 427.035 515.5 435.028 508.051 457.436 485.883 449.348 0.231373 0.231373 0.231373 epoly
1 0 0 0 596.748 536.014 592.033 494.793 578.84 493.943 583.494 535.929 0.47451 0.47451 0.47451 epoly
1 0 0 0 601.572 578.165 596.75 536.01 581.625 580.135 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 440.851 310.31 456.619 314.525 463.893 292.053 448.228 287.411 0.490196 0.490196 0.490196 epoly
1 0 0 0 467.193 331.231 485.565 325.38 500.664 329.358 482.4 335.043 0.764706 0.764706 0.764706 epoly
1 0 0 0 530.581 238.145 500.677 229.833 485.887 224.101 515.926 232.402 0.8 0.8 0.8 epoly
1 0 0 0 560.669 451.253 574.291 452.893 559.314 497.174 545.468 496.365 0.482353 0.482353 0.482353 epoly
1 0 0 0 449.374 336.907 470.568 371.304 467.193 331.231 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 650.304 530.797 637.904 530.611 596.748 536.012 609.523 536.094 0.745098 0.745098 0.745098 epoly
660.159 210.837 517.714 631.58 716.922 608.476 827.815 296.912 660.159 210.837 0 0 0 1 lines
1 0 0 0 549.757 538.517 530.391 541.113 544.456 541.104 563.678 538.555 0.745098 0.745098 0.745098 epoly
1 0 0 0 568.315 428.563 537.179 414.863 560.669 451.256 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 530.581 238.145 515.561 283.936 511.72 245.254 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 592.033 494.793 578.84 493.943 598.974 490.611 611.995 491.536 0.745098 0.745098 0.745098 epoly
1 0 0 0 549.755 538.516 559.314 497.172 563.677 538.554 0.478431 0.478431 0.478431 epoly
1 0 0 0 650.304 530.797 617.017 514.303 604.356 513.818 637.904 530.611 0.662745 0.662745 0.662745 epoly
1 0 0 0 637.904 530.611 604.356 513.818 617.017 514.303 650.304 530.797 0.662745 0.662745 0.662745 epoly
1 0 0 0 493.25 427.035 515.5 435.028 522.978 412.53 500.647 404.633 0.231373 0.231373 0.231373 epoly
1 0 0 0 559.314 497.174 583.494 535.929 578.84 493.943 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 677.658 486.766 665.953 485.758 650.306 530.798 662.251 530.977 0.478431 0.478431 0.478431 epoly
1 0 0 0 578.841 493.941 583.494 535.926 563.677 538.554 559.314 497.172 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 456.619 314.524 485.564 325.379 478.051 348.387 449.374 336.907 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 455.636 264.418 471.195 269.493 463.893 292.053 448.228 287.411 0.494118 0.494118 0.494118 epoly
1 0 0 0 507.962 207.427 538.135 215.111 523.593 208.918 493.276 201.268 0.8 0.8 0.8 epoly
1 0 0 0 598.972 490.611 607.09 450.645 611.993 491.535 0.47451 0.47451 0.47451 epoly
1 0 0 0 627.363 446.699 632.574 488.178 611.993 491.535 607.09 450.645 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 508.122 231.088 485.885 224.1 493.276 201.268 515.594 208.155 0.231373 0.231373 0.231373 epoly
1 0 0 0 574.29 452.896 578.84 493.945 560.669 451.256 0.47451 0.47451 0.47451 epoly
1 0 0 0 637.904 530.611 650.304 530.797 624.541 492.427 611.993 491.535 0.537255 0.537255 0.537255 epoly
1 0 0 0 650.304 530.8 637.905 530.614 611.993 491.535 624.541 492.427 0.537255 0.537255 0.537255 epoly
1 0 0 0 470.57 371.3 485.885 374.416 471.221 419.121 455.694 416.852 0.486275 0.486275 0.486275 epoly
1 0 0 0 507.962 207.427 493.276 201.268 531.293 185.337 545.72 191.984 0.780392 0.780392 0.780392 epoly
1 0 0 0 545.47 496.364 549.757 538.517 563.678 538.555 559.315 497.173 0.478431 0.478431 0.478431 epoly
1 0 0 0 500.649 433.036 471.222 419.121 515.498 435.028 0.666667 0.666667 0.666667 epoly
1 0 0 0 478.538 396.814 508.238 410.108 485.883 374.418 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 568.315 428.563 560.669 451.256 574.29 452.896 581.823 430.624 0.482353 0.482353 0.482353 epoly
1 0 0 0 470.568 371.302 449.374 336.907 478.051 348.387 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 470.54 218.153 442.074 210.334 463.073 241.333 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 611.993 491.538 607.09 450.647 594.125 448.971 598.972 490.613 0.47451 0.47451 0.47451 epoly
1 0 0 0 603.092 470.331 607.092 450.646 627.365 446.7 623.61 466.631 0.282353 0.282353 0.282353 epoly
1 0 0 0 538.911 317.45 508.097 306.691 522.542 310.944 553.194 321.625 0.658824 0.658824 0.658824 epoly
1 0 0 0 611.994 491.538 624.541 492.429 665.953 485.761 653.801 484.714 0.745098 0.745098 0.745098 epoly
1 0 0 0 530.534 314.121 508.097 306.691 500.663 329.357 523.017 336.885 0.231373 0.231373 0.231373 epoly
1 0 0 0 530.581 238.145 538.136 215.111 493.277 201.269 485.887 224.101 0.231373 0.231373 0.231373 epoly
1 0 0 0 565.148 493.061 545.468 496.365 559.314 497.174 578.84 493.943 0.74902 0.74902 0.74902 epoly
1 0 0 0 603.092 470.331 580.668 447.234 607.092 450.646 0.47451 0.47451 0.47451 epoly
1 0 0 0 538.911 317.45 553.194 321.625 529.898 288.61 515.561 283.934 0.533333 0.533333 0.533333 epoly
1 0 0 0 522.977 412.529 478.538 396.814 508.239 410.108 0.662745 0.662745 0.662745 epoly
1 0 0 0 589.385 408.263 575.992 405.778 568.315 428.563 581.823 430.624 0.482353 0.482353 0.482353 epoly
1 0 0 0 650.306 530.798 665.953 485.758 637.254 511.36 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 508.074 382.141 530.487 389.941 538.026 367.261 515.531 359.559 0.231373 0.231373 0.231373 epoly
1 0 0 0 574.289 452.895 598.972 490.613 594.125 448.971 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 693.188 442.204 681.728 440.354 665.953 485.761 677.658 486.769 0.478431 0.478431 0.478431 epoly
1 0 0 0 578.84 493.945 574.29 452.896 594.126 448.971 598.974 490.614 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 478.526 246.842 515.926 232.402 485.887 224.101 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 471.222 419.121 500.649 433.036 508.239 410.108 478.538 396.814 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 470.54 218.153 463.073 241.333 478.526 246.842 485.887 224.101 0.494118 0.494118 0.494118 epoly
1 0 0 0 500.682 279.083 496.938 239.733 511.72 245.254 515.561 283.936 0.478431 0.478431 0.478431 epoly
1 0 0 0 515.561 283.936 511.72 245.254 496.938 239.733 500.682 279.083 0.478431 0.478431 0.478431 epoly
1 0 0 0 665.953 485.761 650.304 530.8 644.932 489.144 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 500.663 329.357 508.098 306.691 553.195 321.625 545.595 344.489 0.231373 0.231373 0.231373 epoly
1 0 0 0 500.663 329.357 515.563 283.932 519.492 323.496 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 470.568 371.304 485.883 374.42 500.664 329.358 485.565 325.38 0.486275 0.486275 0.486275 epoly
1 0 0 0 560.669 451.253 565.148 493.061 578.84 493.943 574.291 452.893 0.478431 0.478431 0.478431 epoly
1 0 0 0 489.447 414.684 485.885 374.416 508.24 410.109 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 474.023 412.296 455.694 416.852 471.221 419.121 489.447 414.684 0.756863 0.756863 0.756863 epoly
1 0 0 0 596.748 536.012 637.904 530.611 604.356 513.818 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 523.017 336.885 545.596 344.489 538.026 367.261 515.53 359.559 0.231373 0.231373 0.231373 epoly
1 0 0 0 515.594 208.155 538.136 215.111 530.581 238.145 508.122 231.088 0.231373 0.231373 0.231373 epoly
1 0 0 0 433.503 333.117 449.374 336.907 470.568 371.302 454.668 368.066 0.537255 0.537255 0.537255 epoly
1 0 0 0 496.938 239.733 515.926 232.402 530.581 238.145 511.72 245.254 0.776471 0.776471 0.776471 epoly
1 0 0 0 596.748 536.014 617.01 533.356 598.974 490.611 578.84 493.943 0.384314 0.384314 0.384314 epoly
1 0 0 0 478.525 246.842 500.682 279.083 496.938 239.733 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 508.051 457.436 477.556 454.244 485.883 449.348 0.666667 0.666667 0.666667 epoly
1 0 0 0 500.649 433.036 471.222 419.121 508.239 410.108 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 433.503 333.117 462.261 344.706 478.051 348.387 449.374 336.907 0.666667 0.666667 0.666667 epoly
1 0 0 0 601.572 578.165 596.75 536.01 622.142 576.134 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 462.261 344.706 449.374 336.907 478.051 348.387 0.662745 0.662745 0.662745 epoly
1 0 0 0 574.29 452.896 560.669 451.256 580.668 447.231 594.126 448.971 0.74902 0.74902 0.74902 epoly
1 0 0 0 604.356 513.818 637.904 530.611 611.993 491.535 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 578.841 493.941 559.314 497.172 549.755 538.516 569.732 535.837 0.27451 0.27451 0.27451 epoly
1 0 0 0 456.619 314.524 449.374 336.907 462.261 344.706 469.885 321.249 0.172549 0.172549 0.172549 epoly
1 0 0 0 665.953 485.761 681.728 440.354 652.642 466.84 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 523.017 336.885 545.596 344.489 553.196 321.625 530.534 314.121 0.231373 0.231373 0.231373 epoly
1 0 0 0 485.885 374.416 489.447 414.684 474.023 412.296 470.57 371.3 0.482353 0.482353 0.482353 epoly
1 0 0 0 470.57 371.3 474.023 412.296 489.447 414.684 485.885 374.416 0.482353 0.482353 0.482353 epoly
1 0 0 0 500.649 433.036 515.498 435.028 508.05 457.436 493.09 455.87 0.482353 0.482353 0.482353 epoly
1 0 0 0 627.363 446.699 607.09 450.645 598.972 490.611 619.741 487.174 0.290196 0.290196 0.290196 epoly
1 0 0 0 485.886 224.101 515.925 232.402 508.288 255.79 478.525 246.842 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 596.748 536.012 637.906 530.609 609.275 555.805 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 463.893 292.053 477.542 297.695 448.228 287.411 0.662745 0.662745 0.662745 epoly
1 0 0 0 493.25 427.035 485.228 430.968 515.5 435.028 0.666667 0.666667 0.666667 epoly
1 0 0 0 549.757 538.517 545.47 496.364 530.391 541.113 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 598.974 490.611 617.01 533.356 611.995 491.536 0.47451 0.47451 0.47451 epoly
1 0 0 0 485.564 325.379 456.619 314.524 469.885 321.249 0.662745 0.662745 0.662745 epoly
1 0 0 0 500.684 279.079 515.563 283.932 500.663 329.357 485.564 325.379 0.490196 0.490196 0.490196 epoly
1 0 0 0 596.75 536.01 601.572 578.165 588.256 578.879 583.496 535.925 0.47451 0.47451 0.47451 epoly
1 0 0 0 531.196 340.758 500.663 329.357 545.595 344.489 0.662745 0.662745 0.662745 epoly
1 0 0 0 508.097 306.691 538.911 317.45 515.561 283.934 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 500.682 279.081 478.525 246.842 508.288 255.79 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 467.193 331.231 470.568 371.304 485.565 325.38 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 637.905 530.614 632.574 488.178 644.932 489.144 650.304 530.8 0.47451 0.47451 0.47451 epoly
1 0 0 0 650.304 530.8 644.932 489.144 632.574 488.178 637.905 530.614 0.470588 0.470588 0.470588 epoly
1 0 0 0 596.079 556.095 583.494 535.926 596.748 536.012 609.275 555.805 0.537255 0.537255 0.537255 epoly
1 0 0 0 500.649 433.036 515.498 435.028 522.977 412.529 508.239 410.108 0.482353 0.482353 0.482353 epoly
1 0 0 0 455.636 264.418 485.23 274.041 471.195 269.493 0.8 0.8 0.8 epoly
1 0 0 0 471.222 419.121 500.649 433.036 485.229 430.968 455.695 416.852 0.666667 0.666667 0.666667 epoly
1 0 0 0 508.122 231.088 500.701 226.437 485.885 224.1 0.8 0.8 0.8 epoly
1 0 0 0 580.668 447.234 601.303 443.081 627.365 446.7 607.092 450.646 0.74902 0.74902 0.74902 epoly
1 0 0 0 471.222 419.121 455.695 416.852 492.932 407.594 508.239 410.108 0.756863 0.756863 0.756863 epoly
1 0 0 0 553.195 321.625 508.098 306.691 538.911 317.451 0.658824 0.658824 0.658824 epoly
1 0 0 0 485.23 274.041 477.542 297.695 463.893 292.053 471.195 269.493 0.172549 0.172549 0.172549 epoly
1 0 0 0 632.574 488.178 653.801 484.714 665.953 485.761 644.932 489.144 0.745098 0.745098 0.745098 epoly
1 0 0 0 611.993 491.535 637.905 530.614 632.574 488.178 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 515.86 387.086 530.486 389.941 522.977 412.529 508.239 410.108 0.486275 0.486275 0.486275 epoly
1 0 0 0 500.663 329.357 531.196 340.758 538.911 317.451 508.098 306.691 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 500.696 178.345 531.293 185.337 523.593 208.918 493.276 201.268 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 485.228 430.968 493.25 427.035 485.883 449.348 477.556 454.244 0.466667 0.466667 0.466667 epoly
1 0 0 0 565.148 493.061 560.669 451.253 545.468 496.365 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 640.403 465.451 653.801 484.714 665.953 485.761 652.642 466.84 0.537255 0.537255 0.537255 epoly
1 0 0 0 485.884 449.348 508.052 457.436 492.925 485.996 469.917 477.425 0.564706 0.564706 0.564706 epoly
1 0 0 0 500.682 279.083 515.561 283.936 530.581 238.145 515.926 232.402 0.490196 0.490196 0.490196 epoly
1 0 0 0 493.276 201.268 508.487 202.485 515.594 208.155 0.8 0.8 0.8 epoly
1 0 0 0 640.403 465.451 611.994 491.538 653.801 484.714 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 519.492 323.496 515.563 283.932 538.913 317.451 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 504.515 319.344 485.564 325.379 500.663 329.357 519.492 323.496 0.764706 0.764706 0.764706 epoly
1 0 0 0 578.84 493.945 598.974 490.614 580.668 447.231 560.669 451.256 0.372549 0.372549 0.372549 epoly
1 0 0 0 485.884 449.348 477.557 454.244 500.652 462.713 508.052 457.436 0.666667 0.666667 0.666667 epoly
1 0 0 0 485.885 374.416 470.57 371.3 492.934 407.594 508.24 410.109 0.537255 0.537255 0.537255 epoly
1 0 0 0 463.072 241.332 478.525 246.842 500.682 279.081 485.23 274.041 0.537255 0.537255 0.537255 epoly
1 0 0 0 583.494 535.926 569.732 535.837 549.755 538.516 563.677 538.554 0.745098 0.745098 0.745098 epoly
1 0 0 0 598.97 490.612 580.667 447.233 603.091 470.33 0.47451 0.47451 0.47451 epoly
1 0 0 0 538.026 367.261 508.436 360.552 515.53 359.559 0.662745 0.662745 0.662745 epoly
1 0 0 0 531.196 340.758 500.663 329.357 538.911 317.451 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 530.581 238.145 500.701 226.437 508.122 231.088 0.8 0.8 0.8 epoly
1 0 0 0 531.293 185.337 493.276 201.268 523.593 208.918 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 463.072 241.332 492.95 250.289 508.288 255.79 478.525 246.842 0.8 0.8 0.8 epoly
1 0 0 0 632.574 488.178 627.363 446.699 653.801 484.714 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 492.95 250.289 478.525 246.842 508.288 255.79 0.8 0.8 0.8 epoly
1 0 0 0 632.574 488.178 619.741 487.174 598.972 490.611 611.993 491.535 0.745098 0.745098 0.745098 epoly
1 0 0 0 583.494 535.926 578.841 493.941 569.732 535.837 0.478431 0.478431 0.478431 epoly
1 0 0 0 474.023 412.296 470.57 371.3 455.694 416.852 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 596.75 536.01 583.496 535.925 609.012 576.82 622.142 576.134 0.537255 0.537255 0.537255 epoly
1 0 0 0 477.557 454.244 485.884 449.348 469.917 477.425 0.466667 0.466667 0.466667 epoly
1 0 0 0 500.632 479.754 492.923 485.995 500.651 462.712 508.051 457.436 0.466667 0.466667 0.466667 epoly
1 0 0 0 485.228 430.968 477.556 454.244 508.051 457.436 515.5 435.028 0.482353 0.482353 0.482353 epoly
1 0 0 0 485.886 224.101 478.525 246.842 492.95 250.289 500.702 226.437 0.172549 0.172549 0.172549 epoly
1 0 0 0 632.574 488.178 627.363 446.699 619.741 487.174 0.47451 0.47451 0.47451 epoly
1 0 0 0 500.684 279.079 504.515 319.344 519.492 323.496 515.563 283.932 0.478431 0.478431 0.478431 epoly
1 0 0 0 515.563 283.932 519.492 323.496 504.515 319.344 500.684 279.079 0.478431 0.478431 0.478431 epoly
1 0 0 0 580.668 447.231 598.974 490.614 594.126 448.971 0.47451 0.47451 0.47451 epoly
1 0 0 0 531.196 340.758 545.595 344.489 538.025 367.261 523.512 363.97 0.486275 0.486275 0.486275 epoly
1 0 0 0 508.05 457.436 523.987 471.268 493.09 455.87 0.666667 0.666667 0.666667 epoly
1 0 0 0 627.361 446.701 669.828 438.432 640.403 465.451 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 523.017 336.885 516.237 336.883 545.596 344.489 0.662745 0.662745 0.662745 epoly
1 0 0 0 515.594 208.155 508.487 202.485 538.136 215.111 0.8 0.8 0.8 epoly
1 0 0 0 515.925 232.402 485.886 224.101 500.702 226.437 0.8 0.8 0.8 epoly
1 0 0 0 625.026 530.416 637.906 530.609 596.748 536.012 583.494 535.926 0.745098 0.745098 0.745098 epoly
1 0 0 0 623.609 466.63 619.739 487.175 598.97 490.612 603.091 470.33 0.286275 0.286275 0.286275 epoly
1 0 0 0 627.363 446.699 632.574 488.178 619.741 487.174 614.579 444.921 0.47451 0.47451 0.47451 epoly
1 0 0 0 500.632 479.754 508.051 457.436 523.988 471.269 516.171 494.655 0.172549 0.172549 0.172549 epoly
1 0 0 0 500.701 226.437 508.487 202.485 493.276 201.268 485.885 224.1 0.172549 0.172549 0.172549 epoly
1 0 0 0 496.938 239.733 500.682 279.083 515.926 232.402 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 627.694 464.009 614.578 444.923 627.361 446.701 640.403 465.451 0.537255 0.537255 0.537255 epoly
1 0 0 0 531.196 340.758 545.595 344.489 553.195 321.625 538.911 317.451 0.486275 0.486275 0.486275 epoly
1 0 0 0 538.135 215.111 545.72 191.984 531.293 185.337 523.593 208.918 0.490196 0.490196 0.490196 epoly
1 0 0 0 609.275 555.805 637.906 530.609 622.142 576.134 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 500.649 433.036 531.837 447.784 515.498 435.028 0.666667 0.666667 0.666667 epoly
1 0 0 0 627.365 446.7 601.303 443.081 623.61 466.631 0.47451 0.47451 0.47451 epoly
1 0 0 0 637.905 530.614 650.304 530.8 665.953 485.761 653.801 484.714 0.478431 0.478431 0.478431 epoly
1 0 0 0 455.694 416.852 439.577 414.497 447.107 391.329 463.116 394.123 0.486275 0.486275 0.486275 epoly
1 0 0 0 500.663 329.357 531.196 340.758 516.238 336.883 485.564 325.38 0.662745 0.662745 0.662745 epoly
1 0 0 0 508.488 202.486 493.276 201.268 523.593 208.918 0.8 0.8 0.8 epoly
1 0 0 0 531.837 447.784 523.987 471.268 508.05 457.436 515.498 435.028 0.172549 0.172549 0.172549 epoly
1 0 0 0 500.663 329.357 485.564 325.38 524.072 313.114 538.911 317.451 0.764706 0.764706 0.764706 epoly
1 0 0 0 500.696 178.345 493.276 201.268 508.488 202.486 516.306 178.433 0.172549 0.172549 0.172549 epoly
1 0 0 0 601.302 443.08 623.609 466.63 603.091 470.33 580.667 447.233 0.807843 0.807843 0.807843 epoly
1 0 0 0 580.668 447.234 603.092 470.331 623.61 466.631 601.303 443.081 0.803922 0.803922 0.803922 epoly
1 0 0 0 470.569 371.302 492.932 407.594 463.116 394.123 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 546.659 294.047 560.826 298.668 553.195 321.625 538.911 317.451 0.486275 0.486275 0.486275 epoly
1 0 0 0 492.923 485.995 500.632 479.754 516.171 494.655 0.666667 0.666667 0.666667 epoly
1 0 0 0 462.261 344.706 433.503 333.117 454.668 368.066 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 522.977 412.529 539.72 424.2 508.239 410.108 0.662745 0.662745 0.662745 epoly
1 0 0 0 492.925 485.996 508.052 457.436 500.652 462.713 0.466667 0.466667 0.466667 epoly
1 0 0 0 516.237 336.883 523.017 336.885 515.53 359.559 508.436 360.552 0.466667 0.466667 0.466667 epoly
1 0 0 0 508.487 202.485 515.594 208.155 508.122 231.088 500.701 226.437 0.466667 0.466667 0.466667 epoly
1 0 0 0 500.701 226.437 508.122 231.088 515.594 208.155 508.487 202.485 0.466667 0.466667 0.466667 epoly
1 0 0 0 447.107 391.329 454.668 368.066 470.569 371.302 463.116 394.123 0.486275 0.486275 0.486275 epoly
1 0 0 0 489.447 414.684 508.24 410.109 492.934 407.594 474.023 412.296 0.756863 0.756863 0.756863 epoly
1 0 0 0 531.293 185.337 500.696 178.345 516.306 178.433 0.803922 0.803922 0.803922 epoly
1 0 0 0 515.531 359.559 538.027 367.261 524.031 392.277 500.669 384.122 0.552941 0.552941 0.552941 epoly
1 0 0 0 515.531 359.559 508.437 360.552 531.889 368.6 538.027 367.261 0.662745 0.662745 0.662745 epoly
1 0 0 0 515.563 283.932 500.684 279.079 524.074 313.115 538.913 317.451 0.533333 0.533333 0.533333 epoly
1 0 0 0 601.572 578.165 622.142 576.134 609.012 576.82 588.256 578.879 0.741176 0.741176 0.741176 epoly
1 0 0 0 523.988 471.269 508.051 457.436 500.651 462.712 0.666667 0.666667 0.666667 epoly
1 0 0 0 455.694 416.852 485.228 430.967 439.577 414.497 0.666667 0.666667 0.666667 epoly
1 0 0 0 515.86 387.086 547.637 400.516 530.486 389.941 0.662745 0.662745 0.662745 epoly
1 0 0 0 485.228 430.967 455.694 416.852 463.116 394.123 492.932 407.594 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 462.261 344.706 454.668 368.066 470.568 371.302 478.051 348.387 0.486275 0.486275 0.486275 epoly
1 0 0 0 485.23 274.041 455.636 264.418 448.228 287.411 477.542 297.695 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 632.574 488.178 637.905 530.614 653.801 484.714 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 504.515 319.344 500.684 279.079 485.564 325.379 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 609.275 555.805 622.142 576.134 609.012 576.82 596.079 556.095 0.537255 0.537255 0.537255 epoly
1 0 0 0 583.494 535.926 588.255 578.881 569.732 535.837 0.478431 0.478431 0.478431 epoly
1 0 0 0 627.363 446.699 614.579 444.921 641.176 483.627 653.801 484.714 0.537255 0.537255 0.537255 epoly
1 0 0 0 508.437 360.552 515.531 359.559 500.669 384.122 0.466667 0.466667 0.466667 epoly
1 0 0 0 547.637 400.516 539.72 424.2 522.977 412.529 530.486 389.941 0.172549 0.172549 0.172549 epoly
1 0 0 0 530.487 389.941 524.029 392.276 531.888 368.599 538.026 367.261 0.466667 0.466667 0.466667 epoly
1 0 0 0 516.237 336.883 508.436 360.552 538.026 367.261 545.596 344.489 0.486275 0.486275 0.486275 epoly
1 0 0 0 508.487 202.485 500.701 226.437 530.581 238.145 538.136 215.111 0.494118 0.494118 0.494118 epoly
1 0 0 0 492.934 407.594 470.57 371.3 474.023 412.296 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 447.107 391.329 492.932 407.594 463.116 394.123 0.666667 0.666667 0.666667 epoly
1 0 0 0 538.025 367.261 555.587 376.732 523.512 363.97 0.662745 0.662745 0.662745 epoly
1 0 0 0 485.564 325.379 469.885 321.249 462.261 344.706 478.051 348.387 0.486275 0.486275 0.486275 epoly
1 0 0 0 637.906 530.609 609.275 555.805 596.079 556.095 625.026 530.416 0.694118 0.694118 0.694118 epoly
1 0 0 0 625.026 530.416 596.079 556.095 609.275 555.805 637.906 530.609 0.694118 0.694118 0.694118 epoly
1 0 0 0 657.463 436.436 669.828 438.432 627.361 446.701 614.578 444.923 0.74902 0.74902 0.74902 epoly
1 0 0 0 492.932 407.594 455.695 416.852 485.229 430.968 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 609.012 576.82 583.496 535.925 588.256 578.879 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 530.487 389.941 538.026 367.261 555.587 376.732 547.637 400.516 0.172549 0.172549 0.172549 epoly
1 0 0 0 640.403 465.451 669.828 438.432 653.801 484.714 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 531.196 340.758 563.57 352.847 545.595 344.489 0.662745 0.662745 0.662745 epoly
1 0 0 0 588.255 578.881 583.494 535.926 603.934 533.216 609.01 576.822 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 493.09 455.87 477.557 454.244 485.229 430.968 500.649 433.036 0.482353 0.482353 0.482353 epoly
1 0 0 0 485.564 325.379 469.885 321.249 477.542 297.694 493.108 302.278 0.486275 0.486275 0.486275 epoly
1 0 0 0 596.079 556.095 625.026 530.416 583.494 535.926 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 563.57 352.847 555.587 376.732 538.025 367.261 545.595 344.489 0.172549 0.172549 0.172549 epoly
1 0 0 0 500.682 279.081 524.072 313.114 493.108 302.278 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 524.029 392.276 530.487 389.941 547.637 400.516 0.662745 0.662745 0.662745 epoly
1 0 0 0 492.95 250.289 463.072 241.332 485.23 274.041 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 553.195 321.625 571.588 328.86 538.911 317.451 0.658824 0.658824 0.658824 epoly
1 0 0 0 524.031 392.277 538.027 367.261 531.889 368.6 0.466667 0.466667 0.466667 epoly
1 0 0 0 500.649 433.036 508.239 410.108 492.932 407.594 485.229 430.968 0.482353 0.482353 0.482353 epoly
1 0 0 0 477.542 297.694 485.23 274.041 500.682 279.081 493.108 302.278 0.490196 0.490196 0.490196 epoly
1 0 0 0 519.492 323.496 538.913 317.451 524.074 313.115 504.515 319.344 0.764706 0.764706 0.764706 epoly
1 0 0 0 601.302 443.08 580.667 447.233 598.97 490.612 619.739 487.175 0.368627 0.368627 0.368627 epoly
1 0 0 0 583.494 535.926 569.732 535.837 590.349 533.073 603.934 533.216 0.745098 0.745098 0.745098 epoly
1 0 0 0 623.609 466.63 601.302 443.08 619.739 487.175 0.47451 0.47451 0.47451 epoly
1 0 0 0 424.609 460.547 432.078 437.569 477.557 454.244 469.917 477.425 0.227451 0.227451 0.227451 epoly
1 0 0 0 632.574 488.178 653.801 484.714 641.176 483.627 619.741 487.174 0.745098 0.745098 0.745098 epoly
1 0 0 0 493.09 455.87 523.987 471.268 477.557 454.244 0.666667 0.666667 0.666667 epoly
1 0 0 0 555.587 376.732 538.026 367.261 531.888 368.599 0.662745 0.662745 0.662745 epoly
1 0 0 0 485.564 325.379 516.238 336.883 469.885 321.249 0.662745 0.662745 0.662745 epoly
1 0 0 0 546.659 294.047 579.64 304.772 560.826 298.668 0.8 0.8 0.8 epoly
1 0 0 0 523.987 471.268 493.09 455.87 500.649 433.036 531.837 447.784 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 531.837 447.784 500.649 433.036 493.09 455.87 523.987 471.268 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 516.238 336.883 485.564 325.379 493.108 302.278 524.072 313.114 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 492.95 250.289 485.23 274.041 500.682 279.081 508.288 255.79 0.490196 0.490196 0.490196 epoly
1 0 0 0 477.024 404.98 447.107 391.329 463.116 394.123 492.932 407.594 0.666667 0.666667 0.666667 epoly
1 0 0 0 640.403 465.451 653.801 484.714 641.176 483.627 627.694 464.009 0.537255 0.537255 0.537255 epoly
1 0 0 0 614.578 444.923 619.739 487.175 601.301 443.077 0.47451 0.47451 0.47451 epoly
1 0 0 0 579.64 304.772 571.588 328.86 553.195 321.625 560.826 298.668 0.172549 0.172549 0.172549 epoly
1 0 0 0 524.074 313.115 500.684 279.079 504.515 319.344 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 485.229 430.968 531.837 447.784 500.649 433.036 0.666667 0.666667 0.666667 epoly
1 0 0 0 477.542 297.694 524.072 313.114 493.108 302.278 0.662745 0.662745 0.662745 epoly
1 0 0 0 477.024 404.98 492.932 407.594 470.569 371.302 454.668 368.066 0.537255 0.537255 0.537255 epoly
1 0 0 0 515.925 232.402 500.702 226.437 492.95 250.289 508.288 255.79 0.490196 0.490196 0.490196 epoly
1 0 0 0 637.906 530.609 625.026 530.416 609.012 576.82 622.142 576.134 0.478431 0.478431 0.478431 epoly
1 0 0 0 669.828 438.432 640.403 465.451 627.694 464.009 657.463 436.436 0.694118 0.694118 0.694118 epoly
1 0 0 0 657.463 436.436 627.694 464.009 640.403 465.451 669.828 438.432 0.694118 0.694118 0.694118 epoly
1 0 0 0 524.072 313.114 485.564 325.38 516.238 336.883 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 641.176 483.627 614.579 444.921 619.741 487.174 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 609.012 576.82 593.128 622.836 588.256 578.879 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 485.228 430.967 492.932 407.594 447.107 391.329 439.577 414.497 0.231373 0.231373 0.231373 epoly
1 0 0 0 619.739 487.175 614.578 444.923 635.68 440.748 641.174 483.628 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 453.66 476.191 424.609 460.547 469.917 477.425 0.670588 0.670588 0.670588 epoly
1 0 0 0 547.637 400.516 515.86 387.086 508.239 410.108 539.72 424.2 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 523.512 363.97 508.437 360.552 516.238 336.883 531.196 340.758 0.486275 0.486275 0.486275 epoly
1 0 0 0 627.694 464.009 657.463 436.436 614.578 444.923 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 588.255 578.881 609.01 576.822 590.349 533.073 569.732 535.837 0.388235 0.388235 0.388235 epoly
1 0 0 0 477.557 454.244 432.078 437.569 461.415 452.555 0.666667 0.666667 0.666667 epoly
1 0 0 0 531.196 340.758 538.911 317.451 524.072 313.114 516.238 336.883 0.486275 0.486275 0.486275 epoly
1 0 0 0 531.293 185.337 516.306 178.433 508.488 202.486 523.593 208.918 0.494118 0.494118 0.494118 epoly
1 0 0 0 609.012 576.82 625.026 530.416 596.079 556.095 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 424.609 460.547 453.66 476.191 461.415 452.555 432.078 437.569 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 614.578 444.923 601.301 443.077 622.603 438.79 635.68 440.748 0.74902 0.74902 0.74902 epoly
1 0 0 0 477.557 454.244 469.917 477.425 492.925 485.996 500.652 462.713 0.227451 0.227451 0.227451 epoly
1 0 0 0 625.026 530.419 609.01 576.822 603.934 533.216 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 454.669 368.066 462.262 344.706 508.437 360.552 500.668 384.122 0.227451 0.227451 0.227451 epoly
1 0 0 0 523.512 363.97 555.587 376.732 508.437 360.552 0.662745 0.662745 0.662745 epoly
1 0 0 0 590.349 533.073 609.01 576.822 603.934 533.216 0.47451 0.47451 0.47451 epoly
1 0 0 0 447.107 391.329 477.024 404.98 454.668 368.066 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 563.57 352.847 531.196 340.758 523.512 363.97 555.587 376.732 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 555.587 376.732 523.512 363.97 531.196 340.758 563.57 352.847 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 579.228 624.449 574.425 579.621 588.256 578.879 593.128 622.836 0.478431 0.478431 0.478431 epoly
1 0 0 0 508.644 308.605 477.542 297.694 493.108 302.278 524.072 313.114 0.662745 0.662745 0.662745 epoly
1 0 0 0 469.917 477.425 477.557 454.245 523.988 471.269 516.171 494.655 0.227451 0.227451 0.227451 epoly
1 0 0 0 516.238 336.883 563.57 352.847 531.196 340.758 0.662745 0.662745 0.662745 epoly
1 0 0 0 508.644 308.605 524.072 313.114 500.682 279.081 485.23 274.041 0.537255 0.537255 0.537255 epoly
1 0 0 0 574.425 579.621 595.364 577.534 609.012 576.82 588.256 578.879 0.741176 0.741176 0.741176 epoly
1 0 0 0 669.828 438.432 657.463 436.436 641.176 483.627 653.801 484.714 0.478431 0.478431 0.478431 epoly
1 0 0 0 531.838 447.783 523.988 471.268 477.556 454.244 485.227 430.967 0.231373 0.231373 0.231373 epoly
1 0 0 0 523.987 471.268 531.837 447.784 485.229 430.968 477.557 454.244 0.231373 0.231373 0.231373 epoly
1 0 0 0 641.176 483.627 625.025 530.421 619.741 487.174 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 516.238 336.883 524.072 313.114 477.542 297.694 469.885 321.249 0.231373 0.231373 0.231373 epoly
1 0 0 0 484.879 381.041 454.669 368.066 500.668 384.122 0.662745 0.662745 0.662745 epoly
1 0 0 0 579.64 304.772 546.659 294.047 538.911 317.451 571.588 328.86 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 492.923 485.995 516.171 494.655 523.988 471.269 500.651 462.712 0.227451 0.227451 0.227451 epoly
1 0 0 0 595.362 577.535 590.349 533.073 603.934 533.216 609.01 576.822 0.47451 0.47451 0.47451 epoly
1 0 0 0 453.66 476.191 469.917 477.425 477.557 454.244 461.415 452.555 0.482353 0.482353 0.482353 epoly
1 0 0 0 619.739 487.175 641.174 483.628 622.603 438.79 601.301 443.077 0.380392 0.380392 0.380392 epoly
1 0 0 0 500.654 493.749 469.917 477.425 516.171 494.655 0.666667 0.666667 0.666667 epoly
1 0 0 0 508.437 360.552 462.262 344.706 492.767 356.999 0.662745 0.662745 0.662745 epoly
1 0 0 0 590.349 533.073 611.637 530.218 625.026 530.419 603.934 533.216 0.745098 0.745098 0.745098 epoly
1 0 0 0 641.176 483.627 657.463 436.436 627.694 464.009 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 469.203 428.818 485.229 430.968 477.557 454.244 461.415 452.555 0.486275 0.486275 0.486275 epoly
1 0 0 0 454.669 368.066 484.879 381.041 492.767 356.999 462.262 344.706 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 477.556 454.244 523.988 471.268 484.878 461.18 0.666667 0.666667 0.666667 epoly
1 0 0 0 508.437 360.552 500.669 384.122 524.031 392.277 531.889 368.6 0.231373 0.231373 0.231373 epoly
1 0 0 0 657.463 436.438 641.174 483.629 635.681 440.748 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 523.988 471.269 477.557 454.245 508.593 469.898 0.666667 0.666667 0.666667 epoly
1 0 0 0 492.932 407.594 516.565 445.945 485.229 430.968 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 622.603 438.79 641.174 483.628 635.68 440.748 0.47451 0.47451 0.47451 epoly
1 0 0 0 477.542 297.694 508.644 308.605 485.23 274.041 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 611.635 530.22 606.408 486.131 619.741 487.174 625.025 530.421 0.47451 0.47451 0.47451 epoly
1 0 0 0 469.917 477.425 500.654 493.749 508.593 469.898 477.557 454.245 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 492.758 437.336 485.227 430.967 477.556 454.244 484.878 461.18 0.172549 0.172549 0.172549 epoly
1 0 0 0 469.203 428.818 477.025 404.98 492.932 407.594 485.229 430.968 0.486275 0.486275 0.486275 epoly
1 0 0 0 492.758 437.336 531.838 447.783 485.227 430.967 0.666667 0.666667 0.666667 epoly
1 0 0 0 579.228 624.449 593.128 622.836 609.012 576.82 595.364 577.534 0.478431 0.478431 0.478431 epoly
1 0 0 0 500.669 384.122 508.438 360.552 555.587 376.732 547.637 400.516 0.231373 0.231373 0.231373 epoly
1 0 0 0 606.408 486.131 628.05 482.496 641.176 483.627 619.741 487.174 0.745098 0.745098 0.745098 epoly
1 0 0 0 563.571 352.847 555.587 376.732 508.436 360.551 516.237 336.882 0.231373 0.231373 0.231373 epoly
1 0 0 0 555.587 376.732 563.57 352.847 516.238 336.883 508.437 360.552 0.231373 0.231373 0.231373 epoly
1 0 0 0 500.654 493.749 477.557 454.245 508.593 469.898 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 524.029 392.276 547.637 400.516 555.587 376.732 531.888 368.599 0.231373 0.231373 0.231373 epoly
1 0 0 0 628.048 482.498 622.603 438.79 635.681 440.748 641.174 483.629 0.47451 0.47451 0.47451 epoly
1 0 0 0 484.879 381.041 500.668 384.122 508.437 360.552 492.767 356.999 0.486275 0.486275 0.486275 epoly
1 0 0 0 595.362 577.535 609.01 576.822 625.026 530.419 611.637 530.218 0.478431 0.478431 0.478431 epoly
1 0 0 0 574.425 579.621 579.228 624.449 595.364 577.534 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 532.613 397.728 500.669 384.122 547.637 400.516 0.662745 0.662745 0.662745 epoly
1 0 0 0 622.603 438.79 644.605 434.362 657.463 436.438 635.681 440.748 0.74902 0.74902 0.74902 epoly
1 0 0 0 500.654 493.749 516.171 494.655 523.988 471.269 508.593 469.898 0.482353 0.482353 0.482353 epoly
1 0 0 0 523.988 471.268 484.878 461.18 492.758 437.336 531.838 447.784 0.415686 0.415686 0.415686 epoly
1 0 0 0 531.838 447.783 492.758 437.336 484.878 461.18 523.988 471.268 0.415686 0.415686 0.415686 epoly
1 0 0 0 500.689 332.854 516.238 336.883 508.437 360.552 492.767 356.999 0.486275 0.486275 0.486275 epoly
1 0 0 0 477.557 454.244 492.576 468.472 461.415 452.555 0.666667 0.666667 0.666667 epoly
1 0 0 0 508.436 360.551 555.587 376.732 516.599 365.187 0.662745 0.662745 0.662745 epoly
1 0 0 0 555.587 376.732 508.438 360.552 540.689 373.464 0.662745 0.662745 0.662745 epoly
1 0 0 0 524.072 313.114 548.8 349.094 516.238 336.883 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 461.416 452.555 477.557 454.245 500.654 493.749 484.513 492.806 0.537255 0.537255 0.537255 epoly
1 0 0 0 500.669 384.122 532.613 397.728 540.689 373.464 508.438 360.552 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 524.615 340.93 516.237 336.882 508.436 360.551 516.599 365.187 0.172549 0.172549 0.172549 epoly
1 0 0 0 500.689 332.854 508.645 308.606 524.072 313.114 516.238 336.883 0.486275 0.486275 0.486275 epoly
1 0 0 0 469.203 428.818 500.674 444.031 485.229 430.968 0.666667 0.666667 0.666667 epoly
1 0 0 0 524.615 340.93 563.571 352.847 516.237 336.882 0.662745 0.662745 0.662745 epoly
1 0 0 0 611.635 530.22 625.025 530.421 641.176 483.627 628.05 482.496 0.478431 0.478431 0.478431 epoly
1 0 0 0 461.416 452.555 492.576 468.472 508.593 469.898 477.557 454.245 0.670588 0.670588 0.670588 epoly
1 0 0 0 590.349 533.073 595.362 577.535 611.637 530.218 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 500.674 444.031 492.576 468.472 477.557 454.244 485.229 430.968 0.172549 0.172549 0.172549 epoly
1 0 0 0 500.674 444.031 469.203 428.818 485.229 430.968 516.565 445.945 0.666667 0.666667 0.666667 epoly
1 0 0 0 532.613 397.728 508.438 360.552 540.689 373.464 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 500.674 444.031 516.565 445.945 492.932 407.594 477.025 404.98 0.537255 0.537255 0.537255 epoly
1 0 0 0 532.613 397.728 547.637 400.516 539.721 424.2 524.572 421.888 0.482353 0.482353 0.482353 epoly
1 0 0 0 628.048 482.498 641.174 483.629 657.463 436.438 644.605 434.362 0.478431 0.478431 0.478431 epoly
1 0 0 0 484.878 461.18 523.988 471.268 492.576 468.472 0.666667 0.666667 0.666667 epoly
1 0 0 0 606.408 486.131 611.635 530.22 628.05 482.496 0.0588235 0.0588235 0.0588235 epoly
1 0 0 0 532.613 397.728 547.637 400.516 555.587 376.732 540.689 373.464 0.482353 0.482353 0.482353 epoly
1 0 0 0 555.587 376.732 516.599 365.187 524.615 340.93 563.571 352.847 0.427451 0.427451 0.427451 epoly
1 0 0 0 563.571 352.847 524.615 340.93 516.599 365.187 555.587 376.732 0.431373 0.431373 0.431373 epoly
1 0 0 0 508.437 360.552 525.184 370.062 492.767 356.999 0.662745 0.662745 0.662745 epoly
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%
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% AFTER \inputting the present file: \input /u2/kbi/tex/epsfig
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% RESET AT YOUR PLEASURE THE VARIABLES AT THE VERY BOTTOM!
%
% For convenience we make a dimension for figures:
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%
% For a SCALED HORIZONTALLY CENTERED FIGURE use \epsfig.
% First argument is the horizontal width of the figure, given
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% The second argument is an encapsulated PostScript file name (filnam.eps).
% Note the mandatory semicolons between arguments in this example!:
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%
% 
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% 
% TeX-PLACED SCALED EPSFIG HORIZONTALLY CENTERED: \ipsfig
\gdef\ipsfig#1;#2;{%\goodbreak ??
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%
% TeX-PLACED SCALED TITLED EPSFIG HORIZONTALLY CENTERED: \tipsfig
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% ================================================================
% old:
% \ifx\Input\undefined\let\next\input\else\let\next\Input\fi
% \next /usr/local/lib/tex/inputs/epsf.tex	%On Suns
%% \next /usr/lib/tex/inputs/epsf.tex		%On NexTs
%
% to make sure no new version of epsf.tex corrupts the above,
% I copy here that file in toto:
%
%   EPSF.TEX macro file:
%   Written by Tomas Rokicki of Radical Eye Software, 29 Mar 1989.
%   Revised by Don Knuth, 3 Jan 1990.
%   Revised by Tomas Rokicki to accept bounding boxes with no
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%
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  \hsize=6truein	\hoffset=.25truein %was \hoffset=1.2truein
  \vsize=8.8truein	%\voffset=1truein
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%Start of Text
\pageno=-1
\hbox{}
\vs2
\centerline{{\bf Aperiodic Tiling}}
\vs.4
\centerline{by} 
\vs.4
\centerline{Charles Radin}
\vs1
\centerline{October, 1997}
\vfill\eject
%\hbox{}\vs.3
%pageno=ii
\centerline{{\bf Preface}}
\vs.1
``In the world of human thought generally, and in physical science
particularly, the most important and most fruitful concepts are those
to which it is impossible to attach a well-defined meaning'' -- an
intriguing idea from the physicist H.A.\ Kramers [Kra]. Even within
mathematics, where the approach to knowledge is somewhat different
from the physical sciences, a version of this thesis would appeal
to those engaged in research: in prosaic terms -- anything
well-understood is less promising as a research topic than something
not-well-understood.

This book is motivated by something not-well-understood, a class of
structures exemplified by the ``Penrose tilings'', or, more
specifically, the ``kite \& dart tilings'' (Fig.$\,$1). These
structures are not-well-understood on a grand scale, having had
significant impact in physics and mathematics, and originating from
work done in the 1960's in philosophy! A few decades is a short time
in mathematics, so it is reasonable that such a fertile subject is not
yet well-understood. Yet it is the subject of this book.

Such tilings differ in a variety of ways from any studied before and
it may be many years before we are confident of how they fit into the
body of mathematics, and the most useful ways to view them. Our search
to understand them will draw us into many parts of mathematics --
including ergodic theory, functional analysis, group representations
and ring theory, as well as parts of statistical physics and
crystallography. Such breadth invites an ususual format for this
mathematics text; rather than present a full introduction to some
corner of mathematics, in this book we try to display the value (and
joy!) of starting from a mathematically amorphous problem and
combining ideas from diverse sources to produce new and significant
mathematics -- mathematics unforeseen from the motivating problem.

The background assumed of the reader is that commonly offered an
undergraduate mathematics major in the US, together with the
curiosity to delve into new subjects, to readjust to a variety of
viewpoints. The book is self-contained; subjects such as ergodic
theory and statistical mechanics are introduced, {\it ab initio}, but
only to the extent needed to absorb the desired insight.

This book was completed in October, 1997. For further results see
papers listed in http://www.ma.utexas.edu/$\sim$radin/
\vfill\eject
%\bye
\centerline{{\bf TABLE OF CONTENTS}}
\vs.5
\vs.1 \nd
\nd List of Figures \hfill p.\ 1
\vs.1
\nd Introduction \hfill p.\ 3
\vs.1 \nd
Chapter 1.\ Ergodic Theory \hfill 
\vs.03 
1.\ The idea behind ergodic theory \hfill p.\ 10
\vs.03
2.\ Some mathematical structure \hfill p.\ 13
\vs.03
3.\ Substitution tilings \hfill p.\ 17
\vs.03
4.\ Finite type tilings \hfill p.\ 23
\vs.1 \nd
Chapter 2.\ Physics (for Mathematicians)\hfill 
\vs.03
1.\ Diffraction of light waves \hfill p.\ 35
\vs.03
2.\ Statistical mechanics \hfill p.\ 37
\vs.1 \nd
Chapter 3.\ Order \hfill 
\vs.03
1.\  Spectrum and order \hfill p.\ 40
\vs.1 \nd
Chapter 4.\ Symmetry \hfill 
\vs.03
1.\ Substitution and rotational symmetry \hfill p.\ 44
\vs.03
2.\ Spectrum and X-rays \hfill p.\ 52
\vs.03
3.\ 3-dimensional models \hfill p.\ 56
\vs.1 \nd
Chapter 5.\ Conclusion \hfill p.\ 64
\vs.1 \nd
Appendix I.\  Geometry \hfill p.\ 66
\vs.1 \nd
Appendix II.\  Algebra \hfill p.\ 67
\vs.1 \nd
Appendix III.\  Analysis \hfill p.\ 71
\vs.1 \nd
References\hfill p.\ 73
\vfill 
\eject
%\pageno=iii
%\bye
\pageno=1
\centerline{\bf List of Figures}
\vs.2 \nd
1)\ A Penrose ``kite \& dart'' tiling
\vs0 \nd
2)\ 12 unit cells of a periodic configuration
\vs0 \nd
3)\ The tile $(3,5)$
\vs0 \nd
4)\ Part of a periodic tiling, with unit cells outlined
\vs0 \nd
5)\ Part of a periodic tiling, with different unit cells outlined
\vs0 \nd
6)\ The Kari-Culik tiles
\vs0 \nd
7)\ The ``random tile''
\vs0 \nd
8)\ Part of a ``random tiling''
\vs0 \nd
9)\ The Morse tiles
\vs0 \nd
10)\ The Morse substitution system
\vs0 \nd
11)\ Expansion
\vs0 \nd
12)\ A Morse tiling
\vs0 \nd
13)\ A pinwheel tiling
\vs0 \nd
14)\ Two levels of a Morse tiling
\vs0 \nd
15)\ Two levels of a periodic tiling
\vs0 \nd
16)\ The kite \& dart
\vs0 \nd
17)\ Substitution $\tilde F$ for kite \& dart
\vs0 \nd
18)\ Modified kite \& dart
\vs0 \nd
19)\ The five basic tiles and three parity tiles
\vs0 \nd
20)\ Constructing the ten Robinson tiles, a -- j
\vs0 \nd
21)\ Unit cell of parity tiles
\vs0 \nd
22)\ Abbreviated basic tiles
\vs0 \nd
23)\ A 3-square
\vs0 \nd
24)\ Consecutive crosses
\vs0 \nd
25)\ An even distance between crosses
\vs0 \nd
26)\ A 7-square
\vs0 \nd
27)\ The central column is a fault line
\vs0 \nd
28)\ The Dekking-Keane tiles
\vs0 \nd
29a)\ Part of the Dekking-Keane substitution
\vs0 \nd
29b)\ Part of the Dekking-Keane substitution
\vs0 \nd
30)\ The pinwheel substitution
\vs0 \nd
31a)\ Decomposing a triangular face of the quaquaversal tile
\vs0 \nd
31b) One view of the decomposition of the quaquaversal tile
\vs0 \nd
31c)\ Another view of the decomposition of the quaquaversal tile
\vs0 \nd
32) Part of a quaquaversal tiling
\vs0 \nd
33)\ Dites and karts
\vs0 \nd
34)\ Rotating the boxes
\vfill\eject
%zzz
%\pageno=1
\nd {\bf Introduction}
\vs.1
The ``kite \& dart tiling'', pictured in Fig.$\,$1, has been widely
publicized in the last decade or two. {\it Why?} There are lots of
reasons actually, and in this book we will concentrate specifically on
the mathematics which they have inspired, scattered in totally
unexpected directions.
%\bye

The story began in the early 1960's, with the philosopher Hao Wang
modeling certain problems in logic [Wan]. It slowly evolved into
geometry, in large part from influential work of Raphael Robinson
[Rob] and the kite \& dart tiling of Roger Penrose [Gar]. 
We will pick up the story
there, and follow it through the twists and turns it has undergone, to
the new mathematics that is emerging. It has been a highly
interdisciplinary journey, and though we will strongly emphasize the
mathematics (chiefly geometry and modern analysis), we will not flinch
from analyzing those ideas in physics and crystallography which will
help us understand the mathematics. Personally, I find that a good
part of the fun of the subject.

Now patterns like Fig.$\,$1 are pretty, but at least once in a while it
is useful to face the essence of our endeavor in its raw form. The
feature of Fig.$\,$1 that we first emphasize is the {\it large number} of
polygons in it. (There are infinitely many in the full tiling of course.) 
Analogous physical patterns are: a quartz rock made of
many atoms; a snail made of many cells; or a beach made of 
many grains
of sand. In general, we will be analyzing ``global''
structures made out of many small components. 

We concentrate not on the external shape of the
global structure, such as the facets of a quartz rock, but on
the pattern made at a much
smaller scale by the small components. For a snail this is quite
complicated: the cells gather together into intermediate-size
structures which we call organs. For beaches the small scale structure
is rather ``random''. But rocks are neither as random as beaches, nor
as exotic as snails; the atoms in rocks form patterns of intermediate
complexity, called crystals.

We know roughly why atoms in rocks form crystals while sand grains on the
beach, or cells in a snail do not; what we say is that {\it there are
different laws governing the production of these structures}, 
(laws studied in physics, biology etc.) and
these different laws naturally lead to different results. But this is
all a bit vague, and when one examines this explanation carefully
there are serious but very interesting difficulties with it. This will
be our subject -- why certain kinds of laws or rules seem to produce
very special global structures, such as quartz crystals. (Snails are a
much harder problem, and beaches are too simple; neither will be
mentioned seriously again!) In the next few paragraphs we 
must get more specific about this idea of rules which produce structures.

This book is about mathematics not physics, so it will be useful to
have in mind models of this structural phenomenon other than rocks,
with all their irrelevant details. The general model we will use is
the jigsaw puzzle, one made with {\it very} many pieces with bumpy
edges, pieces which we will
call 
``tiles''. 
If one imagines the tiles to have various colors
painted on them it is easy to see how a tile contributes to a global
structure or pattern. We will ignore any such colors on the tiles, and
only concentrate on their shapes -- as if we turned the jigsaw
puzzle pieces over; we think of the global pattern
as ``consisting of'' these special shapes fitted together. 
The bumpy edges of the tiles play an important role in determining
how the tiles fit together to form the global pattern. (We will
also consider 3-dimensional versions of the more traditional 
2-dimensional puzzles.)

But rocks will still be useful to us; we will use features of rocks to
guide us in our mathematical analysis of patterns. For instance, the
tiles in a jigsaw puzzle could represent {\it any} structure if there
were no restrictions. If you wanted certain star-shaped pieces to lie
in particular places in a puzzle, you could just chop up the
intervening space into other pieces to accommodate the stars. Now one
of the reasons the atoms in rocks do not appear in arbitrary (local)
structures is that there is only a small number of possible
components, the 92 different naturally occurring kinds of atoms. So we
ask: if you were a manufacturer of jigsaw puzzles and were limited to
using, say, 92 different tiles of your choice (but could make as many
copies of each shape as you wanted), what kind of giant patterns could
you produce? Remember that for us the pattern has nothing to do
with colored pictures on the tiles, but merely with the manner in
which the various tiles fit together. 
With this constraint of only 92 different shapes to use 
it is no longer clear that you
could make {\it any} (local) pattern of tiles, and the question is: what kinds
of patterns could you make? This is where our discussion about rules
of production has led us; we assume we have some small number of
different kinds of elementary building blocks, and ask what kinds of
patterns can be made out of them given the restriction that the
pieces have to fit together like a jigsaw puzzle. Later we will 
discuss why the restriction that the pieces fit together should be thought of
as a law of production.

Now let's refine what we mean by ``kinds of
patterns''. Again we look at crystals for inspiration. The
distinguishing special feature of crystals is that they each have a
unit cell from which the global pattern is obtained by translation, as
in Fig.$\,$2. (The dashes in the figure show the translations separating
the 12 unit cells, each unit cell consisting of three spheres.)
This repetition is an example of an 
``order'' 
property, very
different from the randomness of the positions of the sand grains of a
beach. Also, periodic structures such as crystals are limited in the
symmetries 
they may have; for instance, a crystal can only have axes
with 2, 3, 4 and 6-fold rotational symmetry [HiC]. So in studying the
``kinds'' of structures, we will concentrate on the order and,
especially, the {\it symmetry} properties they may possess.

It is time to examine some examples. First consider the 
periodic jigsaw using the following $K^2$ different shapes, where $K\ge 2$ is 
fixed but arbitrary.
They are all basically unit squares, but with certain bumps coming out
of some edges and dents going into some edges (any bump fitting into
any dent), following the formula: the tile labeled $(i,j)$ (where $1\le i,j \le
K$) has $i$ dents on its top edge, $(i+1)$ bumps on its bottom edge,
$j$ dents on its left edge and $(j+1)$ bumps on its right edge. The
exceptions are: $(1,j)$ has $K$ dents on its top edge; $(i,1)$ has $K$
dents on its left edge; $(K,j)$ has 1 bump on its bottom edge; and
$(i,K)$ has $K$ bumps on its right edge. Fig.$\,$3 shows tile $(3,5)$,
assuming $5 < K$. It's not hard to show that the only way to put these
together into a big jigsaw puzzle 
makes a ``$K\times K$ unit cell'' (several are shown in
Fig.$\,$4 for $K=6$), and builds a periodic pattern from copies of the
cell. Notice that although the specification of the unit cell is not
unique (see an alternative choice in Fig.$\,$5), in a sense the full
pattern is unique: there is really only one way to build a global structure
from these tiles, up to an overall rigid motion of the plane. (See
Appendix I for a review of congruences of Euclidean 2 and 
3-dimensional space.)

Next consider some tilings, due to Jarkko Kari and Karel Culik,
made from copies of the shapes in Fig.$\,$6. As is shown in [Cul], one
can build arbitrarily large collections of these tiles, but none with
a unit cell from which a tiling could be constructed by repeated
translation as above.

Instead of talking about arbitrarily large collections of tiles, we
will take the plunge and discuss from now on infinite collections
which fill the whole Euclidean 2 or 3-dimensional space. We will also
use the word ``tiling'' in place of jigsaw puzzle for collections of
tiles; by a tiling of a space we just mean a collection of tiles which
completely covers the space, and such that for each pair of tiles in
the tiling the interiors have empty intersection. As we shall see,
there is not really much difference in dealing with infinite rather
than arbitrarily large collections of tiles, and it will simplify some
discussions. In particular, from the tiles of Fig.$\,$6 one can make
uncountably many tilings of the plane no two of which are congruent,
but as noted above one cannot make a periodic one, that is, one made
up of repeated translations of a unit cell as in Fig.$\,$4.

We next consider the ``random'' tile in Fig.$\,$7.  
The only tilings one can make out of copies of this tile 
are vaguely like a checkerboard,
with the tiles pairing up along their hypotenuses to make the squares
of what we will call a ``random checkerboard'' as in Fig.$\,$8.  Note that
in pairing up, each square of the checkerboard is filled with a pair
of tiles in one of two possible orientations, and that these two
possible orientations (think of them as ``red'' and ``black'') are
independent in different squares.  We could thus think of the possible
tilings with these tiles as {\it any} tilings made with (aligned) red
and black squares -- not just those alternating in color as in a real
checkerboard. This means we {\it can} tile in very complicated ways;
but in contrast with the previous example, we can {\it also} tile
periodically, that is, in a very simple way, for instance the usual
red-black checkerboard.

We want to contrast one feature of the tiles of Fig.$\,$4 and of Fig.$\,$7.
>From the first set we found that there was essentially only one tiling
that could be made; any two tilings were in fact congruent. From the
second set we found we could make a very wide variety of tilings,
which had little to do with one another. We noted earlier rules
or laws that produce global structures from components, and this is an
appropriate place to expand on that. 

It would be convenient if our rules took a set of tiles such as those
in Fig.$\,$6 and produced a specific tiling. However we are trying to
understand how structures such as crystals are made, and the rules of
nature are not of this simple type. As we shall see in Chapter 2,
given a specification of particles such as iron atoms, (or better yet,
iron nuclei and electrons), the physical rules or laws that govern the
production of bulk iron at low temperature do not actually pick out a
specific particle configuration such as a particular crystal; the laws
(called statistical mechanics) actually specify a large {\it
collection of particle configurations}. So too the rules we will deal
with will associate with a given set of tiles such as Fig.$\,$6 not
one specific tiling, but a (large) {\it collection of tilings}.

For instance, from a set $\A$ of tiles such as Fig.$\,$6 we can associate
the set $X_\A$ of {\it all possible} tilings that one could make using
congruent copies of those tiles. We think of this as a ``rule'' for
$\A$. (We will consider other types of rules for $\A$ later, which
associate special subsets of $X_\A$, but unless otherwise indicated,
given a set $\A$ of tiles ``the'' rule for $\A$ associates the set $X_\A$
of {\it all possible} tilings).

Now if one is given a tiling $x$ and wants to determine whether or not
it ``follows from the rule associated with $\A$'', that is, whether or
not $x$ is in $X_\A$, one must check three things: that the tiles
making up $x$ are congruent to elements of $\A$; that in $x$ they leave
no uncovered gaps in the plane; and that they never overlap in
$x$. Notice that this process could be carried out by examining $x$ in
any fixed disk $D$ of diameter large enough to properly contain any of the
tiles of $\A$, and moving this viewing window throughout $x$; it can be
seen whether or not $x$ belongs to $X_\A$ by such a {\it local}
examination, where the word ``local'' emphasizes that at no time do we
need to examine a portion of $x$ larger than the finite size of our
fixed disk $D$. In summary: a rule associates with some finite set
$\A$ of tiles not one tiling but some {\it set} $X$ of tilings, and the
essence of the rule is what one must do to see if a candidate tiling
$x$ satisfies the rule, that is, belongs to $X$. It is in this way
that we have classified rules as local or not.

Getting back to the contrasted feature of the set $\A_4$ of tiles in
Fig.$\,$4 and $\A_7$ of the tile in Fig.$\,$7, the difference we noted
is that all the tilings in $X_{\A_4}$ are very similar to one another
(in fact any two are congruent), whereas there are tilings in
$X_{\A_7}$ which are very dissimilar from one another. The set $\A_6$
of tiles shown in Fig.$\,$6 is of a different sort. We said that
$X_{\A_6}$ contains tilings which are not congruent to one
another. But these tilings are still very similar in a sense slightly
weaker than congruence: every finite substructure of any
one tiling in $X_{\A_6}$ has congruent copies in any 
other tiling in $X_{\A_6}$,
with the consequence that one cannot tell the difference between the
tilings in $X_{\A_6}$ by inspecting only finite portions of them.
Now the point is, we consider the cases of
$X_{\A_4}$ and $X_{\A_6}$ as satisfactory, but not that of
$X_{\A_7}$. 
(This is partly motivated by the statistical mechanics of solids. 
After developing some ideas in Chapter 2 we will think of
$X_{\A_7}$ as resulting from an ``accidental symmetry'' which allows
both orientations of the pairs of tiles making up squares.) 
With this
prejudice firmly in place, we will concentrate on sets $\A$ of tiles
without such accidental symmetries, tiles which only produce sets
$X_\A$ of tilings in which each pair, while not necessarily congruent,
is locally indistinguishable in a sense made precise later. One
consequence is that for the sets $\A$ of tiles which we will
consider, the tilings in $X_\A$ are either all simple (for
instance periodic), or all complicated.

Consider next the tiles in Fig.$\,$9 and the following ``substitution
rule'' for making tilings from them. For each tile $T$ we have a way
(Fig.$\,$10) to associate with it a collection of tiles at a smaller
scale (a factor $1/\gamma < 1$ times those in Fig.$\,$9, with
$\gamma=2$ in this case), in a fixed relation in space to $T$. What we
do then is start with some tile somewhere in the plane, ``break it
up'' as is done to tile $A$ in Fig.$\,$10, then expand the small tiles 
by the factor $\gamma > 1$ as in Fig.$\,$11. We repeat
this for each of the tiles we now have, again and again; see
Fig.$\,$12. After infinitely many iterations we
have a tiling of the plane, at least if we are careful in choosing each
time the place about which to expand. It turns out that different
sequences of choices of points about which we expand can lead to
tilings which are noncongruent; so a ``substitution rule'' associates
a large number of special tilings with a set $\A$ of tiles.

This is a useful way of producing tilings; one can produce interesting
tilings by this substitution method. But in a way it seems too
easy; we expect that a more complicated mechanism should be required
to govern the construction of the complicated structures of interest to
us. One hint to an understanding of this situation is
that the substitution rule is not as ``local'' as was the one used
for the tiles of Figs.$\,$4, 6 or 7 because to check if a tiling is correctly
made by this substitution process one must examine arbitrarily large
regions of the tiling to see if they are put together correctly. We
need to discuss this difference, because it goes to the heart of our
subject. After all, we said we thought the atoms in quartz make
different patterns from the cells of a snail because they follow
different rules, so we need to be fussy about what kind of rules we
use in making our tilings.

One of the big lessons in physics in this century was the choice
made, following Einstein, to follow the field approach to physics of
Maxwell's theory of electromagnetism rather than the
action-at-a-distance approach of Newton's theory of gravitation [EiI]. In
electromagnetism the influences at a given point (and time) are
determined by the immediate environment of that point, while in
classical gravitation the motion of a planet at one location is
influenced (instantaneously) by the position of the sun (and planets)
far away. Postponing the details until Chapter 2, we just note here
that the laws governing the atomic structure of solids are also of the
local variety, and we use this fact to ``prefer'' such rules in our
tiling problems. As we noted before, the rule which, for any given set
of tiles, associates {\it all} tilings that one can make with those
tiles, is local, while a rule which associates with a set of tiles
only those tilings made by a special technique may or may not be
local; for instance a substitution rule is not local. However,
substitution rules will still be useful -- for instance they will lead
to new ideas about the notion of 
symmetry.

Fundamentally, symmetry means the invariance of something when that
something is acted upon in some way. This is so general, and so
useful, it is hard to imagine altering it. Indeed, when we
say there are new ideas about symmetry what we are referring to is much
more specific. By far the most useful symmetries of patterns in space
correspond to invariance of the pattern under very special transformations: 
rigid motions of the underlying space. The patterns we will be dealing with,
such as the kite \& dart (Fig.$\,$1) or pinwheel (Fig.$\,$13) tilings, 
are usually
not invariant under any nontrivial rigid motion. But the notion of
symmetry for such a tiling can be altered by focusing not on the
tiling itself but on the relationships between its component tiles.

For each tiling we can construct a set of ``frequencies'' of its
finite parts. That is, for each finite collection $p$ of tiles in the
tiling $x$, count the number of times $p$ appears -- in the same
orientation -- in a ball of volume $N$, and divide by $N$, defining, in
the limit $N \to
\infty$, a frequency $\nu(p)$. (We will deal with the existence of these
limits.) One can ask whether such frequencies are invariant when the
tiling $x$ is moved by a rigid motion, such as a rotation. The
interesting thing about, say, a kite \& dart tiling, is that all its
frequencies are invariant under a rotation by $2 \pi /10$ even though
no kite \& dart tiling is itself invariant under a rotation by $2 \pi /10$.

So the new notion of symmetry is still geometric, in the sense of
corresponding to rigid motions; what is new is a shift in the quantity
that is invariant -- instead of the tiling itself, we focus on the
frequencies of its finite parts.

In a nutshell our book will be about how global patterns are produced,
that is, the kinds of production rules they have, and the ways in
which these global patterns can exhibit order and symmetry. 
The production rules we consider do not
necessarily produce single or unique structures, even up to
congruence. But as discussed earlier they almost do
this; any two structures produced by such a rule must be 
indistinguishable by ``local'' inspection, looking at any finite
portion of the structure.

\vfill \eject
\nd
%zzz
{\bf Chapter 1.\ \ Ergodic Theory}
\vs.1 \nd
{\bf \S 1. The idea behind ergodic theory}
\vs.1
We are trying to analyze global patterns in space which are
produced by ``local'' rules -- rules which only depend on pieces of 
the pattern of limited size, such as pairs of neighboring tiles --
and to determine to what extent the global patterns are orderly 
or symmetric.

The question arises: what tools are appropriate for the analysis of such
patterns? In this chapter we will see how ergodic
theory is used to analyze order properties; in Chapter 4 we will extend the
same tools to analyze symmetry properties.

As far as order properties are concerned, two of the examples we
mentioned in the Introduction represent opposite extremes: the
periodic tilings are the most orderly possible, and the random checkerboard
tilings are the least orderly possible. Here we are using a meaning
of orderliness taken originally from probability theory, then imported
into physics, ergodic theory, and other areas. A more descriptive term
for this measure of orderliness is ``long range order'', and before
giving a formal definition we note the intuition behind it.

Imagine we can see the finite portion of a $d$-dimensional tiling near
us, and although we know everything about the tiling we don't know
where we are in the tiling in absolute terms. We measure the degree of
long range order of the tiling by the {\it extent to which we can infer, from the features near us, features of the
tiling far away from us}. We will use a probabilistic approach to
justify such inferences. So imagine we know that where we are there is
some finite collection $p$ of tiles and we want to measure the degree
to which we can expect that at the location relative to us by the
vector $t\in
\R^d$ there is a finite collection $q$. Consider these two
``events'', $p$ and $T^tq$ (we assume $q$ refers to an alternative
finite collection at our present location, so $T^t$ translates it to
the desired place; $t$ is the position of $T^tq$ relative to $q$). Since
we don't know where we are in the tiling, we try to get an estimate of
how likely it is that these two events coexist. We imagine
that any place in the tiling at which the collection $p$ occurs could
be our location, and we treat them all as equally likely. Take a large
ball of volume $N$ centered anywhere in the tiling, count the number of
times the two events $p$ and $T^tq$ occur, and divide by the volume
$N$. We restrict attention to tilings in which this quantity has a well-defined
limit as $N\to\infty$, independent of the location of the center of
the ball. We call this the ``frequency'' $\nu(p\cap T^tq)$ of the joint
event: $p$ and $T^tq$, and we use this frequency to measure our
expectation that $q$ is in the tiling at the relative location $t$ to
us.

The usual model for a structure with extreme lack of 
order 
is a
sequence of independent coin flips, which we have mimicked in our
random checkerboard tilings. Note that for these tilings the only
translations $t$ for which $\nu(p\cap T^tq)$ could possibly be nonzero
are those with integer coordinates, $t\in \Z^d$. But then, once $t\in
\Z^d$ translates $q$ so that $T^tq$ doesn't overlap $p$, we have $\nu(p\cap
T^tq)=\nu(p)\nu(T^tq)=\nu(p)\nu(q)$. (From our assumption, it is
automatically true that $\nu(T^tq)=\nu(q)$ for any $q$ and $t$.)
Generalizing slightly from that extreme case we say a structure does
not have long range order if for fixed $p$ and $q$ in it and large $t$
we have $\nu(p\cap T^tq)\approx \nu(p)\nu(q)$ or, to be more
quantitative, if
$$\lim_{|t|\to \infty}|\nu(p\cap T^tq)-\nu(p)\nu(q)|=0\eqno 1.1)$$ 

\nd where we use the notation $|t|=(t_1+t_2+\cdots t_d)^{1/d}$ for
the usual Euclidean length.
Alternatively, given the knowledge of $p$ at our location we have the
most knowledge about some $q$ at other locations when $p$ determines
the rest of the tiling completely, as is the case for periodic tilings
if $p$ contains a unit cell. In such a situation, since $\nu(p\cap
T^tq)$ equals either $\nu(p)$ or 0 for any $q$ and $t$, neither of
which equals $\nu(p)\nu(q)$, it follows that $|\nu(p\cap
T^tq)-\nu(p)\nu(q)|$ is bounded away from 0 for all $t$. So when
we say a tiling exhibits long range order, that is, 
$$\lim_{|t|\to \infty}|\nu(p\cap T^tq)-\nu(p)\nu(q)|\ne 0\eqno 1.2)$$

\nd we are suggesting a similarity to periodic tilings.

An intermediate case that will appear later is the situation where
\vs0 \nd $[\nu(p\cap T^tq)-\nu(p)\nu(q)]$ is small for ``most'' $t$; that is, 
$$\lim _{N\to \infty}(1/N)\int_{B_N}|\nu(p\cap T^tq)-\nu(p)\nu(q)|\,dt=0\eqno 1.3)$$

\nd where $B_N$ is a ball, centered at the origin, of volume $N$, which
only requires 
\vs0 \nd $[\nu(p\cap T^tq)-\nu(p)\nu(q)]$ to go to 0 on average, allowing
it to stay bounded away from 0 for some $t$.

In summary, we use the behavior of $|\nu(p\cap
T^tq)-\nu(p)\nu(q)|$ for large $|t|$ to characterize a tiling between
the extremes of a completely 
ordered 
periodic tiling and a completely
disordered random checkerboard tiling. (In ergodic theory the
situation of 1.1) is called ``strong mixing'', and that of 1.3) is
called ``weak mixing''.)

The foundation for the subject of ergodic theory is the fact that
frequencies such as $\nu(p)$, which we defined by:
$$\nu(p)=\lim_{N\to \infty}{\hbox{the number of occurrences of }p
\hbox{ in a ball of volume }N\over N}\eqno 1.4)$$

\nd can be related to other quantities. To discuss this we will need to 
introduce some extra structure in our mathematics.
\vs.1
\nd {\bf \S 2. Some mathematical structure}
\vs.1

We are studying the relationship of small components within a large 
structure. One model for that is 
a very long novel made up of ``letters''
drawn from some ``alphabet'' $\A$. For us the letters are polygonal or 
polyhedral tiles,
and the alphabet is a finite collection of such letters, as in Fig.$\,$6. 
One difference between our situation and a
literary analogue is that we refer not only to the {\it
relative} geometric relationships between our letters, but to their
{\it absolute} positions. When we describe a tiling we think
of each tile as occupying a specific position in space. Because a
continuum such as the plane or space is more complicated than a cubic
lattice such as $\Z^d$, we will introduce the necessary mathematical
structure in two steps. The first time around we will only consider
``square-like'' tiles as in Fig.$\,$6, because the associated tilings
have a natural labeling through $\Z^2$. To be more specific we 
begin with the following definition.\vs.05 \nd
{\bf Definition 1.1}.\ A set of polyhedra in $\R^d$ is called
``square-like'' if each possible tiling by these tiles is congruent to one
in which the centers of the tiles are precisely $\Z^d\subset \R^d$ (considered
as a Euclidean space). 
\vs.05 
For square-like $d$-dimensional tiles 
the study of their tilings is essentially the same as the study of those
in which the centers of the tiles are precisely $\Z^d$, and for simplicity
we will mostly be concerned with the special case $d=2$.
It is then natural to associate a tile with each $j\in\Z^2$, and
therefore the tilings, up to congruence, with (certain) points in
$\A^{\Z^2}$, which is the set of all assignments $\displaystyle
x\equiv\left\{\{x_j\}\,:x_j\in\A,\,j\in\Z^2\right\}$ of a letter
$x_j\in\A$ to each site $j$ in the square lattice $\Z^2\subset
\R^2$, or in other words, as the set of functions on $\Z^2$ with
values in $\A$. (We are using here a common notation generalizing 
that of sequences, namely we think of $x=\{x_j\,|\,m\in{\Z^2}\}$ as 
having coordinates $x_j$, one for each site $j\in\Z^2$.)
Most of what we do can be generalized easily
from $\Z^2$ to $\Z^d$, so we will often refer to this more
general context.

As a set $\A^{\Z^d}$ has too little structure to bear much analysis,
we will put a metric on it to measure how far apart a pair of
tilings is. There is no natural choice, but we will define our
metric $m$ with the following in mind. We want that two 
tilings or functions in
$\A^{\Z^d}$ be close in our metric if and only if they are identical
at those points of $\Z^d$ which are in a large ball about the
origin. This is desirable because it would allow us to focus on local
aspects of the tilings. For instance, if we want to compare two
tilings $x$ and $\tilde x$ near the point $j\in\Z^d$, we first
consider the translated tilings $T^{-j}x$ and $T^{-j}\tilde x$ which,
near the origin, are the same as $x$ and $\tilde x$ near $j\in\Z^d$.
Then the number $m(T^{-j}x,T^{-j}\tilde x)$ would be a measure of how much
$x$ and $\tilde x$ differ near $j$, since the metric gives little
weight to the sum total of all points far away from the origin.

We now construct a metric $m$ with the above features.
Starting with the metric $\tilde m$ on $\A$ for
which $\tilde m(a,b)=1$ for $a\ne b$, we construct the metric $m$ on
$\A^{\Z^d}$ by $m(x,y)\equiv \sum_{j\in
\Z^d}\tilde m(x_j,y_j)/2^{|j|}$. For instance, let's use this metric 
to compute
the distance between the tiling $x$ of Fig.$\,$4
and the tiling $y$ obtained from $x$ by translating $x$ one unit to the
right. Note that $x$ and $y$ have different tiles at {\it every}
site of $\Z^2$. So $m(x,y)= \sum_{j\in\Z^2}\tilde m(x_j,y_j)/2^{|j|}=
\sum_{j\in\Z^2}1/2^{|j|}$. In fact {\it every}
translate $y$ of $x$ which doesn't coincide perfectly with $x$ 
differs from $x$ at all sites of $\Z^2$ and therefore is separated
from $x$ by this distance. This would not be true in general, for instance
if we had taken for $x$ the tiling of Fig.$\,$8 or Fig.$\,$12.

For those familiar with point-set topology,
this metric $m$ gives the product topology for this product space
$\A^{\Z^d}$.
Again, we do not claim this metric is particularly natural in detail,
but it does have the properties we wanted.

Also useful is a standard fact (Tychonoff's theorem) that
$\A^{\Z^d}$ is compact in this metric, which means that any sequence
of tilings of $\A^{\Z^d}$ has a subsequence convergent to a tiling in
$\A^{\Z^d}$. (Recall that although our tilings are ``unbounded'' in
$\R^d$, each such tiling is just a point in the space $\A^{\Z^d}$ and
we are referring to compactness in this space, not in $\R^d$.)

Now the main reason we are using a description of tilings which
emphasizes their positions in space, that is, which distinguishes
between a tiling and a translation of that tiling, is that by so doing
we can make use of a natural representation on $\A^{\Z^d}$ of the
additive group $\Z^d$, namely the map which, for each $t\in\Z^d$, takes $x\in
\A^{\Z^d}$ to $T^tx\in\A^{\Z^d}$, where of course $(T^tx)_j\equiv x_{j-t}$ for
$j\in \Z^d$. (See Appendix II for a review of some notation and
results about group representations.)  This is a representation of the
group $\Z^d$ since $T^t(T^sx)=T^{t+s}x$ for all $s,t\in\Z^d$, and in
fact it is continuous in the sense that $T^tx$ is continuous in
$x$ for fixed $t$. We will refer to $T^t$ as {\it translation} by $t\in \Z^d$.

Consider the frequencies mentioned in the Introduction. A tiling
$x\in\A^{\Z^d}$ is an infinite collection of letters $x_j\in\A$, but
it is useful to also consider its finite subcollections, the
restrictions of $x$ to finite subsets of $\Z^d$. We naturally call
such restrictions ``words'' in $x$. The frequencies we refer to are
the frequencies $\nu(p)$ of the finite words $p\subset x$. Intuitively
they are the fractions
$${\hbox{ the number of occurrences of }p\hbox{ in a ball of volume }N\over N}\eqno 1.5)$$

\nd or more properly, the limits of such fractions as $N\to\infty$.
Think of the ``occurrences'' in the fraction as different translates
of the word $p$; in that way the fraction can be interpreted as
something obtained by averaging over translations.  Our next goal is
to analyze the existence of such limiting averages, and techniques
for computing them. This is a fundamental subject, and the main result
in it was obtained in 1931 by George David Birkhoff [Wal], his
pointwise ergodic theorem. This theorem shows the connection between
such frequencies, which are averages over spatial translations, and
averages over tilings. In principle this is merely a shift of
viewpoint; instead of thinking of the fraction as referring to
translates of the word $p$ appearing in different places in one
fixed tiling, one could reinterpret this as referring to the word $p$
appearing fixed in space as we make appropriate translations of the
tiling. This is only ``in principle'' however, because Birkhoff's
theorem is not all that easy to prove, and we won't attempt to do so
here.

Now the mathematics of averaging on a compact metric space $S$ such as
$\A^{\Z^d}$ is, since the work of Andrei Kolmogorov [Kol], part of 
the theory of
integration of functions on $S$. We will need little of the details of
integration theory, mostly just some of the notation and some basic
facts, which we include in Appendix III. As a (very brief)
summary we recall that averaging over tilings amounts to associating,
with any given function $f$ on the space of tilings, an integral
$\I(f)$ of $f$. So averaging over tilings means integrating functions
defined on the set of tilings. And as with the usual integration of
functions on the real line, it is appropriate that the integration
take into account any symmetry or invariance of the objects we are
integrating over. For the real line this corresponds to the ``change
of variable'' formula:
$$\int_{[a,b]}f(x)\,dx=\int_{[a+c,b+c]}f(y-c)\,dy\eqno 1.6)$$

\nd which one requires for instance so that if one interprets the integral 
of a positive function as the area under its graph, that area will be
invariant under a translation of the graph.

There is a similar requirement we make in our integration over
tilings. We are dealing with functions on
$\A^{\Z^d}$, and integrals $I$ of such functions. To discuss
invariance of our integration it is useful to ``lift'' the action of
translations $t\in\Z^d$ from the set $\A^{\Z^d}$ to the
functions and integrals. This means that for any $t\in\Z^d$ and function $f$ on
$\A^{\Z^d}$ we define the new function $T^tf$ on $\A^{\Z^d}$ by
$T^tf(x)=f(T^{-t}(x))$. It is easy to check that this defines a
representation of ${\Z^d}$ on the space of all complex-valued
functions on $\A^{\Z^d}$. And having done that, we can also lift the
action of $\Z^d$ to integrals $\I$ by defining new integrals $T^t\I$
through $T^t\I(f)=\I(T^{-t}(f))$. This leads to the definition: An integral
$\I$ is called ``invariant'' if $T^t(\I)=\I$ for all
$t\in\Z^d$. Requiring that our integrals over tilings be invariant
plays the same role as it does for the usual integration over the real
line (think about this), and corresponds to the fact that our
averaging arises from the frequencies discussed above, in which we
count the number of occurrences  in a tiling. Such averaging is at heart
invariant under translation. This is the reason invariant integrals
are a major ingredient in ergodic theory, as we see in the following
version of the fundamental theorem of ergodic
theory [Wal].
\vs.1
%\vfill\eject
\nd {\bf Theorem 1.2}.\ \ Suppose there is a continuous representation $T$
of the group $\Z^d$ on the compact metric space $X$, and $\I$ is an
invariant integral on $X$. Then the following three conditions are equivalent:
\vs.05 \nd
i)\ $\I$ is the {\it only} invariant integral on $X$;
\vs.05 \nd
ii)\ for every continuous function $f$ on $X$ and $x\in X$,
$$|{1\over N}\sum_{t\in B_N}[T^tf(x)-\I(f)]|\mathop{\longrightarrow}
\limits_{N\to \infty}0 \eqno 1.7)$$ 
\vs.05 \nd
iii)\ for every continuous function $f$ on $X$,
$$\sup_{x\in X}|{1\over N}\sum_{t\in B_N}[T^tf(x)-\I(f)]|\mathop{\longrightarrow}
\limits_{N\to \infty}0 \eqno 1.8)$$ 
\vs.1
To see the connection between this theorem and our discussion of
frequencies, consider a continuous function of the type $\chix_p$
associated with some word \vs0 \nd 
$p\in \A^S\subset\A^{\Z^d}$;
that is, $\chix_p$ is the indicator function of the cylinder set \vs0 \nd
$C_p\equiv \{x\in X\,:\, x_j=p_j \hbox{ for } j\in S\}$ (see
Appendix III). (The indicator function for a set takes the
value 1 when the variable is in the set, and the value 0 otherwise.) 
Taking $f=\chix_p$ we note that the sum
${1\over N}\sum_{t\in B_N}T^t\chix_p(x)$ in 1.7) coincides with the
fraction
$${\hbox{ the number of occurrences of }p\hbox{ in a ball of 
volume }N\over N}\eqno 1.9)$$

\nd in the definition (equation 1.4)) 
of the frequency $\nu(p)$ of the word $p$ in $x$. 
The theorem suggests thinking of such frequencies in the form
$\I(\chix_p)$, that is, in terms of the invariant integral $\I$ and the
collection $C_p$ of tilings, a connection which we will exploit. More
explicitly, even if we are primarily interested in one particular
tiling $\tilde x$ we will find it useful to embed it in a family $X$
of tilings, for instance in (some compact set containing) its
``orbit'' $O(\tilde x)\equiv \{T^t \tilde x\,:\,t\in \Z^d\}$, in order
to use the above machinery to replace the frequency notion with which 
we started.
In the next two sections we will consider two ways of creating
such an $X$.
\vs.1
%\vfill\eject
%zz
\nd {\bf \S 3. Substitution tilings}
\vs.1
As in \S 2, in order to study the relationship between a large number
of small components within a large structure we use the common
mathematical conceit that the small components are letters drawn from
some finite alphabet. There is no conventional mathematical term for
the large structure, which we term either a configuration or tiling,
but intermediate-size structures are conventionally called words.

In this section we develop techniques to analyze tilings made by a
substitution rule such as was used for the Morse tiling of
Fig.$\,$12. This type of construction, and the analytic tools we
develop here, will be used throughout the book.

So we fix some alphabet $\A$ and dimension $d$. Let $\W$ be the set of 
all possible (not
necessarily finite) words made of letters from $\A$, namely
$\bigcup_{K\subset
\Z^d}\A^K$. We will call $p$ a subword of the word $q\in \A^K$ if
there is some subset $L\subset K$ such that $p$ is the restriction of
$q$ to $L$. (Recall that one way to think of $\A^K$ is as functions
from $K$ to $\A$, which explains our use of the term ``restriction''.
In this notation, the word $p$ is a subword of the word $q$ if
at every site of $\Z^d$ where $p$ has a letter $q$ has one, and
it is the same letter.)
We now consider specific classes of compact subsets
$X$ of $\A^{\Z^d}$ which are ``(translation) invariant'', that is, such
that $x\in X$ implies $T^tx\in X$ for all $t\in\Z^d$. Being invariant
means precisely that such $X$ carry their own representation of the
translation group $\Z^d$, so there is no need to refer to any points
of $\A^{\Z^d}$ which are not in $X$. An invariant and closed subset
of $\A^{\Z^d}$ will be called a ``subshift'', as is standard in
ergodic theory.

The first kind of $X$ we consider are the ``substitution
subshifts''. 
To define them we assume given a substitution function,
$F:\A\longrightarrow
\W$ of the form $F=E_\gamma \circ \tilde F$, where $\tilde F$ is a map
that 
has as range not words made of letters of the alphabet, but
words made of letters which are all similar to but {\it smaller than}
the letters in the alphabet: all shrunk by some common factor $\gamma
>1$. And $E_\gamma$ is just expansion about the origin by
$\gamma$.

For example, for $d=2$ and an alphabet of four unit squares labeled
$A,B,C,D$, we define the main component $\tilde F$ of the ``Morse''
substitution function by Fig.$\,$10, and the similarity $E_\gamma$ as
in Fig.$\,$11.
This $F$ has a natural extension to a function from $\W$ to $\W$; for 
instance we have, schematically:
$$F^2(A)=F[F(A)]= \matrix{A&C&C&A\cr B&D&D&B\cr B&D&D&B\cr A&C&C&A\cr}\eqno 1.10)$$

\nd Words of the form $F^k(A)$, $A\in\A$, will be called 
``letters of level $k$'', and the set of all such words, at all levels, 
will be
denoted $\W_F$. (It is worth noting: the four different letters of
level $k$ differ only by a permutation of the ($k-1$)-level letters
in their quadrants.) We are finally ready to define the subshift
$X_F$ associated with $F$.
\vs.1 \nd
{\bf Definition 1.3}.\ $X_F$ is the set of all $x\in\A^{\Z^d}$ such that
every finite subword of $x$ is ``special'' in the sense that it is a
translate of a subword of one of the words in $\W_F$, that is, the
letters of some level.
\vs.1
(To preserve the relation with more general tiling theory, we will sometimes
define $X_F$ more inclusively as the set of tilings {\it congruent} to such
elements in $\A^{\Z^d}$. The metric for that set is a bit more
complicated and will be discussed in Chapter 4. It should always be
clear from the context which convention we are using for $X_F$.) 

As an example of Definition 1.3 let's take $d=2$, $\A = \{A,\ B\}$,
and 
$$F(A)= \matrix{A&B&A\cr B&A&B\cr A&B&A\cr}\eqno 1.11)$$

and
$$F(B)= \matrix{B&A&B\cr A&B&A\cr B&A&B\cr }\eqno 1.12)$$

We leave it as a useful simple exercise to compute $F^k(A)$ for a few
$k$, from which it then follows easily that $X_F$ consists of only two
tilings, each looking like the usual red-black checkerboard (with $A$ denoting
the red squares and $B$ the black ones), each shifted one unit with
respect to the other.

Any such $X_F$ is automatically translation invariant since
by the definition if $x\in X_F$, meaning that each finite
subword of $x$ is a translate of a subword of some word in $\W_F$,
then any translate $y$ of $x$ also has this property and is therefore
in $X_F$. The fact
that $X_F$ is compact is almost as simple; just recall that a closed subset
of a compact space (such as $\A^{\Z^d}$) is compact, and $X_F$ is
closed since any
limit $x\in\A^{\Z^d}$ of a sequence of tilings $x_n\in X_F$ can only
contain words in $\W_F$. 

We now prove some simple facts about
substitution subshifts, the first showing that each tiling made
in this way has some form of hierarchical structure. 
\vs.1 \nd
{\bf Lemma 1.4}.\ Each $x\in X_F$ is also a tiling by letters of level
1, and therefore also by letters of level $k$, for any fixed $k$.
\vs0 \nd Proof.\ Fix $x\in X_
F$, and consider its subwords $p^n=\{x_m\,:\, |m|\le n\}$. 
($\{m\in \Z^d\,|\,|m|\le n\}$ is just the subset of $\Z^d$ inside a closed
ball of radius $n$.)
Recall that
by construction letters of level $k$ are made up of letters of level
$k-1$, and therefore also of all lower levels, and that from the
definition of $X_F$ we know that $p^n$ must be a subword of a letter
of some level. Therefore, except near its edge, $p^n$ itself consists
of letters of level 1. It follows that for each $x_k,\ |k|\le n$,
except those for which $|k|\approx n$, there is a letter of level 1 in
$x$ in which it sits; call it $a^n_k$. (As we vary $n$ it needn't be
true that $a^n_k=a^{n'}_k$.) So for each $M>0$ there is an infinite
subsequence $n_j$ such that for each $k,\ |k|\le M$, $a^{n_j}_k$ is
independent of $j$. By diagonalization there is a subsequence $\tilde
n_j$ such that for all $k\in \Z^d$, $x_k$ sits in the same letter
$a^{\tilde n_j}_k\in x$ for all $j$. This proves the case of level 1,
and the general case follows by induction.
\qed
\vs.1 
Visually, this says one can think of a substitution tiling as
a tiling by letters {\it at any fixed level} - in particular,
letters of arbitrarily large size. An example is exhibited in
Fig.$\,$14, where a Morse tiling is shown at two different levels. A
less interesting example is shown in Fig.$\,$15, where a periodic
checkerboard tiling is shown at two levels. The latter example is less
interesting because the higher-level tiling is not uniquely determined
by the lower-level tiling: one can group the lower-level letters into
appropriate sets of four in four different ways, leading to four
different higher-level tilings. We will see from Lemma 1.9 why it is
more interesting when the higher-level tiling is determined by the
lower-level one, but intuitively it is reasonable that only if the
correspondence between different levels in a tiling is unique does
this provide a firm structural feature of the tiling which may have
interesting consequences.
\vs.1
The next lemma gives a simple criterion for applying Theorem 1.2 to tilings.
Recall that this theorem is one of the main tools for our analysis of tilings,
as it enables us to understand a tiling through the frequencies of
its finite subwords.
To apply Theorem 1.2 we need to rule out a certain form of degeneracy, 
illustrated by the following example.

We take $d=2$, $\A = \{A,\ B\}$, and define $F$ by:
$$F(A)= \matrix{A&A&A\cr A&A&A\cr A&A&A\cr}\eqno 1.13)$$

and
$$F(B)= \matrix{B&B&B\cr B&B&B\cr B&B&B\cr }\eqno 1.14)$$

\nd $\W_F$ contains only words which consist
only of $A$'s or only of $B$'s, so that each $x\in X_F$ has the same feature.
That is, $X_F$ consists of only two tilings, $x_A$ for which all
coordinates are $A$'s and $x_B$ with all
$B$'s, both being invariant under translation. We can then define
two translation invariant integrals on $X_F$: $\I_A$ defined
by $\I_A(f)=f(x_A)$ for all $f$ and $\I_B$ defined by $\I_B(f)=f(x_B)$.
So for this example there are two different invariant integrals
and we cannot use Theorem 1.2.

The following will provide us with a simple criterion enabling us to use
Theorem 1.2 in our analysis of tilings. (Note that the hypothesis
does not hold for the above example.)
\vs.1 \nd
{\bf Lemma 1.5}.\ Assume there exists $m$ such that for each $a\in \A$,
$F^m(a)$ contains all $a'\in \A$. Then there is one and only one
translation invariant integral on $X_F$.
\vs0 \nd Proof.\ The method of proof is to show that there is
an invariant integral $\I$ on $X_F$ such that condition ii) of Theorem
1.2 holds. As presented in Appendix III, we think of integrals on a
compact metric space $S$ such as $X_F$ as certain types of linear functions
on the space $C(S)$ of complex continuous functions on $S$. Now if
we can show, for each $f\in C(X_F)$ and some tiling $x'$, that the
sequence ${1\over N}\sum_{t\in B_N}T^tf(x')$ is convergent, then the
limits can be used to define an integral $\I$ by $\I(f)\equiv
\lim_{N\to\infty}{1\over N}\sum_{t\in B_N}T^tf(x')$. Such an $\I$ is then
easily seen to be invariant. So the only difficulty is to prove that
such sequences are convergent.

Now it is a standard fact [Tay] that linear combinations of functions of
the form $\chix_\a$ (the indicator function for the cylinder
set defined by the word $a$) are dense in $C(X_F)$, so we need only prove
convergence for such functions. As noted in 1.9), a limit of ${1\over
N}\sum_{t\in B_N}T^t\chix_\a(x)$ is interpretable as the frequency of
the word $\a$ in the tiling $x$, so we are really showing the
existence of such frequencies. We make one simplification: instead of
dealing with arbitrary words $\a$, we will consider only words of one
letter. That is, we will show that each letter of $\A$ appears with a
well-defined frequency, in fact the {\it same} frequency, in {\it
every} tiling $x$. (Our proof will even show that the convergence of
the approximate frequency is uniform in $x$, as claimed in part iii)
of the theorem. The generalization to arbitrary words is not
difficult, and we refer to [Ra3] for details.)

It is useful to express the alphabet in the form
$\A=\{a_1,a_2,\ldots,a_K\}$ so we can introduce the notation that
iteration $F^m(a_k)$ of the substitution function produces letters
(of level $m \ge 0$) of ``type $k$''. From Theorem 1.2, all we
need show is that the relative fraction of letters of different type
in a word of the form $F^n(a_k)$ has a well-defined limit as
$n\to \infty$, and that the limit is independent of the type $k$.
We prove this next.

We define the $K\times K$ matrix $M$ for which $M_{jk}$ is the number
of type $j$ letters (level 0) in a type $k$ letter of level
1. It follows that $(M^n)_{jk}$ is the number of type $j$ letters in a type $k$
letter of level $n$. For the Morse tilings (Fig.$\,$10)

$$M= \pmatrix{1&1&1&1\cr 1&1&1&1\cr 1&1&1&1\cr 1&1&1&1\cr}\eqno 1.15)$$

\nd From the hypothesis there is some $m$ such that $(M^m)_{jk}>0$ for all $j,k$. (The Morse example satisfies this condition with $m=1$.)

We now apply the Perron-Frobenius theorem, in a slightly unusual form 
[Rue] (see Appendix III for notation):
\vs.1 \nd
{\bf Theorem 1.6.}\ Let $\tilde M$ be a real $K\times K$ matrix such that:
\vs.05
a)\ $\tilde M_{jk}\ge 0,\ \ {\rm for\ all}\ j,k$

b)\ $(\tilde M^N)_{jk}>0,\ \ {\rm for\ all}\ j,k,\ {\rm for\ some}\ N\ge 1$
\vs.05 \nd
Then there is a simple eigenvalue $\lambda >0$ for both $\tilde M$ and
its adjoint $\tilde M^*$, with corresponding eigenvectors $\xi,\,\tilde \xi$,
having strictly positive components, and satisfying
$${\tilde M^n\over \lambda^n}x\mathop{\longrightarrow}\limits_{n\to \infty} 
<\!\tilde \xi,x\!>\xi\ \ 
{\rm for\ all}\ x\in \C^K \eqno 1.16)$$
\vs.05 \nd
{\bf Corollary 1.7.}\ The spectral radius of $\tilde M$ (see Appendix III) is
$\lambda$.
\vs.05 \nd
{\bf Corollary 1.8.}
$${(\tilde M^n)_{jk}\over \lambda^n}={<\!\hat e_j,\tilde M^n\hat e_k\!>\over
\lambda^n}\mathop{\longrightarrow}\limits_n\ \tilde \xi_k\xi_j>0\eqno
1.17)$$

\nd where $\{\hat e_j\}$ is the usual basis in $\C^K$.
\vs.1

We now continue with the proof of Lemma 1.5.
It follows from 1.17) that there is some
$\lambda >0$, and functions $g,h$, such that for all $j,k$:

$${(M^n)_{jk} \over \lambda^n}\ \ \lower1ex\hbox{${\hbox to
50pt{\rightarrowfill}\atop {n\to \infty}}$}\ \ g(j)h(k)>0\eqno 1.18)$$

\nd Therefore

$${(M^n)_{jk} \over (M^n)_{j'k}}\ \ \lower1ex\hbox{${\hbox to
50pt{\rightarrowfill}\atop {n\to \infty}}$}\ \ {g(j)\over g(j')}>0\eqno 1.19)$$

\nd The important points are that the limits in 1.19) exist, and that they are
independent of $k$, which are precisely what was needed to prove our
result. \qed
\vs.1 
(Note that if, as in the comment after Definition 1.3, we think of
$X_F$ as all tilings {\it congruent} to those associated with
points of $\A^{\Z^d}$ instead of just integral translates, 
it could not be ``uniquely ergodic'' -- that is,
have only one invariant integral -- since the frequencies of tilings 
turned by, say, 45 degrees correspond to a different integral.)

In the next lemma we see that substitution tilings tend to be
complicated, at least in the sense that they cannot have any
nontrivial translational symmetry, and in particular they cannot
have a unit cell such as Fig.$\,$4. This hints at why substitutions will be 
so useful to us.
\vs.1 \nd
{\bf Lemma 1.9}.\ Assume the decomposition of Lemma 1.4 into
letters of every level $k$ is unique for each
$x\in X_F$ and level $k$. Then for all $x\in X_F$,\ $T^tx=x$ implies $t=0$.
\vs .1 \nd We will postpone the proof of this lemma until Chapter 4
(Lemma 4.1),
where we expand our analysis of symmetry properties of tilings and can
then give a more general proof of this phenomenon.
\vs.5 \nd
%zz
\nd {\bf \S 4. Finite type tilings}
\vs.1
We saw in the last section how to use a ``substitution'' method to
produce rather complicated tilings. But that method is not a {\it local}
rule of the type we want. We are trying to understand what kind of
global structures, for instance tilings, can be produced by local rules like
those of a jigsaw puzzle, rules which only depend on parts of the
global structure of limited size. The rules of a jigsaw puzzle
consist merely of the requirement that neighboring tiles fit together, which
is local in this sense, while the tilings made by substitution 
require consideration of subwords of all sizes, and this is nonlocal.

Let us go back to a primary motivation, the
kite \& dart tilings of Fig.$\,$1. These are composed of two simple
shapes, a kite and a dart (Fig.$\,$16). The substitution for the kite
\& dart tilings uses $\tilde F$ as in Fig.$\,$17 with $\gamma =
(3+\sqrt{5})/2$. (The dots form the outlines of the kite and
dart, which are associated by $\tilde F$ with several small size
darts and kites, outlined in solid lines in the figure.)
It is not hard to show that the substitution function
$F=E_\gamma \circ \tilde F$ can be extended to map words to words (as is
automatically true for subshifts); that is, the image of a word is again
a word, without any overlapping.  The kite \& dart (substitution)
tilings are now defined roughly as in the previous section, as all
tilings $x$ such that each finite word in $x$ is congruent to a subword
of some $F^m(a)$ where $a$ is a kite or dart.

But there is a ``better'' way to understand kite \& dart tilings,
using the two tiles in Fig.$\,$18, and jigsaw puzzle rules. That is, it
can be proven [Gar] that the {\it only} way to tile the plane with copies of
the tiles in Fig.$\,$18 is to make a tiling in which these modified
tiles {\it must} be grouped together into the collections indicated in
Fig.$\,$17; and these collections {\it must} be grouped together into
the collections of collections produced by $F^2$, etc. In
other words, one can modify the original quadrilaterals of Fig.$\,$16,
adding bumps and dents to the edges as in Fig.$\,$18, so that the {\it
only} way these modified tiles can tile the plane is in the special
ways the unmodified tiles tiled the plane using the substitution
method. The two original quadrilaterals of Fig.$\,$16 can abut
to form a rhombus from which one can tile the plane in a simple
periodic way; this is what adding the bumps manages to avoid.

This is magic! Remember, the substitution method was a simple way to
produce complicated tilings. And what we have here is a way to
reproduce the interesting end result, but now using honest-to-goodness
local rules! And not only does it work for the kite \& dart tilings
but for ``most'' substitutions. This is important for our analysis
so we will next go through a more complicated example in detail,
the Morse tilings, which we
produced earlier by a substitution process. That is, we will now
show how to make new tiles, which are unit squares like the
originals but with certain patterns
of bumps and dents on their edges, so that they can {\it only} 
tile the plane in
the manner of the Morse substitution tilings. 

The original 
Morse set (Fig.$\,$9)
contains four tiles and the new set will contain 56, so the situation is
not as simple as for the kites and darts, where there was
only one new tile for each original tile. For the kite \& dart tilings 
it is easy to see why we
say the modified tiles reproduce the original tilings -- all you
have to do is ignore the bumps and dents of the modified tiles
in one of their tilings and you get an original tiling. The
situation has to be a bit more complicated with the Morse tilings,
and the best way to understand this is through the proof that will
follow.

Before describing the new
bumpy tiles, let's review some qualitative features of the Morse
tilings. 
There are four different Morse tiles, which we can think of as
differently colored unit squares, called $A, B, C$ and $D$. From Lemma 1.4
the Morse tilings can be thought of as consisting of nonoverlapping {\it
collections} of letters or tiles, each collection being one of the four
shown in Fig.$\,$10. In other words, a Morse tiling can be interpreted
as in Fig.$\,$14, a tiling by letters of level 1. Continuing this line
of thought, these letters of level 1 fit together to make letters of
level 2, which are collections of 16 ordinary tiles (as in equation
1.10), leading to a different interpretation of the same Morse tiling,
as a tiling by letters of level 2: and so on. In fact it will be useful
to know that these decompositions, of a Morse tiling into letters of
arbitrary but fixed level, are unique in the sense of Lemma 1.9. To see
this note (as one sees in Fig.$\,$12) that each row and each column in a
Morse tiling consists of a sequence of only two of the letters. Since in
each of the letters of level 1 no letter is repeated, it follows that in
a row or column of a tiling wherever one finds a letter repeated the
pair cannot belong to the same letter of level 1. So once we find such a
repetition in a row we know where the vertical boundaries of one, and
therefore all, letters of level 1 must be, throughout the tiling. And
once we find such a repetition in a column we know where the horizontal
boundaries of all letters of level 1 must be. (All rows and columns have 
repetitions.) So there is only one way to
decompose a tiling into letters of level 1. And similarly there is only
one way to decompose a tiling into letters of level 2, level 3, etc.

In fact one can think of these tilings at different levels in a Morse
tiling as having been constructed by a sequence of choices as
follows. ``Choose'' some starting letter, say $A$, at the origin
of $\Z^2$. Then choose one of the four possible letters of level 1 for it
to belong to, say that associated with letter $B$ -- what we call the
letter of level 1 and type $B$. The letter $A$ is in the bottom left
corner of that collection, which tells us where three other (level 0)
letters are in the tiling. Now think of how this letter of level 1 and
type $B$ must sit in a letter of level 2 -- that is, choose another of
the four types, say $A$, again. That tells us that the level 1 letter sits
in the upper left corner of the collection of 16 letters, which
determines 12 more (level 0) letters of the tiling. In this way, by a
sequence of choices we determine the tiling.

We should point out however that there is one complication in the above 
analysis; not every sequence of
choices leads to a full tiling. For instance, if we choose type $A$
every time, we only fills out a quadrant, not the whole plane. So some
tilings require two, three or four sequences of choices to fill out the
plane. Given that complication this is a way to classify all the Morse
tilings, and is a useful way to understand the Morse tilings, or indeed
any substitution tiling (at least when Lemma 1.9 applies).

We have reviewed the Morse tilings sufficiently, and now we
return to our promise to exhibit a new set of tiles (due to 
Raphael Robinson ([Rob, GrS]) 
which can
{\it only} tile the plane in the manner of the Morse tilings.
That is, we will construct a finite alphabet $\A$ of square-like
tiles, and consider the set $X_\A$ of {\it all} tilings that can be made
by congruent copies of the letters in $\A$, and show that in an
appropriate sense these are the ``same'' as the Morse tilings. Systems
such as $X_\A$ will be called ``finite type subshifts'', to distinguish
them from the substitution subshifts of the last section. We record
some of this in the following definition.
\vs.1 \nd
{\bf Definition 1.9}.\ Given a finite alphabet $\A$ of polyhedra in
$\R^d$, we define the ``finite type'' system $X_\A$ as the set of {\it
all} tilings of $\R^d$ by congruent copies of letters in $\A$.
\vs.1 
We are going to think of this as a rule for producing tilings. This
may seem odd at first, since by generating ``all'' tilings made from
an alphabet one expects the output to contain a wide variety,
inappropriate for the intuitive expectation for a production rule. But
this need not be the case. The first tilings we constructed in the
Introduction, using an alphabet of $K^2$ tiles, only allows one tiling
up to congruence (pictured in Fig.$\,$4 for $K=6$). And we will be
concentrating on alphabets which only allow tilings which are locally
indistinguishable -- every finite subword of one appears in every
tiling made from that alphabet -- so in an intuitive sense one can
still think of the output as being essentially unique, that is, as the
rule ``producing'' something. This is also the manner in which the
laws of statistical mechanics picture the production of bulk matter,
as we will see in the next chapter.

If the alphabet is square-like then as with substitution subshifts we
can restrict attention to those tilings for which the centers of the
tiles lie on $\Z^d$. Then 
a finite type subshift $X_\A$ is a translation invariant,
compact subset of $\A^{\Z^d}$ for the same reasons as for substitution
subshifts.

Now for Robinson's example. Consider first the five ``basic'' tiles at the top
of Fig.$\,$19.  Number 1 is called a ``cross'', and the other four are
called ``arms''. For later interpretation it will be convenient to
substitute the tiles directly below them, which replace the bumps and
dents by appropriate arrows.

Consider also the three ``parity'' tiles with bumps and dents, numbered
6-8, and the three tiles below them which substitute arrows for the bumps
and dents. 

The tiles we will actually use are obtained by superposing these eight
preliminary tiles (in the arrow versions). With tile 1 one
can superimpose tile 7. With tiles 2--5 one can superimpose tile 8. And
any of tiles 1--5 can be superimposed with tile 6. Those are the rules
for superimposing, and they yield ten different tiles as in Fig.$\,$20. 
In producing tilings, each of these ten types of tile can be rotated
or reflected. (A little thought shows these lead to 56 different types
of tile which must be used if one is not allowed to rotate or reflect
in producing a tiling).

Remember that the arrows stand for bumps and dents, so it is easy to
determine which pairs of tiles may abut in a tiling: only those for
which arrow heads meet arrow tails and vice versa.

The patterns of arrows have been separated into two classes for a
reason. Each tile consists of a basic component and a parity
component, and the rule which determines which pairs of tiles may abut
in a tiling reduces to requiring that the pair of basic components may
abut together with requiring that the pair of parity components may
abut. 

The parity tiles are simpler so we consider them first. 
In a tiling parity components must alternate
horizontally and vertically in the pattern shown in Fig.$\,$21. So much
for the parity components!

To analyze how the basic components of tiles may appear in a tiling we
consider two aspects. First we use the rules by which parity and basic
components are combined to see what follows from the alternating
pattern just determined for parity components. Now from the fact that
parity tile 7 only combines with a cross, and from the alternating
pattern of parity components, we see that in a tiling certain crosses
(those combined with parity tile 7, not all crosses) will appear in
every other position horizontally and every other position
vertically. These tiles will be called 1-squares. The remainder of the
analysis of the basic components will not depend on any other feature
of the parity components.

For convenience we introduce some notation and abbreviated graphics
for the basic tiles. Arrows on these tiles will be called ``in
arrows'' if they end in the interior of the tile, and ``out arrows''
if they end at an edge. An arrow will be called ``central'' if it lies
on a line going through the center of the tile, and otherwise it is a
``side arrow''. Each of the four types of arm has one ``principal''
arrow, the central out arrow. We will sometimes abbreviate an arm
by displaying only its principal arrow or its principal and side
out arrows, as in the top of Fig.$\,$22.

The cross in Fig.$\,$17 is said to ``face'' in two directions, the right
and upward, because of the directions of its side arrows. When we wish
to ignore this feature we abbreviate the cross as in the bottom of
Fig.$\,$22.

We now begin the analysis of the pattern of basic components of tiles
with the 1-square. Straightforward checking of possibilities shows
that they must appear at the corners of sets of nine tiles as in Fig.$\,$23. 
(Although we know there is a cross at the center, we do not know
in which directions it faces.) Such a set of nine tiles with 1-squares
at the corners is called a 3-square, and it will be said to face in
the directions of the cross at its center.

We next determine the pattern of those crosses which are not
1-squares. (If we use the suggestive notation that the 1-squares are
in the ``odd-odd'' positions in the tiling then these other crosses
can only be in certain ``even-even'' positions.) Suppose we have such a
cross in some row, with one side arrow facing up, the other facing either
left or right. Consider the tiles to the right of the cross. There
will first be some sequence (possibly empty) of horizontal arms headed
right. If the sequence is not infinite, there must then be a single
vertical arm, then a sequence (possibly empty) of horizontal arms
headed left, and another cross. Because of their side arrows, two such
consecutive crosses must either be back-to-back as in the top row of
Fig.$\,$24, or face each other as in the bottom row of Fig.$\,$24. 

We will next show that for consecutive crosses which face one another
the separation is even, measured between the centers of the
tiles. Consider the horizontal arms and single vertical arm between 
such a pair of crosses. They all have arrow tails on their top edges,
so the tiles abutting their top edges must consist alternately of
crosses and vertical arms headed down. Since this argument also holds
for columns, this alternating sequence of crosses and vertical arms
must begin and end with crosses, as in Fig.$\,$25. This proves that the
separation between facing crosses is even.

Let us now apply these facts about facing crosses to the crosses at
the centers of 3-squares. Suppose such a cross faces up and to the
right, as in the bottom left corner of Fig.$\,$26. We will show that it
determines the other tiles of Fig.$\,$26 to the extent indicated. Note
first that the directions of the three arms to the left and the three arms
below the tile in the center of the figure are forced by the side
arrows of the cross in the center of our 3-square. These arms then
force a cross to be in the center of the figure. From our previous
analysis this cross fixes the positions (but not directions) of the
crosses in the row above it and in the column to its right. The
directions of these crosses however must be as shown, for otherwise
there would be the head of an arm abutting the central cross. And
these crosses in the neighboring row and column force the three 3-squares
as well as the rest of the arms. In this way each of the four 3-squares
in Fig.$\,$26 forces the remaining pattern, which we call a 7-square.

Similarly, each 7-square forces the presence of three other 7-squares
and the rest of a 15-square by expanding in the directions of the
central cross of the first 7-square. And similarly for 31-squares,
63-squares, etc. In summary, each 1-square in a tiling is contained
within a unique 3-square, which is contained in a unique 7-square, and
so on for $(2^n-1)$-squares of all $n$. This expanding sequence of
squares can be thought of as being produced by a sequence of choices
of directions for the central crosses.

However, starting from a 1-square and making choices may lead to a
quarter plane (for instance, if all choices of pairs of directions are
the same), or a half plane (for instance if half the choices are up
and to the right, and the other half are up and to the left). So a
tiling may be made up of four such quarter planes, or two such half
planes, or a half plane and two quarter planes. Between two such half
planes or quarter planes there must be a row or column of arms. Now
although 1-squares appear in a perfect checkerboard pattern because of
the parity tiles, this need not be the case for the other $(2^n-1)$-squares.
Specifically, this may break down across the column or row dividing
the quarter or half planes we have been discussing; consider the
3-squares in Fig.$\,$27. Such a column or row will be called a
``fault line''.

Note that except for tilings with fault lines, the tilings we have
described for these ten Robinson tiles have a natural one-to-one
correspondence with the Morse tilings. That is, we recall that the
Morse tilings can be thought of as being created by an infinite
sequence of choices; as one builds a larger and larger part of the
tiling, each term in the sequence of choices determines on which of the
four corners of a new larger square the already produced collection of
tiles will lie. And of course the Robinson tilings can also be built
that way, with the choice of directions for the $n^{th}$ cross
determining which corner of the $(2^{n}-1)$-square the already built
$(2^{n-1}-1)$-square will occupy. We will have to discuss the nature
of this correspondence between the two sets of tilings in more depth,
to determine which features it preserves and which it does not, and
the relevance of these various features. (Is it a problem that the
number of types of tiles is different in the two collections of
tilings?)

Recalling some notation from the Introduction, if we let $\A$ be the
set of ten Robinson tiles $a-j$ in Fig.$\,$20 and $X_\A$ be the set of
all tilings that can be made with these tiles, we have shown that
except for some complication about tilings which decompose into
tilings of quarter and/or half planes, there is a natural one-to-one
correspondence between the Robinson tilings $X_\A$ and the Morse
tilings $X_F$. We have introduced this notation about sets $X$ of
tilings, with a metric on $X$ and integration of functions on $X$,
just for such analysis, to which we now proceed.

Consider first the Morse substitution system. It satisfies the
conditions for Lemma 1.5 since every letter of level 1 contains all four
letters of $\A$, so we know there is only one $\Z^2$-invariant
probability integral on $X_F$. For the Morse $X_F$ (resp.\ Robinson
$X_\A$) consider the ``nice'' subset $\tilde X_F$ (resp.\ $\tilde X_\A$)
consisting of those tilings associated with only one sequence of choices
(i.e.,\ for which the sequence determines a tiling of the full plane, not
just a quadrant or half space).

Recall the metric we have placed on spaces of tilings. Two tilings are
close in this metric if and only if as functions on $\Z^2$ they agree
on all points in $\Z^2$ in a large ball centered at the
origin. Recalling the correspondence between $\tilde X_F$ and $\tilde X_\A$
it follows that the one-to-one correspondence, and its inverse, are
continuous. We will show that in a natural sense the rest of the
spaces $X_F$ and $X_\A$ are negligible, but first a few words about
the negligible sets.

Consider the frequency with which some finite word $w$ appears in a
tiling $x$ in $\tilde X_F$ or $\tilde X_\A$. Making use of the
hierarchical structure of $x$ -- the decomposition into letters of any
fixed level for $\tilde X_F$, or into $(2^{n}-1)$-squares for $\tilde
X_\A$ -- we can, as in the proof of Lemma 1.5, estimate the frequency of
some fixed $w$ by computing its frequency in a letter of high level if
$x\in \tilde X_F$ or its frequency in some $(2^{n}-1)$-square for large
$n$ if $x\in \tilde X_\A$.  And as shown in that proof, such a frequency
is well-defined in the limit of large hierarchical level, and
independent of the type of letter (or $(2^{n}-1)$-square) we use. 
Precisely the same words appear in all the $x\in \tilde
X_F$ or in all the $x\in \tilde X_\A$.  This may not be true for $x$
outside these ``nice'' sets. For instance if $x\in X_F-\tilde X_F$
contains a fault line as defined above, there are words which straddle
the fault line and which do not appear in any $x\in \tilde X_F$
(Fig.$\,$27). However such a word can only appear along a fault line, so
its frequency is 0.

Now fault lines are by definition boundaries between ``infinite-level''
parts of the hierarchy; they are boundaries at which two infinite parts
do not meet well, in the sense that there are words overlapping the
boundaries which are not subwords of letters of some level. For
completeness we note that we can have infinite parts meeting well, as
occurs naturally in substitution systems. Recall that a substitution
system $X_F$ consists of all tilings which {\it only} contain words
which are subwords of letters of some level, so there cannot be such a
thing as a fault line in a substitution system. But there will be
tilings in $X_F$ which contain parts of ``infinite-level'' letters, as
follows. Take any tiling $x$ in the nice part $\tilde X_F$ of a
substitution system. It contains letters $L_n$ of level $n$ and type $\alpha$
for all $n$ and $\alpha$. Construct the new tiling $x_n$ by translating $x$
so that a letter of level $n$ and some specific type $\tilde \alpha$ has the
tile of its bottom left corner at the origin. Although this sequence
$\{x_n\}$ of tilings may not have a limit, any accumulation point $x$ of
in $X_F$ of $\{x_n\}$ will have part of an infinite-level letter in its
first quadrant. (The {\it type} of that infinite-level letter is not
meaningful since two letters of a given level only differ on the largest
scale; so there can only be one type of infinite-level letter.) The
existence of such accumulation points $x$ follows from the fact, noted
just after their definition, that substitution systems such as $X_F$ are
compact. 

Finally, we said we would show that the ``nice'' tilings are the
essence of the examples, that the rest of the tilings are, in some
reasonable sense, negligible.  We show this simultaneously for the
Morse and Robinson systems; we call the full system of tilings $X$,
the nice subset $\tilde X$ and the invariant integral $\I$.

Our definition of a negligible set $S$ is one for which for any
$\epsilon > 0$ there is a set $S_\epsilon \supseteq S$ such that
$\I(\chix_{S_\epsilon})<\epsilon$. Recall that the indicator
function of a set, such as $\chix_{S_\epsilon}(x)$, has value 1 when
the variable $x\in S_\epsilon$ and value 0 otherwise. The integral of
such a function is an indication of the size of the set. (In
particular, the integral of such a function must decrease with the set
-- if $S^{\prime}\subset S^{\prime\prime}$ then $\chix_{S^{\prime}}\le
\chix_{S^{\prime\prime}}$ -- and if for some family $\{S(n)\}$ we have
$\cap_n S(n)=\emptyset$ then, with $S^N\equiv \cap_{n\le N} S(n)$,
$\I(S^N)\to 0$ as $N\to \infty$ by the Monotone Convergence
Theorem -- Appendix III.) So the condition
$\I(\chix_{S_\epsilon})<\epsilon$ indicates that the set
${S_\epsilon}$ is small, and we are saying that a set is negligible if
there are arbitrarily small sets containing it.

Now although it is quite possible to have negligible sets containing
uncountably many points, it is always true (if the full space $X$ is
uncountable) that a countable subset $S\subset X$ is automatically
negligible. To see this note first that the indicator functions
of any two singletons (sets containing only one point) must have the
same integral since the integral is invariant. If the value were not
zero then the indicator function $\chix_{S_n}$ for any set $S_n$
containing a suitably large finite number of points would, by
linearity of the integral, have integral
$\I(\chix_{S_n})>1=\I(\chix_X)$. But this would contradict the fact
that $\chix_{S_n}\le \chix_X$. Given a set $S\subset X$ containing
countably many points we can choose a sequence of subsets $S_n$
containing $n$ points, $S_n\subset S$, $S_{n+1}\supset S_n$ and
$\cup_nS_n=S$. Then from the Monotone Convergence Theorem (Appendix
III), $0=\I(\chix_{S_n})\longrightarrow
\I(\chix_S)$ and $\I(\chix_S)=0$ as claimed.

Getting back to the tilings, we want to show that $X-\tilde X$ is
negligible. So consider a point in $X-\tilde X$, for instance a tiling
with an infinite vertical line, corresponding to some infinite-level
letter or infinite-level square on at least one side. What can be said
of the set $A$ of all such tilings? $A$ is the countable union of {\it
disjoint} closed sets $A_n$ in which the line has fixed position
indexed by $n$. (These sets are disjoint since a tiling cannot have
two such infinite edges -- the region in between would be incompatible
with the unique hierarchical structure of the tilings which we
analyzed early in this chapter.) For each of these countably many
subsets $A_n$ the indicator function $\chix_{A_n}$ has the same
integral since the sets are translates of each other and $\I$ is
translation invariant. By the same method as before we see that this
value must by 0, and that the integral $\I(\chix_A)$ of the
indicator function of the union $A=\cup_nA_n$ must also have
value 0.

This is the basic argument. Now there are a finite number of other
such cases -- tilings with various combinations of quarter spaces and
half spaces, and by the same reasoning the set of such tilings is
negligible. This completes the argument that the nice tilings are the
essence of the examples, and our demonstration of how a substitution
system can be mimicked by finite type (i.e.,\ jigsaw puzzle) rules. We
have intimated that this is wonderful, so we next show how it can be
used.

Imagine we wanted to make a set of tiles which could only tile the plane
in a 
disorderly 
manner, in the sense of section 1 of this chapter.  For
various reasons this sort of study has been made in some depth but 
not for tilings made by the finite type rules in
which we are interested. For instance, it is known [DeK] that the
Dekking-Keane substitution tilings made with the tiles of Fig.$\,$28 and
the substitution rules of Fig.$\,$29, are disorderly to the extent that
they satisfy 1.3). Now if we had a general way to mimic with finite type
rules the tilings made by substitution rules, in the way we just mimicked the
Morse tilings with Robinson tilings, we would be in business.  
To a large extent such a general procedure is known, due to Shahar Mozes
[Moz]. We will not give his results in complete generality but
restrict to the most useful situation.

We begin with ``symbolic substitutions'', consisting of a finite
alphabet of abstract symbols, and, associated with each letter in the alphabet,
a word of at least 2 letters. For instance the 
the alphabet might be $\A\equiv \{0,1\}$ and the associated words
(containing 3 and 5 letters respectively):

$$0\longrightarrow 001,\ \ \ 1\longrightarrow 11100\eqno 1.20)$$

\nd Given 2 such alphabets $\A_1=\{a_1,\cdots, a_K\}$
and $\A_2=\{c_1,\cdots, c_L\}$, and substitutions 

$$\eqalign{a_j\in \A_1 &\longrightarrow a_{k_1(j)},a_{k_2(j)},\cdots 
a_{k_{n(j)}(j)}\cr
c_k\in \A_2 &\longrightarrow c_{j_1(k)},c_{j_2(k)},\cdots 
c_{j_{m(k)}(k)}\cr}\eqno 1.21)$$

\nd we construct an alphabet of rectangles in the plane and a 
substitution function for that alphabet. The alphabet has
one rectangle for each element of the product $\A_1\times
\A_2$; namely, associated with $(a_j,c_k)\in \A_1\times \A_2$ we have the
rectangle $R(a_j,c_k)$ with dimensions $n(j)\times m(k)$ (taken from the
substitution rules 1.21). The substitution for the rectangle
$R(a_j,c_k)$ is made by using the substitution for $a_j\in \A_1$
horizontally and the substitution for $c_k\in\A_2$ vertically:

$$\matrix{
    R(a_{k_1(j)},c_{j_1(k)})&R(a_{k_2(j)},c_{j_1(k)})&\cdots&R(a_{k_{n(j)}(j)},c_{j_1(k)})\cr
    R(a_{k_1(j)},c_{j_2(k)})&R(a_{k_2(j)},c_{j_2(k)})&\cdots&R(a_{k_{n(j)}(j)},c_{j_2(k)})&\cr
    \cdots&\cdots&\cdots&\cdots\cr
    \cdots&\cdots&\cdots&\cdots\cr
    \cdots&\cdots&\cdots&\cdots\cr
    R(a_{k_1(j)},c_{j_{m(k)}(k)})&R(a_{k_2(j)},c_{j_{m(k)}(k)})&\cdots&R(a_{k_{n(j)}(j)},c_{j_{m(k)}(k)})&\cr
}\eqno 1.22)$$
\vs.05
\nd In particular, the Dekking-Keane substitution of Fig.$\,$29 is
made from 2 copies of the symbolic substitution of 1.20). Given any such
substitutions 1.21) Mozes gives a prescription for producing a finite
type system which mimics the tilings of the rectangles 1.22).

We are now in a position to state the theorem of Mozes. To reiterate,
what it does is to take a rather general substitution system
and reproduce the global structures of that system with structures
built by local rules. Thus the theorem shows how to reproduce
the complicated structures, which are easily obtainable by substitution
rules, by the type of rules we want, local (jigsaw-like) rules.
\vs.1 \nd
{\bf Theorem 1.10 (Mozes)}.\ \ Suppose we are given a substitution subshift
$X_F$ with unique invariant integral $\I_F$ made as above from two
nonperiodic symbolic substitutions. There is a finite alphabet $\A$ and
finite type subshift $X_\A$ with unique invariant integral $\I_\A$ with
the following property. Ignoring a negligible set in $X_F$ and one
in $X_\A$
there is a bicontinuous one-to-one map $\phi$ between $X_F$ and $X_\A$ which
commutes with translation, i.e.,\ $\phi[T^t(x)]=T^t[\phi(x)]$
for tilings $x$ and translations $T^t$.
\vs.1
(As with the Robinson and Morse tilings, the exceptional negligible sets 
correspond to tilings containing infinite lines.) The
correspondence produced by Mozes -- and we note that the method is
constructive, it is not just an existence theorem -- ensures, for
instance, that the tilings in the two systems have precisely the same
properties of order or disorder, since the map $\phi$ shows that the
abstract features of the two systems, which determine the order
properties, are isomorphic. 

This has been a long chapter, so it would be useful to recapitulate a
few key points. In the first half we showed how a probabilistic
approach to the order properties of a tiling leads, via Theorem 1.2,
to embedding the tiling of interest in a family of tilings,
with a probability distribution on the family. (This discussion will be
greatly expanded in Chapter 3.) The second half of this
chapter was devoted to two kinds of tilings, those made by a
substitution method and those like a jigsaw puzzle, made by local
rules. These two types of tilings were then related by the theorem of
Mozes. The Mozes machinery is quite powerful, and enables us to
produce examples with rather strong properties of disorder. We will
explore this consequence in some depth in Chapter 3, but we first want
to look at our situation from another (physics) angle, which will give
us a stronger intuition from which to understand our structures.
\vfill \eject
\nd
%zzz
{\bf Chapter 2.\ \ Physics (for Mathematicians)}
\vs.1 \nd
{\bf \S 1. Diffraction of light waves}
\vs.1
One of the main threads running through this book is the effort
to understand what kind of global structures can be produced
from local rules, rules such as that of a jigsaw puzzle -- which
determine a global structure merely by requiring that neighboring
tiles fit together correctly.
In this chapter we will develop a different perspective on this
subject. As discussed in the Introduction, physics has been led to
one version of such an analysis in order to understand the 
global structure of solid matter
made from atoms. That endeavor has been colored by the
availability of X-ray diffraction as a tool in exploring such
structures. In performing diffraction one takes the sample 
to be examined and bombards it with waves of some kind; for
X-ray diffraction one uses light waves,
so we will begin with a brief introduction to light waves
and their diffraction.

First some notation. By a ``field'' in physics one means a function on
$\R^3$; a ``scalar field'' has values in $\R$ or $\C$, and a ``vector
field'' has values in $\R^3$ or $\C^3$. A ``time-dependent field'' is
likewise a (scalar or vector-valued) function on $\R^3\times \R$
(space $\times$ time). A ``plane wave'' is a special case of a time
dependent field. A (complex) scalar plane wave is any function of the
form:
$$f(x,t)=Ae^{i(k\cdot x-\omega t+a)}\eqno 2.1)$$

\nd where the constants $A\in\R_{+},\ k\in\R^3,\ \omega\in\R_{+}$ 
and $a\in\R$ are called, respectively, the ``amplitude'', ``wave vector'',
``frequency'' and ``phase'' of the wave. To understand these terms,
and the term plane wave, simply consider the level surfaces of $f$ for
constant time $t$: they are planes perpendicular to $k$, and they move
in the direction of $k$ as $t$ increases. Note that physics usually
uses complex plane waves with the understanding that the physically
relevant quantity is the real part of the function. This goes for
vector fields also.
\vs.1
Light waves, of which X-rays are special cases, are a combination of
two time-dependent vector fields, the electric $E(x,t)$ and magnetic
$B(x,t)$ fields, which satisfy Maxwell's equations [EiI]. Only
$E(x,t)$ contributes to X-ray diffraction, so we will ignore
$B(x,t)$ -- and Maxwell's equations.
\vs.1 
A plane wave of the electric field is a field of the form:
$$ E(x,t)=e_1A_1e^{i(k\cdot x-\omega t+a_1)}+e_2A_2e^{i(k\cdot
x-\omega t+a_2)} \eqno 2.2)$$

\nd where $e_1,\ e_2,\ k\in\R^3$ are pairwise perpendicular (and constant,
i.e., independent of $x$ and $t$), so $e_1$ and $e_2$ are in the plane
perpendicular to $k$ (which makes light waves ``transverse''). Such a
wave is ``elliptically polarized'' because the endpoint of (the real
part of) the vector $E(x,t)$ traces out an ellipse in time at any
fixed $x$ in space. Special cases are ``linear polarization'' when
$a_1=a_2$, and ``circular polarization'' when $A_1=A_2$ and
$|a_1-a_2|=\pi/2$. 

In a typical diffraction experiment we arrange (roughly) to have a
plane wave of given wavelength directed at a location containing some
sample, and to measure the plane wave that scatters off the sample, in
any given direction. 
%See Fig.$\,$xx. 
Before trying to analyze this for
realistic samples, we consider the simplest case wherein the sample
consists of a single electric charge (electron).

So assume a (scalar) plane wave
$$E(r,t)=E_0e^{i[2\pi\nu(t-r_0\cdot r/c)]}\eqno 2.3)$$ 

\nd (where $r_0$ is a unit vector) scatters off a charge at the 
origin and the scattered field at $(r,t)$ is
$$f(r)E_0e^{i[2\pi\nu(t-|r|/c)-\psi]}\eqno 2.4)$$ 

\nd The main feature of this quantity is seen from its level 
surfaces, which are spheres. As time advances the sphere expands,
at the speed $c$ (the speed of light). $\psi$ just governs the
relative phase between the incoming plane wave and the scattered sphere.
For a free electron $\psi =\pi$, and
the scattering factor $f(r)$ can be computed [Gui].
(The derivation of $f$ is the only place it is desirable to
consider the vector nature of the field, and since we are ignoring
this aspect we can work with a scalar field.)

Next assume we have an incoming plane wave as above but now assume it
scatters off two electrons separated by $u$.  At $r$ the difference in
phase between the two scattered waves is $-2\pi s\cdot u$ where
$s=(r/|r|-r_0)/\lambda$ and $\lambda=c/\nu$ is the wavelength of the
scattered waves. Therefore the net field at $r$ scattered 
from the incoming beam by a collection of electrons with
density function $\rho_{_V}$ in a region $V$ has, relative to that of a
free electron at the origin, an amplitude given by
$$E_0\int_{\R^3}\rho_{_V}(u)e^{-2\pi is\cdot u}\,du\eqno 2.5)$$ 

\nd and an
intensity 
$$I_V(s)=(E_0\int_{\R^3}\rho_{_V}(w)e^{2\pi is\cdot w}\,dw)(E_0\int_{\R^3}
\rho_{_V}(v)e^{-2\pi is\cdot v}\,dv)\eqno 2.6)$$

\nd which by change of variables is
$$(E_0)^2\int_{\R^3}[\int_{\R^3}\rho_{_V}(u+u')\rho_{_V}(u')\,du']e^{-2\pi is\cdot u}\,du\eqno 2.7)$$
\vs.1
This intensity $I_V$ is the physically accessible quantity that
diffraction gives us, to help us understand the atomic structure
of bulk matter. We will make use of it through its Fourier
transform, a more convenient quantity which goes by the name of 
the `autocorrelation'' $A_V$:

$$A_V(u)=\int_V\rho_{_V}(u'+u)\rho_{_V}(u')\,du'=\int_{\R^3}\rho_{_V}(u'+u)\rho_{_V}(u')\,du'.\eqno
2.8)$$

\nd One can read off from 2.8 the following features of the
autocorrelation. It samples the distribution of
electrons throughout the region $V$, and the main point is that 
$A_V(u)$ has larger values for
those vectors $u$ which separate sizable populations of electrons. Also, it
is an average quantity, responsive to the total population of
electrons, not the details of each small region or the location of
any particular electron. Since we are
interested in the details of the small-scale structure of our patterns,
this is a limitation. As we shall see next, this limitation of the
physical measurability of the atomic structures of bulk matter also
appears at the theoretical level.
\vs.1 \nd
%zz
{\bf \S 2. Statistical mechanics}
\vs.1
We will review here the standard model for understanding the basic
properties of matter under simple conditions, so called equilibrium
statistical mechanics. Assume we wish to analyze the physical
properties of a piece of homogeneous matter composed of many atoms
(for simplicity we assume they are all of the same element, say iron), at
various fixed temperatures $1/\beta>0$ and chemical potentials $c$ --
physically adjustable parameters (which one needn't ``understand'' for
the following).
To be more specific, imagine we want to show that at some temperature
and chemical potential 
statistical mechanics 
predicts that iron atoms should cluster together into 
a ``crystal'' -- by which we mean a configuration of
atoms (or more properly, atomic nuclei) arranged spatially as in
Fig.$\,$2. Keep this in mind as we now give an of outline statistical
mechanics.

Assume there are $N$ iron atoms contained in an empty cube $V$. We will think
of their positions as $N$ variable points in $V$, or as a point in
$V^N$.
We assume further that we know how to 
assign a ``(potential) energy'' $E^V(x;c)$ to each possible
configuration $x$ of $V^N$. This is usually done by adding together
contributions from each pair of points in the configuration.
(We are ignoring some features of our iron atoms which
are relatively minor and easy to
insert if desired.) Then for fixed $\beta$ and $c$ we consider
$$f^{\beta,c}(x)\equiv {\exp[-\beta E^V(x;c)] \over
\int_{V^N}\exp[-\beta E^V(x;c)]\,d^Nx}\eqno 2.9)$$

\nd as a probability density for $x$. The essence of statistical
mechanics is to treat this probability density as the fundamental
quantity from which one computes
properties of the material. Statistical mechanics does not 
attempt to tell us precisely what
the configuration of the atoms is; it only tells us which, among all
conceivable configurations, are the more ``likely'' ones.  Then, to
compute something about the system (such as the density
autocorrelation of the last section), we 
compute it for each conceivable configuration, and
then average the results using the above probabilistic weights of the
configurations. That is, for any property that is a function $g(x)$ of
the configuration, the theory predicts the value $\int_{V^N}
g(x)f^{\beta,c}(x)\,d^Nx$. For instance, the (potential) energy of the
system would be $\int_{V^N}E^V(x;c) f^{\beta,c}(x)\,d^Nx$.

Returning to the motivation of the beginning of this section, 
imagine we want to show that at some temperature
and chemical potential, and with some energy function $E^V(x;c)$, the
theory predicts the iron atoms form a  ``crystal'',
a configuration of
atoms arranged spatially as in
Fig.$\,$2. How could this come out of such a probabilistic theory?
Well, to be painfully honest no one has actually shown, using realistic
conditions, that such a prediction follows from the theory.  But very
simplified models suggest it would, in the following way. The theory
only gives a probability distribution among all possible
configurations. But it is expected that if one computes for a system
containing an enormous number of atoms (and in a piece of bulk matter
there are indeed roughly $10^{27}$ atoms), then for low enough
temperature (and appropriate chemical potential) the probability density would have
value almost zero for all configurations except the desired ones --
the ones which are the expected crystal (up to a rigid motion).

This is a good point to note the discovery, made in 1984 by Dany Schectman
{\it et al}, of materials called quasicrystals which are solid but not
crystalline. Physicists had
gotten used to thinking that solids {\it had} to be crystalline,
though they were aware that this state of affairs did not seem to
follow from any known physical law [StO, Ra1]. Quasicrystals were discovered
by means of their diffraction patterns (made using wave properties of
electrons instead of X-rays, but this is not relevant). The
diffraction patterns consisted of lots of ``dots'' (called Bragg
peaks), and some of these patterns were symmetric about a central
dot under rotation by $2\pi/10$. 
%(See Fig.$\,$xx.)  
Physicists are
used to finding such patterns symmetric about a central dot under
rotation by $2\pi/6$, or $2\pi/4$, but never by $2\pi/10$. And they
were surprised because they knew that no crystal could produce such a
pattern. That is, no pattern of atoms which is periodic as in
Fig.$\,$2 could produce a diffraction pattern with such a
symmetry [HiC]. This is a fundamental fact for us, with two aspects.

First, this means the atomic configurations of quasicrystals cannot be
periodic as in Fig.$\,$2. And second, there is this connection between the
order 
properties of a pattern (epitomized by the periodicity of
periodic patterns), and the symmetry of something associated with the
pattern -- in this chapter called a diffraction pattern, but given
another name in Chapter 3. We will devote the next two chapters to
exploring these notions.

In closing this chapter we note an important connection with the
previous one. Although everyone's intuitive idea of a crystal is a
more or less periodic arrangement of atoms, we just saw above that in
physics such a structure is modeled using a probability distribution
on a {\it family} of atomic configurations. At very low temperature
that probability distribution is roughly concentrated on the
appropriate periodic configuration (and those obtained by Eucldean
motions), which shows how the model relates to the intuitive
concept. In the chapter on ergodic theory we saw something similar. It is no
accident that ergodic theory also analyzes a structure using a
probability distribution on a family of structures related to the one
of interest -- after all, ergodic theory grew out of the study of
matter!

\vfill \eject
\nd
%zzz
{\bf Chapter 3.\ \ Order}
\vs.1
\nd {\bf \S 1. Spectrum and order}
\vs.1
We will be introducing some powerful tools to analyze the order
properties of structures like tilings, in the process linking up with
our discussion of diffraction in the last chapter. This will involve a
round-about path; we start by embedding the tiling of interest in a
family of tilings. Although it may seem odd to introduce many new
tilings when we just want information about one specific tiling,
this is necessary if we are to use Theorem 1.2 -- which gives information
about the frequencies of parts of a tiling in terms of an {\it
integral over a space of tilings}. 

Assume we want to determine the order properties of a tiling which is
an element in some finite type or substitution subshift $X\subset
\A^{\Z^d}$. For instance, consider the Morse tiling of Fig.$\,$12,
as an element of the substitution subshift $X=X_F$ discussed in the \S 2.3.
As for an order property, we might want to know: given that there is
a tile $A$ at some site $s$ in the Morse tiling, how likely is it there 
is a tile $B$ at
the site $s^\prime$ which is distance $2^{10}$ to the right of $s$? 
Is it more or less likely than if there were tile $B$ at $s$?

It will be useful to think of $X$ as a set on which the additive
group $\Z^d$ is acting as translations: $(T^tx)_j\equiv x_{j-t}$ for
$j\in \Z^d$ and $x\in X$. As in $\S 1.2$, we can lift this action to
functions on $X$, for instance the complex continuous functions
$C(X)$, by: $T^tf(x)=f(T^{-t}x)$ for $f\in C(X)$. Assuming we have an
invariant integral $\I$ on $X$, invariant with respect to these
translations, we now extend the group action to a space a bit
larger than $C(X)$.

First we note that $\I$ almost determines an inner product on $C(X)$ by
$<\!f,g\!>\,\equiv \I(\bar f g)$, where $\bar f$ is the complex
conjugate of $f$; we say ``almost'' because $<\!\cdot,\cdot\!>$ may be 
missing the
property $<\!f,f\!>\,=0 \Rightarrow f=0$. We now go through
a process familiar from group theory, the division of
a group by a normal subgroup. Thinking of the complex vector
space $C(X)$ as a group under addition, the
linear subspace $N\equiv \{f\in
C(X)\,:\,\I(|f|^2)=0\}$ is a normal subgroup. 
$N$ is a linear subspace of $C(X)$, since if
$f,g\in N$, then $\I(|\alpha f+\beta g|)^2=\I(|\alpha f|^2)+\I(|\beta
g|^2)+\I(\bar \alpha \beta \bar fg)+\I(\bar \beta \alpha \bar g f)$, and
since $|\I(\bar g f)|^2\le \I(|g|^2)\I(|f|^2)$ from the Cauchy-Schwarz
inequality (Appendix III), we see that $gf\in N$. 
Since $N$ is a subspace we can divide $C(X)$ by it and get the linear
(quotient) space $C(X)/N$ of equivalence classes -- two functions are
equivalent if their difference is in $N$ -- with now a (true) inner product
inherited from the almost inner product. 

What we have done so far did not use the fact that $\I$ was invariant
under translations. We use this now to show that translations are well
defined on $C(X)/N$, in other words, that if $f\in N$ then $T^tf\in
N$. In fact this is now fairly immediate:
$\I(|T^tf|^2)=\I(T^t[|f|^2])=\I(|f|^2)$. So we can define or lift our
representation $T$ of $\Z^d$ from $C(X)$ to $C(X)/N$ by defining the
translate of an equivalence class to be the 
equivalence class of the translate of
any of its representatives: $T^t\{f\}\equiv \{T^tf\}$. 
Furthermore, the resulting operators are
then ``unitary'' on the inner product space $C(X)/N$ 
in the sense that they are linear (easy) and preserve inner products:

$$<\!T^tf,T^tg\!>\,=\I(\overline{T^tf}T^tg)= \I(T^t[\bar fg])=\I(\bar
fg)=\,<\!f,g\!>\eqno 3.1)$$

\nd for all $f,g$. As a last step we complete this inner
product space $C(X)/N$ with respect to its norm $||f||\equiv \sqrt
{<\!f,f\!>}$, obtaining the Hilbert space we call $\H_\I$ (see Appendix
III). The operators $T^t$ naturally extend to the completion since they
are norm preserving.

It is not hard to go through the above constructions and check that
the operators $T^t$ constitute a group representation for $\Z^d$ on
$\H_\I$, that
is: $T^tT^s=T^{t+s}$. (It is even a ``continuous'' representation in
the sense that $<\!f,T^tg\!>$ is continuous in $t$ for all 
fixed $f,g$,
since $t$ is a discrete variable; this will be less trivial when we
consider translations $t\in \R^d$ in Chapter 4.) 

Our next step is to use a convenient Fourier-type decomposition for
quantities of the form $<\!f,T^tg\!>$. This is a
fundamental result primarily due to Marshall Stone (see Appendices II, III
for notation and concepts).
\vs.1 \nd
{\bf Stone's Theorem 3.1}.\ \ Let $\{T^g\}$ be a continuous unitary
representation of the group $G=\R^d$ or $\Z^d$ on a Hilbert space.
For each Borel subset $B$ of the space $\hat G$ of characters of
$G$ there is a (spectral) projection $E(B)$ such that:
\vs0 $\circ$\ 
$E(\emptyset)=0$ 
\vs0 $\circ$\ 
$E(\hat G)=\I$ (the identity operator)
\vs0 $\circ$\ 
$E(B_1\cap B_2)=E(B_1)E(B_2)$ (and
therefore $E(B_1)E(B_2)=E(B_2)E(B_1)$) 
\vs0 $\circ$\ 
if $\{B_j\}$ are disjoint,
$E(\cup_jB_j)=\sum_jE(B_j)$ 
\vs0 $\circ$\ 
$E(B)=\inf E(O)$, the infimum being over all
open $O$ containing $B$
\vs0 \nd
With this spectral decomposition we can approximate 
the operators $T^g$ in the manner: Given
$\epsilon>0$ and $x\in \hat G$ (the characters of $G$), 
there is a finite collection of
disjoint Borel subsets $B_j$ of $\hat G$, containing points $g_j$,
such that $\|T^g-\sum_jg_jE(B_j)\|<\epsilon$.
\vs.1
(The special case where $G=\Z$ is due to Marshall Stone; various
generalizations (beyond $\R^d$ and $\Z^d$) 
are due to Mark A.\ Naimark, Warren Ambrose and Roger
Godement [RiN, Nai]). We abbreviate the theorem by writing
$$T^g=\int_{\hat G} \hat g(g)\,dE({\hat g}) \eqno 3.2)$$

In our case $G=\Z^2$ so the character group $\hat G$ is the torus
$S^1\times S^1$, where $S^d$ denotes the unit sphere in $d$
dimensions. The integral representation can then be written:

$$T^{(t_1,t_2)}=\int_0^1\int_0^1 e^{2\pi i (\theta_1,\theta_2)\cdot
(t_1,t_2)}\,dE({(\theta_1,\theta_2)}) \eqno 3.3)$$

\nd The reason we call this a ``spectral representation'' can be
seen by taking a vector $f$ lying in the range of some projection
$E(A)$ where $A$ is very small, containing some point
$\theta=(\theta_1,\theta_2)$. Then $f$ must be an approximate
eigenvector for all the operators $T^{(t_1,t_2)}$ since
$T^{(t_1,t_2)}f\approx e^{2\pi i (\theta_1,\theta_2)\cdot (t_1,t_2)}f$,
that is, $||T^{(t_1,t_2)}f - e^{2\pi i (\theta_1,\theta_2)\cdot
(t_1,t_2)}f||\approx 0$. (There may not be any true eigenvector
corresponding to $(\theta_1,\theta_2)$: the approximate eigenvectors
corresponding to smaller and smaller sets $A$ may not have a limit
in the Hilbert space.)

The red-black checkerboard tilings provide a very simple example. 
There are
only two tilings, depending, say, on the color at the origin in
$\Z^2$. So the subshift $X$ consists of two points, $x_1,\ x_2$, the
invariant integral $\I$ is $\I(f)= [f(x_1)+f(x_2)]/2$, and the Hilbert
space $\H_\I$ is just the 2-dimensional space $\C^2$ which we think
of as column vectors. Since $T^{(t_1,t_2)}x_j=x_j$ if and only if
$t_1+t_2$ is even, we see that the spectral resolution 3.3) reduces to
the sum

$$T^{(t_1,t_2)}=e^{2\pi i(0,0)\cdot (t_1,t_2)}E({\{(0,0)\}})+
e^{2\pi i(1/2,1/2)\cdot (t_1,t_2)}E({\{(1/2,1/2)\}})\eqno 3.4)$$

\nd with projections concentrated at the two points $(0,0)$ and 
$(1/2, 1/2)$, namely:

$$E({\{(0,0)\}})=\pmatrix{1/2&1/2\cr 1/2&1/2\cr};\ \ 
E({\{(1/2,1/2)\}})=\pmatrix{1/2&-1/2\cr -1/2&1/2\cr}\eqno 3.5)$$
\vs.1
Comparison with this example shows that for any periodic system, such as that 
associated with
Fig.$\,$4, the spectral representation is a finite sum as in 3.4);
this must hold because the operators are living on a finite
dimensional space. But it is much less easy to determine what can
happen for more interesting tilings. One reason this is worth pursuing
can be seen from the following two theorems.
\vs.1 \nd
{\bf Theorem 3.2} [Wal].\ \ The square-like tilings of a subshift $X$
exhibit intermediate 
disorder 
in the sense of Chapter 1:

$$ \lim_{N\to \infty}(1/N)\sum_{B_N}|\nu(p\cap T^tq)-\nu(p)\nu(q)|=0\eqno
3.6)$$

\nd if and only if $E(A)f=0$ for any singleton $A=\{\gamma\}$ and
vector $f$, other than $A=\{0\}$ and $f$ a constant function, in which
case $E(A)f=f$.
\vs.1
\nd {\bf Theorem 3.3} [Wal].\ \ The square-like tilings of a subshift $X$
exhibit disorder in the sense of Chapter 1:

$$ \lim_{|t|\to \infty}|\nu(p\cap T^tq)-\nu(p)\nu(q)|=0\eqno 3.7)$$

\nd if $dE({\gamma})$ has a ``density'' in the following sense: 
for any vector $f$ such that $<\!f,1\!>\,=0$,
$d\!<\!f,E({\gamma})f\!>\,=\rho_f(\gamma)d\gamma$ for some non-negative 
function $\rho_f$
such that $\int_{\hat G} \rho_f(\gamma)\,d\gamma < \infty$.
\vs.1
Both of these results show that when $dE(\gamma)$ has some form of
smoothness in $\gamma$, the tilings have some form of 
disorder, 
and roughly
speaking, the more smoothness the more disorder. (We had these in
mind in \S 1.1.)
To
complete the picture we note that if there is any ``discrete
spectrum'', that is, if $E({\{\gamma\}})$ is a nonzero projection for
some singleton $\{\gamma\}\ne \{0\}$, then the system is ordered in
the sense that

$$\lim_{|t|\to \infty}|\nu(p\cap T^tq)-\nu(p)\nu(q)|\ne 0\eqno 3.8)$$

\nd for some $p$ and $q$. This is not obvious, but is a standard
result in ergodic theory [Wal].

To summarize, in this chapter we extended the discussion on order
properties of tilings from Chapter 1, linking the notion of order to
that of a spectrum of the tiling. This was connected in two ways with
the physics in Chapter 2. The idea of analyzing a tiling by embedding
it in a family of tilings, with a probability distribution on the
family, turns out to be natural from the point of view of the
statistical mechanical analysis of structures such as crystals. And
second, the spectral analysis of tilings was shown to be related, by
this physics connection, to the X-ray analysis of structures such as
crystals. We will now apply what we have learned about order
properties to symmetry properties.
\vfill \eject
\nd
%zzz
{\bf Chapter 4.\ \ Symmetry}
\vs.1
\nd {\bf \S 1. Substitution and rotational symmetry}
\vs.1
This book was motivated by the rich mathematics associated with the
kite \& dart tilings (Fig.$\,$1), in particular the attempt to
understand the types of global structures obtainable by local rules of
production. By ``types'' of structures we refer specifically to their
order and symmetry properties. So far we have spent most of our time
analyzing square-like tilings. This was not an accident -- it was on
purpose! The reason is that the mathematics of square-like tilings is
simpler than that needed for more general tilings such as the kites
and darts, and some ideas, notably that of order properties, can be
understood more easily in that simpler setting. (There is a close
analog in probability theory where the basic ideas, notably
independence, are best introduced in the context of discrete random
variables, thus avoiding the irrelevant complications of integration.)

In the last chapter we investigated in some depth the order properties
obtainable by local rules, and now that we want to move on to the
study of symmetry properties, in particular rotational symmetries, we
are forced to deal with more general tilings such as the kites and
darts, and the pinwheel (Fig.$\,$13). The first thing we must do is upgrade the
formalism of Chapter 1 -- for instance, the notion of substitution and
finite type tilings.

A system of square-like tilings was considered as a subset of a ``full
shift'', the set $\A^{\Z^d}$ carrying a metric and the natural
(translation) action of $\Z^d$. Now suppose we have some finite
alphabet $\A$ of $d$-dimensional polyhedra (at fixed positions in
${\R^d}$), and recall definition 1.9 of $X_\A$ as the set of {\it all}
tilings of $\R^d$ by congruent copies of letters of $\A$. We will have
to modify the metric we used for the product space $\A^{\Z^d}$ for
spaces of tilings such as $X_\A$, which are no longer product spaces.
The reason is that in the original metric two tilings were close if
and only if they coincided perfectly in some large ball around the
origin. We can't require that now; if we want to have translations
behave continuously it must be the case that two tilings are close if
one is a small translate of the other -- even though they may
not coincide anywhere. And similar considerations apply to
rotations.

So we must make some adjustments, though we will try to
keep as much of the properties of the previous metric 
as possible. Heuristically, what we want is that two tilings be close 
if in a large ball
centered at the origin the two have the same polyhedra, in almost the
same positions. 

What we will use is the
following ``tiling metric'' between tilings $x,\ x'
\in X_\A$:
$$m_t(x,\ x')=\sup_{n\ge 1}{1\over n}d_{H}[B_{n}(\partial x),B_{n}(\partial
x')]\eqno 4.1)$$

\nd where $d_{H}[A,B]$ is the Hausdorff metric between two compact 
subsets $A$, $B$ of ${\R^d}$, defined by 
$$d_{H}[A,B] = \max \{ {\tilde d} (A,B), {\tilde d} (B,A)\}\eqno 4.2)$$ 

\nd where 
$${\tilde d} (A,B) =  \sup_{a \in A}\inf_{b\in B} ||a - b||\eqno 4.3)$$

\nd and ${B}_{N}(\partial x)$ denotes the union of those portions, of
the boundaries of 
tiles in the tiling $x$, which are contained in the closed ball
${\bar B}_N\subset \R^d$ of volume $N$ centered at the origin. 
(Compare this with the metric on subshifts introduced
in $\S 1.2$.) 
It is not hard to show that 
$X_\A$ is compact in this metric [RaW]. We
think of $X_\A$ as the analog of a finite type subshift, and will
sometimes be considering subsets $X\subset X_\A$ produced by a
substitution rule, inheriting the metric.

As our first example we take the kite \& dart tilings made from
the quadrilaterals of Fig.$\,$16. Consider the space $X_{\A_{16}}$ of all
tilings made from these letters. Since the two letters fit together to
form a rhombus (see Fig.$\,$16 and imagine the dart shifted to sit
atop the kite), translates of which can then tile the plane, $X_{\A_{16}}$
contains periodic tilings besides the ones in which we are really
interested. Imitating $\S 3.1$, we define the (substitution) kite \&
dart tilings $X_{k\&d}$ as the subset of $X_{\A_{16}}$ consisting of those
tilings $x$ in which every word is a subword of one of those special
ones made by iterating the substitution function of Fig.$\,$17. As a
subset of $X_{\A_{16}}$, $X_{k\&d}$ inherits a metric and (since a Euclidean
image of a tiling in $X_{k\&d}$ is again in $X_{k\&d}$) a continuous
representation of the Euclidean group $\E^2$.

These tilings have been inspirational; in particular they inspired the
mathematics discussed in this book! (For an introduction to the impact
the tilings have had on a variety of disciplines, we recommend [Sen].) 
One of their pretty features is
the pentagonal regions that one sees throughout the tilings. Not only
are there the five-sided stars made of five kites, and the decagons
made of five darts (see Fig.$\,$1), but because of the substitution
there must be regions of arbitrarily large size with such local
5-fold symmetry. Although there is much discussion in the literature
of this approximate 5-fold symmetry, as noted in the Introduction we
will be examining a certain type of {\it 10-fold} symmetry of these
tilings, which will be seen to originate in the fact that in the
substitution function of Fig.$\,$17 there are (small) kites and darts
rotated with respect to one another by $2\pi/10$.

Before we explore properties of these tilings we consider the finite
type version made from the two letters of Fig.$\,$18.  That is, if
$\A_{18}$ is the alphabet of these two letters, we consider the set
$X_{\A_{18}}$ of {\it all} tilings with these letters. As noted in
$\S 1.4$, there is a natural one-to-one correspondence between
$X_{\A_{18}}$ and $X_{k\&d}$ obtained by ignoring the small bumps and
dents in the letters of $\A_{18}$. In fact this map and its inverse are 
easily seen to
be continuous, and furthermore they each carry the action of $\E^2$ on
one space to its action on the other space, so for all practical
purposes $X_{\A_{18}}$ and $X_{k\&d}$ are interchangeable. 

At this point it is convenient to discuss some material which shows
why substitution is so useful. In particular it supplies the
promised proof of Lemma 1.9.
\vs.1 \nd
{\bf Lemma 4.1.}\ \ Let $X_F$ be the substitution tiling system
associated with the substitution function $F=E_\gamma \circ \tilde
F$. If each tiling $x\in X_F$ is uniquely decomposable into a tiling
$x_F$ of letters of level $n$ for all $n$ 
(note that $x_F$ is not in $X_F$, but only because its tiles are not the 
right size), 
then the map
$T^F\,:\,x\in X_F\rightarrow E_{1/\gamma}(x_F)\in X_F$ is a
representation of the similarity $E_{1/\gamma}\,:\,p\in
\R^d\rightarrow p/\gamma\in
\R^d$; that is, $T^F$ has the correct group relations with
the natural representation of the Euclidean group on
$X_F$. Furthermore, for any $x\in X_F$,\ $T^tx=x$ implies $t=0$.
\vs.1 Before we get to the proof we make a few explanatory comments.
Whenever you have a substitution tiling you can, by Lemma 1.4, think
of it as a tiling by larger size letters, letters of level $k$ for any
$k$. Lemma 4.1 deals with the slightly special case where this
decomposition into higher-level letters is unique. And the conclusion
is two-fold. First, the uniqueness provides a natural map from tilings
(by level 0 tiles) to tilings (by level 0 tiles) -- we take the map
from tilings by level 0 tiles to tilings by level 1 tilings and shrink
the level 1 tiles about the origin so they become level 0 tiles. This
(composite) map is then claimed to be a representation of a similarity, in that
this map has the same group relations with the
Euclidean motions of the tilings in $X_F$ as does the corresponding
similarity of Euclidean space with the Euclidean motions of points in
Euclidean space $\R^d$. And second, it is claimed that this group
property implies that no substitution tiling has any translational
symmetry, as in Lemma 1.9.
\vs.1 \nd Proof.\ The first part of the lemma follows easily
from the form of $T^{F}$, so we will only discuss the last claim.
The proof will be by contradiction. So assume for some tiling $x_0$
that $T^{t_0}x_0=x_0$. Since $T^F$ represents the similarity
$E_{1/\gamma}$, for any translation $t$
$$(T^F)T^t(T^F)^{-1}=T^{t/\gamma}\eqno 4.4)$$

\nd Then for all $n$, $(T^F)^nT^{t}=T^{t/\gamma^n}(T^F)^n$. 
Therefore $(T^F)^nx_0=T^{t_0/\gamma^n}(T^F)^nx_0$, in other words
the tiling $(T^F)^nx_0\in X_F$ is invariant under the translation 
$t_0/\gamma^n$. Since for large $n$ this is smaller than any tile
in the tiling, we must have $t_0=0$.\qed
\vs.1
This lemma shows two things: the abstract fact
that substitution tiling systems carry interesting representations
of similarities, and the consequence that such tilings are
automatically nonperiodic.

We now get back to our analysis of the rotational symmetries of the
kite \& dart tilings. To understand them we begin by observing that
$X_{k\&d}$ is unwieldy -- it decomposes into more readily understood
subsets. In fact it decomposes into a family
$\{X_{k\&d}^\alpha\,:\,\alpha \in [0,\ 2\pi/10)\}$ of closed subsets
related to one another in a simple way: the tilings in any one of these
subsets, say $X_{k\&d}^{\alpha_0}$, are merely the rotations (about any point)
of those of any other one $X_{k\&d}^\alpha$, in fact with rotation by
$\alpha-\alpha_0$. 
So for kites and darts it suffices to understand
any one of these subsets $X_{k\&d}^\alpha$. Now such a set can be
investigated just as we did the substitution subshifts in $\S 1.3$. In
particular it follows from the same simple conditions (Lemma 1.5) that
there is one and only one invariant integral $\I_\alpha$ on
$X_{k\&d}^\alpha$ which is invariant under translations. The new idea
is: what happens to $X_{k\&d}^\alpha$ when we rotate about some fixed
point by $2\pi/10$? ($X_{k\&d}^\alpha$ gets mapped 
onto itself by such a rotation.) 
So consider the integral $T^{R(2\pi/10)}\I_\alpha$
obtained from $\I_\alpha$ by such a rotation:
i.e., $T^{R(2\pi/10)}\I_\alpha(f)\equiv
\I_\alpha(T^{R(-2\pi/10)}f)$, with $R(\theta)$ representing rotation by
$\theta$ about the origin. It is easy to check that
$T^{R(2\pi/10)}\I_\alpha$ is also a translation invariant integral on
$X_{k\&d}^\alpha$.  And since we know that $\I_\alpha$ is the {\it
only} such beast, we must have $T^{R(2\pi/10)}\I_\alpha=\I_\alpha$.  In
other words, the integral $\I_\alpha$ is not only translation invariant
but also invariant under rotation (about any point) by $2\pi/10$. (It
is useful to realize how simply this followed from the uniqueness of
$\I_\alpha$ among translation invariant integrals.)

We now want to re-interpret this symmetry of the integral $\I_\alpha$ 
as a symmetry of individual tilings. We will need to use the following
analog of Theorem 1.2. (It might be useful to review $\S 1.2$, in
particular the connection between invariant integrals and the frequencies
in tilings.)
\vs.1
\nd {\bf Theorem 4.2}.\ \ Suppose there is a continuous representation $T$
of the group $\R^d$ on the compact metric space $X$, and $\I$ is an
invariant integral on $X$. Then the following three conditions are equivalent:
\vs.05 \nd
i)\ $\I$ is the {\it only} invariant integral on $X$;
\vs.05 \nd
ii)\ for every continuous function $f$ on $X$ and $x\in X$,
$$|{1\over N}\int_{B_N}[T^tf(x)-\I(f)]\,dt|\mathop{\longrightarrow}
\limits_{N\to \infty}0 \eqno 4.5)$$ 
\vs.05 \nd
iii)\ for every continuous function $f$ on $X$,
$$\sup_{x\in X}|{1\over N}\int_{B_N}[T^tf(x)-\I(f)]\,dt|\mathop{\longrightarrow}
\limits_{N\to \infty}0 \eqno 4.6)$$ 
\vs.1
\nd {\bf Corollary 4.3} [Pet].\ \ $\I$ is the only invariant integral
on $X$ if and only if for any open subset $S$ of $X$ for which the
indicator functions $\chix_S$ and $\chix_{\bar S}$ of $S$ and its
closure $\bar S$ satisfy $\I(\chix_S)=\I(\chix_{\bar S})$ we have:
$$|{1\over N}\int_{B_N}[T^t\chix_S(x)-\I(\chix_S)]\,dt|\mathop{\longrightarrow}
\limits_{N\to \infty}0 \eqno 4.7)$$
\vs.05 \nd
for every $x\in X$.
\vs.1 
We apply these ideas for a space $X$ of tilings by choosing an
$S\subset X$ of the following sort. Fix some finite word $\P$ in a
tiling of $X$, and metric $m_E$ on the Euclidean group $\E^d$. Then
pick some $\epsilon >0$ and define $S(\P)$ as the set of all tilings
$x$ such that $T^gx$ has the word $\P$ in the same place for {\it some
Euclidean motion} $g$ which is $\epsilon$-close to the identity $e$ of
$\E^d$, that is, $m_E(g,e)<\epsilon$.  It follows from the continuity
of the representation of $\E^d$ that $S(\P)$ is an open subset of $X$,
and one can in fact check that $S=S(\P)$ satisfies the conditions of
the corollary.

Note that for $X=X_{k\&d}^\alpha$ the only Euclidean motions near the
identity which map $X$ into itself are pure translations. So we can
now reproduce the argument of Chapter 1 to interpret the value of
$\I(\chix_{S(\P)})$ as the {\it frequency} with which the pattern $\P$
appears (in its original orientation) in {\it any} tiling in $X$. As
in the simpler case of subshifts, knowing $\I(\chix_{S(\P)})$ for all
$S(\P)$ allows one to reproduce $\I$. Putting this together with our
new result that $\I$ is invariant under rotation by $2\pi/10$, we
reinterpret this as saying that for every tiling $x$ the frequency of
any finite word $\P$ is the same as it is in the rotated tiling
$T^{R(2\pi/10)}x$.

As noted in the Introduction, this is a fundamentally new idea: that a
pattern could have a Euclidean symmetry, namely a rotational symmetry,
in a sense slightly weaker than the usual one whereby the whole pattern 
itself is
unchanged under the motion; in this weaker form only the frequencies
of parts of the pattern are unchanged under the motion, not the global
pattern itself. We will see the value of this new
form of symmetry throughout the remainder of the book. 

In our next example we will see this statistical form of
symmetry displayed in a way manifestly impossible for the
traditional form -- rotational symmetry of a
polygonal tiling by {\it all} angles! 
(In fact it was this example which clarified ((Ra4]) the important
distinction between the approximate 5-fold rotational symmetry and
statistical 10-fold symmetry of the kite \& dart tilings).
Consider again the pinwheel tiling of
Fig.$\,$13. The substitution version of the pinwheel is made from a
$1,\, 2\, ,\sqrt{5}$ right triangle by the substitution function of
Fig.$\,$30. (There is also a finite type version of the pinwheel [Ra2].) 
We want to focus first on the rotational
symmetries of these tilings, and this requires overcoming a technical
problem.

For the kite \& dart tilings $X_{k\&d}$ we used the simplification
that $X_{k\&d}$ decomposes into the subsets
$X_{k\&d}^\alpha$. Technically this was advantageous since the sets
$S(\P)$ could be thought of as tilings containing small {\it
translations} of the word $\P$, not small rotations. For the pinwheel
we have to work in the more general setting. The analysis of the
pinwheel tiling has some similarity to the proof of Lemma 1.5, which
dealt with square-like tilings. It is useful to repeat the analysis in
this setting to see how rotations enter the mathematics, a major
concern in this book.
\vs.1 \nd
{\bf Theorem 4.4.}\ \ On the space
$X_{pin}$ of pinwheel tilings there is one and only one invariant
integral. 
\vs0 \nd 
Proof.\ (It may be useful to review Appendices II and III.) 
>From the above, this follows if and only if each finite word
$\P$ appears in each tiling $x$ with the same frequency {\it in each
fixed range of orientations}. (Unlike the situation for the kites and
darts, here we cannot usefully attribute a frequency to a word at
fixed orientation -- we must attach it to a range of orientations. We
will refer to a ``frequency density'' of words, to emphasize the
dependence of the frequency on orientation.) We will show this in two
parts: we will first prove that, neglecting their orientations, each
word appears with the same frequency in each tiling -- this is very
similar to what we did in Chapter 1 -- and then we will show the
independence of orientation.

We will take for our alphabet $\A$ a $1,\, 2\, , \sqrt{5}$ right
triangle and its reflection, so the only Euclidean motions we need are
translation and rotation. In Chapter 1 we used a matrix method to keep
track of how many times a given letter appears in a letter of level
$p$, that is, after the substitution is iterated $p$ times. We now
need to keep track of the absolute orientations of a letter, not just
how many times it appears. To do this we will incorporate in our
machinery the irreducible unitary representations of the rotation
group $S(O,d)$. (Even though we are ostensibly discussing the pinwheel
tilings, we will sometimes use general notation to emphasize how
the method generalizes.) In the case of the pinwheel $d=2$, $S(O,d)$
is just the Abelian group $[0,2\pi)$ under addition modulo $2\pi$, and
its irreducible representations are the characters $f_m:\alpha\in
[0,2\pi) \rightarrow e^{im\alpha}\in \C,\ m\in \Z$ (Appendix II). 
To include these
representations we modify the previous matrices. Instead of
one matrix we now have a {\it family} of $K\times K$ matrices, where
$K$ is the size of the alphabet ($K=2$ for the pinwheel), labeled by
the irreducible representations of $S(O,d)$ (labeled by $m\in \Z$ for
the pinwheel); the $j,k$ entry $M(m)_{j,k}$ is:

$$M(m)_{jk}=\sum_\ell f_m[A_{jk}(\ell)]\eqno 4.8)$$

\nd where $A_{jk}(\ell)\in S(O,d)$ is the relative orientation 
(with respect to the standard letter) of the $\ell^{\rm th}$ copy of
the type $j$ letter in the substitution expansion of the type $k$
letter. For the pinwheel, using $s\equiv\arctan(1/2)$,
$M(m)$ is:

$$\pmatrix{e^{-ims}+e^{-im(s+\pi)}&
2e^{-im(s+\pi)}+e^{-im(s+3\pi/2)}\cr
2e^{im(s+\pi)}+e^{im(s+3\pi/2)}&
e^{ims}+e^{im(s+\pi)}\cr}\eqno 4.9)$$

In light of the above corollary we want to prove that every word has
the same frequency density in all tilings and at all orientations. It
is convenient to prove first using arbitrary orientations that the
frequencies of words are independent of the tiling. As for subshifts, 
one can show that it suffices to consider a word
consisting of a single letter, and regions which are letters of
increasing level: $F^r_p(a)$ for arbitrary $a$ and $r$. If $a$ is type
$k$, the number of type $j$ letters in $F^r_p(a)$ is $[M(0)^r]_{jk}$
where
$$M(0)=\pmatrix{2&3\cr 3&2\cr}\eqno 4.10)$$

Just as in $\S 1.3$ we can apply the Perron-Frobenius theorem to
$M(0)$ to show that the words appear with the same frequency in every
tiling, neglecting orientation. The new problem is to refine the
argument to handle the case where we only consider a word in some
fixed range of orientations; we want to show that given two equal
length open intervals of orientations (say $(0,\pi/20)$ and
$(\pi/15,7\pi/60)$) the frequency of any word with orientation in one
interval is the same as its frequency with orientation in the other
interval, for any pinwheel tiling. We compute frequencies by counting
in larger and larger regions of a tiling and dividing by the area. 
And as in the above argument
using the Perron-Frobenius theorem, we will restrict attention to
regions which are occupied by a letter of some (increasingly large)
level. So in fact given an initial letter, we have a sequence of
finite sequences -- the list of orientations of some letter type in
ever higher-level letters. What we need to prove therefore is what is
usually called the ``uniform distribution'' of the orientations --
that as you add more orientations to your list the frequencies
$\nu_{B}$ and $\nu_{B'}$, of hits in any two open intervals $B$ and $B'$ of
equal size, have the same limit.

There is a well known ``Weyl criterion'' for proving uniform
distribution:
\vs.1
\nd {\bf Theorem 4.5 (Weyl)} [KuN].\ \ 
 $\{x_j\}\in SO(d)$ is uniformly distributed
if and only if for every continuous 
nontrivial irreducible representation $f$ of
$SO(d)$,

$$\lim_{N\to\infty}(1/N)\sum_{j=1}^Nf(x_j)=0 \eqno 4.11)$$
\vs.1
This criterion is best known in the special case $d=2$ (which we
need for the pinwheel), where
it says that a sequence $\{x_j\}$ on the unit circle is uniformly distributed
if and only if for $m\ne 0$:

$${\sum_{k=1}^K e^{imx_k}\over K}\mathop{\longrightarrow}
\limits_{K\to \infty}0\eqno 4.12)$$

\nd But in a sense the more general result is more revealing as it
says that to understand whether or not a sequence on $SO(d)$ is
uniformly distributed one can linearize the problem -- analyze it in
certain representations of the group $SO(d)$, effectively
reducing the question to the behavior of certain matrices instead of
points in the complicated space $SO(d)$.

\vs.1 \nd Getting back to our proof, and 
noting how the orientations appear in $F^k_p(a)$, in order to 
prove that the orientations are uniformly distributed we need to show
$${[M(m)^p]_{jk}\over [M(0)^p]_{jk}}\mathop{\longrightarrow}\limits_p
0,\ \ {\rm for\ all}\ m\ne0 \eqno 4.13)$$

To complete the proof of Theorem 4.4 we first note that for all $j,k$
and $m$, $|M(m)_{jk}|\le |M(0)_{jk}|$.  Assume that for some $j,k$,
and some $p$, $|M(m)^p_{jk}|< |M(0)^p_{jk}|$ and that $M(0)$ is
primitive (i.e.,\ all coordinates are nonnegative and some power
has all coordinates strictly positive), both of which are true for the
pinwheel. We will show by contradiction that the spectral radius
$\gamma(m)$ of $M(m)$ is less than that of $M(0)$, $\lambda$, for all
$m$.  Then $\gamma(m)^p$ is the spectral radius of $M(m)^p$ [BaN],
with corresponding eigenvector $\psi(m)$. Using the subscript $+$ to
replace the components of column vectors and matrices with their
absolute values, we have
$$|\gamma(m)^p|\psi_+(m)\le [M(m)^p]_+\psi_+(m)\le [M(0)^p]\psi_+(m)\le
\lambda^p \psi_+(m)\eqno 4.14)$$

\nd 
Therefore $|\gamma(m)|\le \lambda$. And if $|\gamma(m)| =\lambda$, then
$\psi_+(m)$ must be the Perron-Frobenius eigenvector of $M(0)^p$ and
$M(0)^p\psi_+(m)=[M(m)^p]_+\psi_+(m)$, so $[M(m)^p]_+=M(0)^p$. This
contradiction shows $\gamma(m)< \lambda$, and this proves our claim about
the spectral radii of $M(m)$ and $M(0)$.  From this, we note that
$|M(m)^r_{jk}|\le ||M(m)^r||$ for all $j,k$, and
$||M(m)^r||^{1/r}\longrightarrow \gamma(m)$. So
$${|[M(m)^r]_{jk}|\over [M(0)^r]_{jk}}\le {||M(m)^r||\over 
[M(0)^r]_{jk}}\equiv a_r\eqno 4.15)$$

\nd We know $a_r^{1/r}\longrightarrow \gamma(m)/\lambda < 1$,
so $a_r\longrightarrow 0$, which completes our proof that
there is only one invariant integral on the pinwheels.\qed

In the next section we will make a connection between the statistical
rotational symmetry of tilings such as the kites and darts, or
pinwheels, and the atomic structure of quasicrystals.
\vs.1
%zz
\nd {\bf \S 2. Spectrum and X-rays}
\vs.1
Statistical rotational symmetry is concerned with the symmetry of an
integral on a space of structures such as tilings. We want to connect
that notion with a model of the X-ray diffraction of some
configurations of scatterers, as in Chapter 2. We will do this by
first transferring some of what we have developed in Chapters 3 and 4
for tilings to configurations of scatterers.

When we analyzed diffraction in Chapter 2 we considered the
realistic situation of diffracting off a finite collection of
scatterers. In order to get clean results we will need to consider
limits of those results as the number of scatterers goes to
infinity. Specifically, we will imagine we have an infinite
configuration of scatterers, and will compute what the diffraction
would be off a sequence of larger and larger subsets -- say, the
scatterers in the sequence of balls $B_N$ of volume $N$ centered at
the origin.

We need some formalism. Fix any two constants $0<a<b$ and let $\X^d$
be the collection of all infinite sets $x$ of points in $\R^d$
satisfying the following two conditions: no ball of radius $a$ in
$\R^d$ contains more than 1 point of $x$; every ball of radius $b$ in
$\R^d$ contains at least 1 point of $x$. On $\X^d$ we put a
``configuration metric'' $m_c$ just as we did for tiling systems: the
distance between two configurations is given by

$$m_c(x,\ x')= \sup_{n}{1\over n}d_{H}[B_N\cap x, B_N\cap x']\eqno
4.16)$$

\nd where we use the Hausdorff metric $d_{H}$ as we did in 4.1).
As with tiling spaces, we can show that $\X^d$ is compact and
that the natural representation of Euclidean motions on $\X^d$ (for which
we will use the same notation as for tilings) is continuous. For
diffraction purposes let's assume we have some one configuration
$\tilde x\in \X^d$ of interest and define $\tilde X\subset \X^d$ as the
closure of the orbit $\{T^t\tilde x\,:\,t\in \R^d\}$ of $\tilde x$
under translations. We will assume that there is only one invariant
integral $\I$ on $\tilde X$ (see [Ra1] for physical justification of
this assumption). We showed in 2.8) that the scattering intensity of a
density $\rho_{_V}$ of scatterers in volume $V$ is the Fourier transform
of the autocorrelation of the density.  Given a configuration $\tilde
x$ as above, we now construct densities $\rho_{_V}$.

For $x\in \tilde X$ let $\omega(x)$ be any point in $x$ closest to the
origin. Fix any $0<
\epsilon < a/2$ and some nonnegative real continuous 
function $f$ on $\R^d$ such that $f(0)>0$ and $f(s)=0$ for $|s| >
\epsilon$. ($f$ will be later be interpreted as 
the density of an individual scatterer, and at some point we will
assume it is invariant under rotation about the origin.)
Define the real function $\tilde f$ on $\tilde X$ by
$$\tilde f(x)=f[-\omega(x)]\eqno 4.17)$$

\nd (Note that $\tilde f$ is well-defined and continuous.) 
Consider the function $G(x)\equiv [T^u\tilde f(x)]\tilde f(x)$ on $\tilde
X$. By Theorem 4.2,
$${1\over |V|}\int_V[T^{u+u'}\tilde f(x)]T^{u'}\tilde f(x)\, du'
\mathop{\longrightarrow}\limits_{|V|\to\infty}\I([T^u\tilde f]
\tilde f)\eqno 4.18)$$

\nd for every $x\in \tilde X$.
Now we generate an electron density in $V$ corresponding to 
$x$ given by:
$$\rho_{_V}(u)=T^u\tilde f(x)=f[-\omega(T^{-u}x)]\eqno 4.19)$$

\nd The left hand side of 4.18) is just the autocorrelation per unit volume
${A_V(u)/|V|}$ (see 2.8)), and the right hand side of 4.18), thought
of as the inner product $<\!T^u\tilde f, \tilde f\!>$, has spectral
resolution:
$$\I([T^u\tilde f]\tilde f)
=\int_{\R^3}e^{2\pi iu'\cdot u}\,d\!<\!\tilde f,E({u'})\tilde f\!>
\eqno 4.20)$$

\nd So from 2.6) -- 2.8) we see that (in some sense):
$${I_V(s)\,ds\over |V|}\mathop{\longrightarrow}\limits_{|V|\to\infty}
d\!<\!\tilde f,E(s)\tilde f\!>\eqno 4.21)$$

\nd a formula due to Steven Dworkin.

Formula 4.21) gives us a connection between the scattering intensity
per unit volume off a configuration $\tilde x$ and the spectral
projections $\{E(s)\}$ of the translations on $\tilde X$ coming
from Stone's Theorem 3.1. So the (symmetry) properties of the
scattering intensity can be related to the properties of the $\{E(s)\}$,
which we examine next.

First let's reconsider the red-black checkerboard tilings discussed in
Chapter 3. In that chapter we considered the tilings as a subshift,
so the only translations available were $\Z^2$. This time we will
allow translations from $\R^2$, as well as rotations. So the space of
tilings becomes a torus $\T\equiv\{\T^\alpha\,:\,0\le \alpha <\pi/2\}$ whose
elements are themselves tori $\T^\alpha\equiv
\{\theta^\alpha=(\theta^\alpha_1,\theta^\alpha_2)\,
:\,0\le \theta^\alpha_j < 2\}$, one for each orientation $\alpha$,
$0\le \alpha <\pi/2$. We take as our translation invariant integral
$\I$ the usual normalized area on one of these tori, say, $\T'$. As
before, translations are represented unitarily on the Hilbert space
$\H_\I$ and we use the notation $T^t$ for these translation
operators. Note that 
$$(T^t\theta')_k={\theta'}_k +t_k\, ({\rm mod}\ 2)\eqno 4.22)$$
 
\nd If we define, for all $j\in (\Z/2)^2$,
$$\psi_j(\theta')\equiv \exp(2\pi i\,j\cdot\theta')\eqno 4.23)$$

\nd then $\psi_j\in\H_\I$, $||\psi_j||^2=1$, and $T^t\psi_j(\theta')=
\exp[-2\pi i\,j\cdot t]\psi_j(\theta')$. So the $\psi_j$ are
normalized eigenvectors of the $T^t$. In fact they form a (well known)
orthonormal basis of $\H_\I$. Therefore for any $\psi\in \H$,
$\psi=\sum_{j\in(\Z/2)^2}a_j\psi_j$, where $a_j=<\!\psi_j,\psi\!>$.
So 
$$\eqalign{T^t\psi&=\sum_{j\in(\Z/2)^2}a_j\exp(-2\pi i\,j\cdot t)\,
\psi_j\cr
                  &=[\sum_{j\in(\Z/2)^2}\exp(-2\pi i\,j\cdot
t)P_j]\psi\cr}
\eqno 4.24)$$

\nd where $P_j$ is the 1-dimensional projection 
$P_j\psi =\ <\!\psi_j,\psi\!>\!\psi_j$. So 4.24) is Stone's formula
3.2), with $dE(\gamma)$ concentrated on $(\Z/2)^2$.  

We need to understand how the rotational symmetries of this spectral
decomposition come about. We noted in 4.22) how the translations
operate on each piece $\T^\alpha$ of our space $\T$ of tilings.
Rotations are more complicated: rotation (about any fixed axis) by an
angle $\xi$ maps $\T^\alpha$ onto $\T^\beta$ where $\beta = \alpha +
\xi\ \ ({\rm mod}\, \pi/2)$. In particular, only rotation by a multiple of
$\pi/2$ maps a $\T^\alpha$ into itself. Consider such a rotation
$R$. Every tiling in $\T^\alpha$ has points about which the tiling is
unchanged by rotation by $\pi/2$ -- different points for different
tilings. Recall the interpretation of the integral $\I$ as a list of
the frequencies with which patterns appear, at given orientation, in
the tilings in $\T^\alpha$. Because of this 
rotational symmetry of the tilings,
any pattern would appear in a tiling with the {\it same} frequency in one
orientation as it would in the orientation rotated by $\pi/2$, and this
implies that $\I$ is invariant under rotation (about any point)
by $\pi/2$. Then the same argument that we used for translations
applies to show that such a rotation is unitarily implemented in the
Hilbert space $\H_\I$, say by the operator $R$. And finally, we see
that the spectral projection $E[R(A)]$ associated to the rotated set
$R(A)$ is related to the projection $E(A)$ for the unrotated set by
$$E[R(A)]=RE(A)R^{-1}\eqno 4.25)$$

Now consider some family $X_{k\&d}^\alpha$ of kite \& dart tilings.
This time, although none of the tilings is invariant under rotation
by $2\pi/10$, as we showed earlier in this chapter, it's still true
that the translation invariant integral $\I_\alpha$ is invariant under
such a rotation. So again we have that the spectral projections
satisfy the analog of 4.25), with $R$ now denoting rotation (about any
fixed point) by $2\pi/10$.

The difference in the two situations is important, so we will review
the arguments. For the checkerboard tilings we used the fact that each
tiling had some point about which it was invariant under rotation by
$\pi/2$ (the point varying with the tiling). From this it followed
that the translation invariant integral was invariant under such a
rotation about any point, and this implied that such a rotation was
unitarily implemented in the appropriate Hilbert space, and then that the
spectral projections for translations satisfied 4.25). For the kite
\& dart tilings the argument starts differently -- now the invariance
of the integral under rotation (by $2\pi/10$) is obtained by the
substitution rule, not by the invariance of the tilings -- but the
rest of the argument leading to 4.25) is the same as for checkerboard
tilings.

The difference in argument was significant historically
[StO, Sen]. Physicists have had a lot of experience analyzing solids, and
had gotten used to the situation that solids all seemed to be
crystalline (at the microscopic level), that is, had an atomic
configuration roughly of the form of Fig.$\,$2. Part of the reasoning
was that diffraction off solids always gave results consistent with
such an atomic configuration. Then when diffraction patterns with
10-fold rotational symmetries were discovered in 1984, it was quite
surprising. After all -- they knew from the classification of the
crystallographic groups [HiC] that no crystal could produce a
diffraction pattern with such a symmetry. On the other hand they
couldn't understand how {\it any} configuration could produce a
diffraction pattern with such a symmetry. The resolution seems to be
that the diffraction symmetry, which is just a spectral symmetry according
to the analysis of Dworkin 4.21), is associated with a {\it statistical
rotational symmetry} of the configuration rather than the more common
situation in which the configuration itself is rotation invariant;
this leads to a rotational symmetry of the diffraction from the
invariance under rotation (about the origin) if, as is natural, the
density $\tilde f$ in 4.21) is rotation symmetric about the origin --
i.e., $R \tilde f= \tilde f$.
\vs.1
%zz
\nd {\bf \S 3. 3-dimensional models}
\vs.1
For the pinwheel tilings we showed in \S 4.1 how an irrational
rotation in the substitution (by $2\arctan (1/2)$) leads to the
invariance under {\it all} rotations of any translation invariant
integral on the system. This turned out to be quite significant, as it
was the mechanism which led ([Ra4]) to the new phenomenon of the
statistical rotational symmetry of hierarchical tilings such as the
kite \& dart, and pinwheel.

To get a comparable effect in a 3-dimensional tiling we could look for
a substitution which uses irrational rotations about different
axes. Instead we will construct examples which achieve the desired
goal (full rotational symmetry of the translation invariant integrals)
by a different means -- the {\it noncommutativity} of rotations in
three dimensions. This will require our first use of nontrivial parts
of algebra, namely some commutative ring theory. The justification for
this is not just to play with another part of mathematics, as
enjoyable as that is, but that this path gives insight into an
essentially new feature of tiling in three dimensions, the noncommutativity
of the rotations. 
Much more
important, it actually leads ([CoR, RS1, RS2]) to new, significant
mathematics, the classification of certain natural subgroups of the
rotation group in three dimensions -- what we call the generalized
dihedral groups. This is our best example of how the interdisciplinary
exploration of tilings has led to unexpected results of real interest in
seemingly unrelated parts of mathematics.

Our first example of a 3-dimensional tiling, 
made in collaboration with John Conway [CoR], is
called ``quaquaversal''. The alphabet consists of a single triangular
prism, with triangular legs of lengths 1 and $\sqrt 3$, and depth
1. The substitution function $F=E_\gamma \circ
\tilde F$ first decomposes the prism into eight small prisms as shown
in Figs.$\,$31a,b,c, and then expands by a linear stretch by
the factor $\gamma =2$. Part of a quaquaversal tiling is shown in Fig.$\,$32. 

In \S 4.1 we used Weyl's criterion (Theorem 4.5) to show the 
uniform distribution of orientations in the pinwheel. Generalizing
the argument to three dimensional tilings, such as the quaquaversal, is
not hard; we just have to allow for the fact that beyond two dimensions
the irreducible representations of the rotation group need no longer be one
dimensional.
\vs.1 \nd
{\bf Theorem 4.6}.\ \ The orientations of the tiles in a quaquaversal
tiling are uniformly distributed in $SO(3)$.
\vs0 \nd
Proof.\ We must show that $(1/N)\sum_{n=1}^N f_{ij}(g_n)\rightarrow 0$
for every matrix element $f_{ij}$ of every continuous irreducible
unitary representation $f$ of $SO(3)$ other than the trivial one.
Using the methods of [Ra3] we can restrict attention to $N=8^k$,
corresponding to $k$ iterates of the substitution. In such a structure
the orientations of the tile are the summands in the element
$[g'_1+\cdots +g'_8]^k$ of the group algebra of $SO(3)$ (see Appendix
II), where $g'_1,\cdots,g'_8$ are the eight orientations of the small
tiles with respect to that of their decomposed parent. (Specifically,
with respect to the $x,y,z$ axes of Figs.$\,$31b,c and using the notation $e$
for the identity and $R_x^\theta$ for rotation by angle $\theta$ about
the $x$ axis, the eight orientations of tiles $1A,\cdots,4A$ and
$1B,\cdots,4B$ are, respectively:
$e,R_y^{2\pi/4}R_z^{2\pi/2},R_y^{6\pi/4},e$, and
$e,R_z^{2\pi/2},R_x^{2\pi/3}R_y^{2\pi/2},R_x^{2\pi/3}.$)

Now

$$ |([f(g'_1)+\cdots +f(g'_8)]^k)_{ij}| \le ||[f(g'_1)+\cdots
+f(g'_8)]^k||\eqno 4.27)$$

\nd So 

$$     ([f(g'_1)+...+f(g'_8)]^k)_{ij}/8^k  \longrightarrow 0\eqno 4.28)$$

\nd as $k\to \infty$ if

$$||[f(g'_1)+\cdots +f(g'_8)]^k||/8^k = (||[f(g'_1)+\cdots
+f(g'_8)]^k||^{1/k}/8)^k \longrightarrow 0\ \ \  \eqno 4.29)$$

\nd But $||[f(g'_1)+\cdots +f(g'_8)]^k||^{1/k}$ has as its
limit the spectral radius of $f(g'_1)+\cdots +f(g'_8)$ (see Appendix III), 
so the
limit in 4.28) can only be nonzero if that spectral radius is 8; it
certainly cannot be larger than 8 since the norm cannot be larger than
8. We prove it is not 8 by contradiction as follows. Assuming the
spectral radius is 8, there is a (unit length) eigenvector $\phi$ of
$f(g'_1)+\cdots +f(g'_8)$ with eigenvalue of absolute value 8, and
since each $f(g'_j)\phi$ is of unit length, they must be the same vector
for all $j=1,\cdots,8$, namely the same multiple of $\phi$. But then $\phi$
defines a 1-dimensional space invariant under all the $f(g_j)$, and
thus invariant for the representation of the group generated by the
$g_j$. But since the representation is continuous, the space is also
invariant for the representation of the closure of that group, which
is all of $SO(3)$ (the closed subgroups of $SO(3)$ are known). But
this would be a contradiction with the irreducibility of the
representation $f$, unless it were the trivial representation. So the
spectral radius of $f(g'_1)+\cdots +f(g'_8)$ cannot be 8, and the
limit in 4.29) is 0, except for the trivial representation, proving that
$\{g_n\}$ is uniformly distributed. \qed
\vs.1
Basically, we achieved uniform distribution by using, in the
substitution, rotation by $2\pi/3$ about the $x$ axis ($R_x^{2\pi/3}$)
and rotation by $2\pi/4$ about the $y$ axis
($R_y^{2\pi/4}$). Repetition of the substitution gives rise to rotation by
$R_y^{2\pi/4}R_x^{2\pi/3}R_y^{-2\pi/4}$, which is just $R_z^{2\pi/3}$
-- that is, we have available to us rotation by $2\pi/3$ about both the $x$
and $z$ axes. (We will see the algebraic consequences of this in
Theorem 4.7.) In the next example, the ``dite \& kart'' tilings (made
with Lorenzo Sadun [RS1]), we achieve a similar effect with $2\pi/3$
replaced by $2\pi/5$. We give this new example to motivate the
analysis of certain subgroups of $SO(3)$ which we call generalized
dihedral groups, to show what is of {\it general} importance
about the previous example.

The alphabet of the dite \& kart tilings consists of 8 prisms.
Consider the two right triangles of Fig.$\,$33 denoted
$\delta$ and $\kappa$.  $\delta$ has legs of lengths 1 and $\tau\sqrt
{2+\tau}$ and $\kappa$ has legs of lengths $\tau$ and $\sqrt
{2+\tau}/\tau$, where $\tau=(1+\sqrt 5)/2$, the golden mean. (The
triangles $\delta$ and $\kappa$ are halves of the triangles $S_A$ and
$S_B$ introduced by Raphael Robinson in his version of the kite \&
dart tilings [GrS].) It is elementary to check that the small angle in
$\delta$ is $\pi/10$ and the small angle in $\kappa$ is $\pi/5$. We
next introduce triangles $\tilde \delta$ and $\tilde \kappa$ which are
larger than $\delta$ and $\kappa$ by a linear factor $\tau$.

Fig.$\,$33 then shows how these 4 triangles can be decomposed into
congruent copies of triangles which are each a linear factor $\tau^2$
smaller than $\delta,\ \kappa,\ \tilde \delta$ and $\tilde \kappa$.

We thicken $\delta$ by two different depths to make two types of prisms, 
a ``short thin dite'' of depth 1 and a ``short thick dite'' of depth
$\tau$. Likewise from $\tilde \delta$ we make a ``{\it tall} thin
dite'' of depth 1 and a ``{\it tall} thick dite'' of depth
$\tau$. Finally, replacing $\delta$ by $\kappa$ we make the analogous
4 types of ``karts''.

We have a similar procedure for the prisms, again shrinking by a
linear factor of $\tau^2$. We begin with the karts.

The short thin kart is decomposed into a pair of layers. The ``top''
layer consists of short thin dites and karts which, when viewed from above,
have the same pattern as the decomposed 2-dimensional $\kappa$ (Fig.$\,$33). The
bottom layer consists of short thick
dites and karts in the same pattern. Since $\tau^2=1+\tau$, 
the sum of the thicknesses of the two layers equals the thickness of
the original thin kart.

The rule for the short {\it thick} kart is similar, only we now use 3
layers of short dites and karts; a top thin layer and 2
thick lower layers. Since $\tau=(1+2\tau)/\tau^2$, the total thickness 
of the decomposed layers equals the thickness of the original thick kart.

The rules for the {\it tall} thin and thick karts are now immediate,
replacing the short dites and karts in the decomposition of $\tilde
\kappa$ by tall dites and karts.

The rule for decomposed dites uses the decomposition of $\delta$ and $\tilde
\delta$ rather than that of $\kappa$ and $\tilde \kappa$, with one added
twist, based on the rectangles appearing in the decomposition of $\delta$
and $\tilde \delta$ (Fig.$\,$33).  As with karts, the thin dites decompose
into 2 layers and the thick ones into 3 layers.  The decomposition of each
dite generates 2 or 3 parallelepipeds corresponding to the
aforementioned rectangle. If the original dite is short, then the
parallelepiped in the thin layer has 2 square faces, while if the
original dite is tall, the parallelepipeds in the thick layers have 2
square faces.  We then rotate the parallelepiped by $\pi/2$ about the
axis joining the centers of the square faces, as in Fig.$\,$34.  This
completes the decomposition rules.

Finally, the dite \& kart tilings are obtained by combining the above
decomposition rules with an expansion about the origin by a linear
factor of 2. The proof of the uniform distribution of the orientations
of tiles in dite \& kart tilings requires combining the use of Weyl's
criterion, as we did for quaquaversal tilings, with the Perron-Frobenius
theorem as we did for the pinwheel tilings.

We note that, as with the quaquaversal tilings, the uniform
distribution is obtained by taking some rotation of finite order (now
order 5, previously order 3) 
about the $x$ axis and using a rotation by $\pi/2$ about an
orthogonal axis ($y$) to produce rotation of order 5 about a third
axis ($z$). As with the quaquaversal tilings, the angles of rotation
that we use are ``harmless'' by themselves -- not irrational as in the
pinwheel -- the uniform distribution now being caused by the {\it
noncommutativity} of $R_x^{2\pi/3}$ and $R_z^{2\pi/3}$ (respectively
$R_x^{2\pi/5}$ and $R_z^{2\pi/5}$). (More details about the quaquaversal
and dite \& kart tilings can be found in the original papers [CoR, RS1].)

We now want to squeeze some essential features from these 
3-dimensional examples. We said earlier that what is new in three
dimensions comes from using noncommutativity in place of irrationality.
To understand just how, in these examples,
the noncommutativity of the rotations replaces
the irrationality of the pinwheel, it is natural to inquire into the
{\it algebra} of such rotations. Specifically,
we define $G(p,\ell ,q)$ as the subgroup of $SO(3)$ generated by
$R_x^{2\pi/p},\ R_y^{2\pi/\ell}$ and $R_z^{2\pi/q}$, and abbreviate
$G(p,1 ,q)$ as $G(p,q)$. Note that $G(p,2)$ is just the dihedral group
of order $2p$, the group of symmetries of a regular $p$-gon in the
plane. (In order to refer only to the plane the dihedral groups are
usually thought of as generated by rotation in the plane by $2\pi/p$
and reflection in the plane about a line containing the center of
rotation. From our point of view it is convenient to reinterpret these
as the restriction to the plane of the action of 3-dimensional
rotation by, respectively, $2\pi/p$ about an axis perpendicular to the
plane, and rotation by $\pi$ about a line in the plane intersecting
the first line.) The quaquaversal and dite \& kart tilings use
$G(3,3)$ and $G(5,5)$, which leads to the natural desire to
understand these groups $G(p,q)$ more generally.
Basically, we will see that rotations about perpendicular axes
are essentially independent of one another, except for some complications
due to right angles.
The (standard) notation used below is reviewed in Appendix II.
\vs.1 \nd
{\bf Theorem 4.7}.\ \ Let $p,q\ge 3$ and let $A\equiv R_x^{2\pi/p}$, 
$B\equiv R_z^{2\pi/q}$.
\vs.05 \nd
1) If $p$ and $q$ are odd, 
$G(p,q)=<\!A,B\,:\,A^p,B^q\!>$
\vs.05 \nd
2) If $p$ is even and $q$ is odd, 
$G(p,q)=<\!A,B\,:\,A^p,B^q, A^{p/2}BA^{p/2}B\!>$
\vs.05 \nd
3) If $p$ is even and $q$ is $2\times\hbox{odd}$,
$G(p,q)=<\!A,B\,:\,A^p,B^q, A^{p/2}BA^{p/2}B, B^{q/2}AB^{q/2}A\!>$
\vs.05 \nd
4) If $p$ and $q$ are divisible by $4$,
$G(p,q)=G(lcm(p,q),1,4)=$\hfill \vs0 \nd

$=G(lcm(p,q),1,2)*\hs-.35 {\lower1.6ex\hbox{}}_{G(4,1,2)} \hs-.13
G(4,1,4)$, \vs.05 \nd
where the obvious identifications are made in the amalgamation, and
$lcm$ denotes least common multiple.
\vs0 \nd
Proof.\ We will only prove the cleanest part of the theorem, part 1), which
shows that $G(p,q)$ is the free product of the cyclic groups generated
respectively by $A$ and $B$ if and only if $p$ and $q$ are odd. The ``only
if'' part is easy; if $p$ is even say, then $A^{p/2}BA^{p/2}B=\I$ and
$G(p,q)$ is not the free product. To prove the other direction
what we need to prove is precisely that 
$$A^{c_1}B^{d_1}A^{c_2}B^{d_2}\cdots \ne\I \eqno 4.30)$$ 

\nd if
the $c$'s (resp.\ $d$'s) are nonzero modulo $p$ (resp.\ $q$). Rather
than work with a variety of rotations about two axes, it 
is convenient to reduce the variable behavior to just one axis together
with appropriate use of a rotation by $\pi/2$; that is, we
represent $B$ and $A$ in terms of $R_x^{2\pi/pq}$ 
and $R_y^{2\pi/4}$, by $A=[R_x^{2\pi/pq}]^q$ and
$B=[R_y^{2\pi/4}]^3[R_x^{2\pi/pq}]^pR_y^{2\pi/4}$. In terms of these
rotations, 4.30) is a special case of the following lemma.
\vs0 \nd
{\bf Basic Lemma 4.8}.\ \ Let $p$ and $q$ be odd, 
$m\equiv 4pq$,
$ T\equiv R_x^{2\pi/m}$ and $S\equiv R_y^{2\pi/4}$. Then:
$$WS^{b_1} T^{a_1}S^{b_2} T^{a_2}\cdots S^{b_n} T^{a_n}E\ne \I \eqno 4.31)$$

\nd if $W,E\in G(4,4,1)$, $a_j\ne kpq$, $b_j$ are odd, $n>0$ and
$\I$ is the identity matrix.
\vs0 \nd
Proof of the lemma.\ \ Let $x=e^{{2\pi i/m}},\ y=x^{pq}=e^{{2\pi i/4}}$ and 
$z=x^{4}=e^{{2\pi i/pq}}$. Note that $y^4=1=z^{pq}$. 
Let $R$ be
the ring $\Z[x]=\Z[y,z]$. Consider each factor 
$S^bT^a$ in the statement of the lemma. It is
of the form
$$S T^a=\pmatrix{0&- s&\tilde c\cr 0&\tilde c&\tilde s\cr -1&0&0\cr}\eqno 4.32)$$
or
$$S^3 T^a=\pmatrix{0&\tilde s&-\tilde c\cr 0&\tilde c&\tilde s\cr 1&0&0\cr}\eqno 4.33)$$
\vs.05 \nd where $\tilde c=\cos(2\pi a/m)=(x^a+\bar x^a)/2$, and
$\tilde s=\sin(2\pi a/m)
=(x^a-\bar x^a)/2i$. 
Let $I$ be a maximal extension of the ideal $(1+y) \subset R$.
\vs.1
We need to prove:

\vs0 \nd {\bf Lemma 4.9}. If $a\ne kpq$, 
the $(1,2)$, $(1,3)$,
$(2,2)$ and $(2,3)$ entries of the matrix $2S^b T^a$ are in $R$ but not in the maximal ideal $I$.
\vs0
\nd Proof.\ We prove this first for the $(2,2)$ entry  
$x^a + x^{-a} = y^uz^v+y^{-u}z^{-v}$, where we note that $v\ne
0$. Assume $y^uz^v+y^{-u}z^{-v}\in I$.  Since $1+y \in I$, 
$(-y)^u-1
=-[1+y][1+(-y)+(-y)^2+\cdots +(-y)^{u-1}]
\in I$ and so $(-y)^u z^v - z^v \in I$.  Similarly, 
$(-y)^{-u}-1 \in I$,  so $(-y)^{-u} z^{-v} - z^{-v} \in I$.
This implies, using 
$y^uz^v+y^{-u}z^{-v}\in I$, that $z^v+z^{-v}\in I$. 
We now show that this implies $1\in I$, which is a
contradiction which proves the lemma for the $(2,2)$ entry. 

Let $\tilde z\equiv z^v \ne 1$, and note that $\tilde z^{pq}=1$. 
Now 
$(\tilde z+\tilde z^{-1})(\tilde z^2+\tilde z^3)=(\tilde z+\tilde
z^2+\tilde z^3+\tilde z^4)\in I$. Multiplying by $1+\tilde z^4+\tilde
z^8+\cdots +\tilde z^{4k}$ we see that 
$\tilde z+\tilde z^2+\tilde
z^3+\cdots +\tilde z^{4k+4}\in I$. We now consider two cases. If $pq= 1$
(mod 4), take $k=(pq-5)/4$, obtaining that $\tilde z+\tilde z^2+\tilde
z^3+\cdots +\tilde z^{pq-1}\in I$. But 
$1+\tilde z+\tilde z^2+\tilde
z^3+\cdots +\tilde z^{pq-1}=(1-\tilde z^{pq})/(1-\tilde z)=0$, so 
$\tilde
z+\tilde z^2+\tilde z^3+\cdots +\tilde z^{pq-1}=-1$, which implies
$1\in I$. Alternatively, if $pq=3$ (mod 4) take $k=(pq-3)/4$, obtaining
$\tilde z+\tilde z^2+\tilde z^3+\cdots +\tilde z^{pq+1}\in I$. But
using 
$1+\tilde z+\tilde z^2+\tilde
z^3+\cdots +\tilde z^{pq-1}=(1-\tilde z^{pq})/(1-\tilde z)=0$,
we see that
$\tilde z+\tilde z^2+\tilde z^3+\cdots +\tilde z^{pq+1}=\tilde
z^{pq+1}=\tilde z$, and if $\tilde z\in I$ then $1\in I$. 

Now consider the other entries.  The $(1,3)$ entry is just plus or minus 
the $(2,2)$ entry.  The $(1,2)$ and $(2,3)$ entries are (up to sign) of 
the form $y^{u'}z^v+y^{-u'}z^{-v}$, where $u' = u + 1$.  
The above argument, with $u$ replaced by $u'$, shows that these 
elements are in $R$ but not in $I$. This finishes the proof of the
sublemma. \qed
\vs.1 \nd
Getting back to the Basic Lemma, 
consider the matrix $ 2 S^{b_i}  T^{a_i}$. Note that $2\in I$ since 
$2=1-y^{2}=(1+y)(1-y)$.
We have shown that, modulo $I$, this matrix takes the form

$$ \pmatrix{0&\alpha&\beta\cr 0&\gamma&\delta\cr 0&0&0\cr}\eqno 4.33)$$

\vs.05 \nd with $\alpha, \beta, \gamma, \delta$ nonzero elements of the field
$R/I$.  But the product of two (or more) matrices of this form again takes
this form, so $FS^{b_1} T^{a_1}S^{b_2} T^{a_2}\cdots S^{b_n} T^{a_n}$ 
(where $F$ is a multiple of 2) again takes this form.
Matrices in the group $G(4,4,1)$ are, up to sign, permutation matrices, so 
$FWS^{b_1} T^{a_1}S^{b_2} T^{a_2}\cdots S^{b_n} T^{a_n}E$
has 4 matrix elements that are nonzero in $R/I$.  But $F$ times the 
identity matrix is clearly zero modulo $I$, so 
$WS^{b_1} T^{a_1}S^{b_2} T^{a_2}\cdots S^{b_n} T^{a_n}E$
can never equal the identity.\qed

This is a good time to tie together what we have covered in this
chapter. We have been concerned with rotational properties of
hierarchical tilings such as the kite \& dart. (In this chapter we have 
downplayed
the connection of this study of hierarchical tilings with the
finite type tilings, which we emphasized earlier in the book; we are
free to do this because Theorem 1.10, together with the explicit
examples of the kite \& dart and pinwheel, suggests that hierarchical
tilings can always be thought of as finite type tilings.) First we saw
how the hierarchy leads to a {\it statistical form} of rotational
symmetry. This was important historically as the underlying mechanism
which, through diffraction, led to the discovery of quasicrystals, but
it is also an important new mathematical idea. This feature is
emphasized in those tilings, such as the 2-dimensional pinwheel and 
3-dimensional quaquaversal, in
which the symmetry is large; and analysis of these tilings led to a
classification of the generalized dihedral subgroups of SO(3).
\vfill \eject
\nd
%zzz
{\bf Chapter 5.\ \ Conclusion} 
\vs.05
I can watch a bubbling brook or waterfall for hours; the patterns are
fascinating. If it were practical I would combine this curiosity with
a scientific study of these patterns. Unfortunately the most interesting
feature of such fluids, known as turbulence, is still beyond the
understanding of science. The world of solids is pale by comparison --
and indeed science has made much more progress in that direction. The
(crystalline) structures of equilibrium solids are rather limited, and
sophisticated mathematics has developed over many years to support
such research, for instance the analysis of the crystallographic
groups [HiC]. The discovery of quasicrystals in 1984 [StO] reawakened
interest in this old field, and coming as it did not long after the
mathematical discovery of aperiodic tilings by Robert Berger, Raphael
Robinson, Roger Penrose and others [GrS], there has been a commingling
of the subjects.

Though not as rich as running water, the pinwheel and kite \& dart
tilings (Figs.$\,$13 and 1) can still hold one's attention. All that
structure built out of 1 or 2 simple shapes! Our analysis has
emphasized two general features. First, they are global structures
built out of many copies of a limited number of different
components. And second, the complicated global structure results
solely from the limited ways neighboring components interact. These
are the main points. A third feature is perhaps serendipitous, less
essential: the structures are hierarchical. Our main quest has been to
discover what global structures can be produced by the local
interactions of its small components, and in this sense the additional
hierarchy is perhaps too special. But, as we saw in the last chapter, 
it has certainly proved fertile!

What have we learned after all from these pretty examples? We have seen at 
least three instances in which the
study of these tilings has led to mathematics of independent interest,
interest in a part of mathematics far from tiling. The first was the
result of Shahar Mozes (Theorem 1.10) which tied together seemingly
disparate specialties within ergodic theory -- the subshifts of
finite type and the substitution subshifts. Such unexpected
connections are highly prized. The other two legacies of the study
were the idea
of statistical rotational symmetry, and the classification (Theorem 4.7) of the
generalized dihedral groups $G(p,q)$. Both of the latter are
geometrical; in a sense, they are the result of working within the
abstract framework of subshifts, but giving the
abstract symbols a geometrical life. 

The ideas we used to explore our vague ``main quest'' include ergodic
theory, probability theory, statistical mechanics and ring
theory. This was one of the goals of this book -- to show that
significant new mathematics can result from the interplay of widely
disparate viewpoints.

As to our motivating problem on global structures, the picture we
leave is incomplete; we have certainly not attained fully understood
such structures;
all we have done is find a number of unexpected examples, and use
them to obtain some unexpected consequences of the combination of 
hierarchy with rotations.
There remain specific open problems, such as whether one can, by
local rules, determine tilings all of which are ``mixing'' -- in 
which one loses all information
traveling between far distant regions. And there are less concrete problems
such as determining the full role of the generalized
dihedral groups in tilings. There is much interesting work to be done,
and I hope this book encourages further investigation.
\vfill \eject
%zzz
\nd {\bf Appendix I.\ \ Geometry}
\vs.1
We refer to the $d$-dimensional Euclidean spaces $\R^d$ only for
$d=1,2,3$. By a ``congruence'' or rigid motion we mean a map $\phi$
from such a space to itself which preserves the (Euclidean) distance
between points: $d[\phi(x),\phi(y)]= d[x,y]$. The set of such maps
constitutes the ``Euclidean group'' $\E^d$, which is generated by
translations, rotations and reflections [HiC]. Furthermore, the
rotations can be identified (as a group) with $SO(d)$, the real
$d\times d$ matrices of determinant 1 whose column vectors are
orthonormal [Cur].

A ``symmetry'' of a subset $S$ of $\R^d$ is a congruence of $\R^d$
which maps $S$ onto itself. More generally, a symmetry of a {\it
collection} of subsets of $\R^d$ is a congruence of $\R^d$ which maps
each set in the collection onto a set in the collection. The set of
all symmetries of such a set (or collection of sets) is automatically
a group under composition. For instance, the group of symmetries of a
regular $n$-gon in $\R^2$ is the ``dihedral group'' of order $2n$,
which is the group $\{a^pb^q\,:\, 0\le p\le n-1,\ 0\le q\le 1\}$,
where $a$ is rotation of the $n$-gon about its center by $2\pi/n$ and
$b$ is reflection about a line joining some opposite pair of its
vertices.

Consider a ``tiling'' $T$ of $\R^d$ by polyhedra (that is, $T$ is a
collection of solid polyhedra, with pairwise disjoint interiors, whose
union is $\R^d$) for which the translational symmetries are of the
form $n_1t_1+\cdots +n_dt_d$, for all $n_j\in \Z$, for $d$ linearly
independent vectors $t_j\in \R^d$. The possible symmetry groups for such
tilings are called the ``crystallographic groups'', and have been
classified [HiC].
\vfill \eject
%zzz
\nd {\bf Appendix II.\ \ Algebra}
\vs.1
By a ``representation'' of the group $G$ we mean a group homomorphism
of $G$ into the group of invertible linear functions of a complex
vector space onto itself. In particular we will consider
representations on spaces of functions. A representation is called
``$n$-dimensional'' if the vector space is $\C^n$, and therefore the
linear functions can be identified with $n\times n$ matrices with
complex entries. It is then called ``irreducible'' if the only
subspaces $M\subseteq \C^n$ mapped into themselves by all the matrices
of the representation are $M=\{0\}$ and $M=^n$. For instance, the only
irreducible representations of the circle group $G=SO(2)$ are one
dimensional, and labeled by $\Z$, namely $f_m:\alpha\in [0,2\pi)
\rightarrow e^{im\alpha}\in \C,\ m\in \Z$; they are called
``characters''.

Given a finite group $G$ we define its ``group algebra'' as all formal
complex linear combinations $\sum_{g\in G}a_gg$, where $a_g\in
\C$. Note the natural one-to-one correspondence between the formal sum
$\sum_{g\in G}a_gg$ and the complex-valued function on the group defined
by $a(g)\equiv a_g$. We say two such formal sums are the same if and only
if their associated functions are the same. Then we define
multiplication by numbers, addition, and multiplication by,
respectively:
\vs.05 $\circ\ \  \alpha\sum_{g\in G}a_gg\equiv \sum_{g\in
G}(\alpha a_g)g$
\vs0 $\circ\ \  (\sum_{g\in G}a_gg)+(\sum_{g^\prime\in
G}a^\prime_gg\equiv \sum_{g\in G}(a_g+a^\prime_g)g$ \vs0
$\circ\ \  (\sum_{g\in G}a_gg)(\sum_{g^\prime\in
G}a^\prime_gg^\prime)\equiv \sum_{g,g^\prime\in G}
a_ga^\prime_ggg^\prime$ \vs.05 \nd It is also useful to have an
adjoint on this algebra: $(\sum_{g\in G}a(g)g)^*\equiv
\sum_{g\in G}\bar a(g^{-1})g$. 

Since we are representing groups as linear operators, we can extend
the representation in a natural way to a representation of the group
algebra. (Conversely, a representation of the algebra yields a unique
representation of the group -- but we won't need this.) And if the
representation $\phi$ of the group is ``unitary'', that is, if
$\phi(g)^*=[\phi(g)]^{-1}=\phi(g^{-1})$, then the representation of
the algebra also respects the adjoint on the algebra:
$\phi(a^*)=[\phi(a)]^*$ (see Appendix III).

Finally, we will use the notion of a ``presentation'' of a group.  Let
$A$ be a nonempty collection of pairs of symbols $a_j, a^{-1}_j$. We
define ``words'' to be finite ordered sequences of such symbols, such
as $a_3a^{-1}_1a_{17}$. The empty ordered sequence is denoted 1. A
product is defined for such sequences by concatenation, for instance,
the product
$(a_3a^{-1}_1a_{17})(a_{12}a_4)=a_3a^{-1}_1a_{17}a_{12}a_4$. The
symbol $a^n$ is an abbreviation for the word $aaa\ldots a$ consisting
of $n$\ $a$'s. Given a word $W=a_{j_1}a_{j_2}\ldots a_{j_k}$, the word
$W^{-1}$ is defined to be $W^{-1}=a^{-1}_{j_k}\ldots
a^{-1}_{j_2}a^{-1}_{j_1}$.

Assume given, besides $A$, some set (possibly empty) of words $P_1,
P_2 \ldots$. We define an equivalence relation on the set of words:
$W_1\sim W_2$ if $W_1$ can be turned into $W_2$ by a finite number
of applications of the following operations:
\vs.05 $\circ$\ Insertion of one of the words $a_ja^{-1}_j$, $a^{-1}a_j$, $P_j$,
or $P_j^{-1}$, either between two consecutive symbols in $W_1$, or just
before the first symbol of $W_1$ or just after the last symbol of
$W_1$.
\vs.05 $\circ$\ Deletion of one of the words $a_ja_j^{-1}$, $a_j^{-1}a_j$, $P_j$,
or $P_j^{-1}$, if it forms a consecutive block of symbols in $W_1$.
\vs.05 \nd We denote the set of equivalence classes of words by
$<\!a_1,a_2,\ldots\, :\,P_1,P_2\ldots \!>$. It is easily seen to be a
group with product defined by concatenation. In this notation the
dihedral group of order $2n$ is
$<\!a_1,a_2\,:\,a^n_1,a^2_2,a_1a_2a_1a_2\!>$. For another example
consider the two finite cyclic groups $\Z_3$, $\Z_5$ of orders 3 and 5
respectively. Their ``free product'', denoted $\Z_3\ast \Z_5$, is the
group $<\!a_1,a_2\,:\,a^3_1,a^5_2\!>$; that is, all finite strings of
$a_1$'s and $a_2$'s of appropriate powers.

There is a generalization of free products which is of significant
interest.  Consider the group $G$ with presentation
$<\!a,b\,:\,a^4,b^6,a^2b^{-3}\!>$. This is almost the free product of
$\Z_4=\,<\!a\,:\,a^4\!>$ with $\Z_6=\,<\!b\,:\,b^6\!>$. Both these
groups have $\Z_2$ as a subgroup: the subgroups generated by $a^2$ and
$b^3$, respectively, and $G$ is said to be the {\it free product} of
its subgroups generated by $a$ and $b$, respectively, {\it amalgamated}
over the common subgroup ($\Z_2$) -- that is, with this ``common''
subgroup identified. (Think of this as an algebraic version of the
process in topology wherein you ``identify'' the opposite edges of a
square to get a torus. In fact, there are topological issues here, but
we will ignore them as they are tangential to our subject.)  This is
expressed: $G=\Z_4*\hs-.15 {\lower1.6ex\hbox{}}_{\Z_2} \hs0
\Z_6$, though this notation does not show the way in which the common
subgroups of the factors are identified. More generally, the group
$G\equiv \ <\!a_1,a_2,\ldots,b_1,b_2,\ldots,\,:\, R(a_1),\ldots,
S(b_1),\ldots, U_1(a_{j_1})[V_1(b_{k_1})]^{-1},\ldots,\!>$ is called the
``amalgamated free product'' of the subgroup $A$ generated by the
$a$'s and the subgroup $B$ generated by the $b$'s, with the subgroup
generated by $U_1(a_{j_1}),\ldots$ of $A$ amalgamated with the
subgroup generated by $V_1(b_{k_1}),\ldots$ of $B$.  If this common
subgroup is $H$, we write $G = A *\hs-.15 {\lower1.6ex\hbox{}}_{H}
\hs.02 B$.  For an elaboration of the above we refer to the classic
text [MKS], and for other aspects of introductory algebra we recommend
[Her].

\vfill \eject
%zzz
\nd {\bf Appendix III.\ \ Analysis}
\vs.1
The first topic in this appendix is abstract integration; for further
details we recommend the text [Tay]. Let $X$ be a compact metrizable
space, and let $C(X)$ be the complex continuous functions on $X$. We
wish to ``integrate'' functions on $X$, including those in $C(X)$. For
instance, let $X$ be a countable product of 2-point spaces,
$X=\{0,1\}^{\Z}=\{x_j\,:\,x_j\in \{0,1\},\ j\in
\Z\}$. By Tychonoff's theorem $X$ is compact if we take the
topology for the product to be generated by so-called ``cylinder
sets'', that is, sets of the form $X_\epsilon\equiv
X_{\epsilon_{j_1},\ldots
\epsilon_{j_k}}\equiv \{x_j\,:\, x_{j_1}=\epsilon_{j_1},\ldots ,
x_{j_k}=\epsilon_{j_k}\}$, where $\epsilon_j\in
\{0,1\}$. Indicator functions for such cylinder sets (that is,
functions which have value 1 on the set and value 0 off the set) are
continuous. Now when $X$ is used as the model for the history of flips
of a fair coin [Bil], it is natural to associate with the cylinder set
$X_{\epsilon_{j_1},\ldots \epsilon_{j_k}}$ an ``expected value''
$(1/2)^k$, which would be the value of the ``integral''
$\I(\chix_{X_\epsilon})$ of the indicator function $\chix_{X_\epsilon}$. 

In general, an expected value or (probability) integral $\I$ would
have the properties: 
\vs.05 $\circ$\ 
$\I(f)\ge 0$ for any $f\in C(X),\ f\ge 0$

$\circ$\ $\I(I)=1$ (where $I$ is the constant function on $X$ with value 1)

$\circ$\ $\I(af+bg)\,=\,a\I(f)+b\I(g)$, for $a,b\in \C,\ f,g\in C(X)$ --
that is, $\I$ is linear
\vs.05 \nd
Starting with any such integral one can uniquely extend its domain to
a larger class of ``integrable'' functions, denoted $\L^\I_1$. For
instance, consider the class of ``Borel'' subsets $S$ of $X$, that is,
those sets which can be made from open sets by countably many
operations of union, intersection and complement. (Any countable set
is easily seen to be Borel.) The indicator function $\chix_S$ of
a Borel set $S$ is always integrable. Similarly, for positive integer $p$ one
defines $\L^\I_p$ as the set of functions $f$ for which $f^p$ is
integrable. These spaces usually include some nonzero functions $f$
for which $\I(|f|)=0$; call this set $Z$. It is an important theorem of
Markov that when we use $Z$ to define equivalence classes in $\L^\I_p$
(two functions being equivalent if their difference is in $Z$), the
quotient, denoted $L^\I_p$, is a linear space which is {\it complete}
in the norm $\|\{f\}\|^\I_p\equiv [\I(|f|^p)]^{1/p}$, where $f$ is any
representative of the equivalence class $\{f\}\in L^\I_p$. In fact,
$L^\I_p$ can be identified with the completion of $C(X)$ in the norm
$\|\cdot \|^\I_p$. Also, the linear space $L^\I_2$, on which we can
put an inner product $<\!\{f\},\{g\}\!>_\I\, \equiv
\I(\bar {f}g)$, is thus a ``Hilbert space'': that is, it is complete in
the norm coming from its inner product ($\|\{f\}\|^\I_2=[<\!
\{f\},\{f\}\!>_\I]^{1/2}$). (The usual inner product on $\C^d$ is
given by $<\!x,y\!>=\sum_j\overline{x_j}\, y_j$.)
A simple technical result about vectors in
a Hilbert space which has wide
applicability is the Cauchy-Schwarz inequality: for all $f,g$,
$$ |<\!f,g\!>|^2\le <\!f,f\!><\!g,g\!>. \eqno III.1)$$

Another important technical result we will use is the
\vs.1 \nd
{\bf Monotone Convergence Theorem}.\ \ Suppose $f_n$ is a sequence of
real functions on $X$, $f_n\in \L_1^\I$, satisfying $f_{n+1}\ge f_n$.
Assume $\lim_nf_n(x)=f(x)$ for all $x\in X$. Then $f\in \L_1^\I$ if
and only if $\lim_n\I(f_n)< \infty$. When this is the case,
$\lim_n\I(f_n)=\I(f)$.
\vs.05

The other main topic of this appendix is operator theory; we recommend
[BaN, RiN, Nai] as general references. First we
classify some of the operators on a (finite or infinite dimensional) 
Hilbert space $\H$. The
continuous linear operators, that is, the set of all maps
$A:\H\longrightarrow \H$ which are linear and continuous, is denoted
$B(\H)$. The ``adjoint'' $A^*\in B(\H)$ of $A\in B(\H)$ is that operator
such that $<\!x,Ay\!>\,=\,<\!A^*x,y\!>$ for all $x,y\in \H$. 
(Thinking of $d\times d$ matrices as operators on the
inner product space $\C^d$ in the usual way, 
the components of the adjoint $M^*$
are related to those of $M$ by $M^*_{j,k}=\overline{M_{k,j}}$).
We will be
referring to three subsets of $B(\H)$: the ``self adjoint'' operators
$A$ are those equal to their adjoints, that is, $A=A^*$; the ``projections'' $P$
are those self adjoint operators which are idempotent, that is,
$P^2=P$; and the ``unitary'' operators $U$ are those which preserve
the inner product, namely, $<\!Ux,Uy\!>\,=\,<\!x,y\!>$ for all $x,y\in
\H$. The range of a projection $P$ is a closed linear subspace of $\H$,
and every such subspace is the range of a projection. The unitaries
preserve all the structure of the Hilbert space, so they constitute
its ``symmetries''. 

There are numerous convenient ways to measure the size of an operator $A
\in B(\H)$. One is its norm $\|A\|\equiv \sup_{x\in \H:\|x\|=1}\|Ax\|$.
Another is its ``spectral radius'' $\sigma(A)\equiv \sup
\{|\mu|\,:\,(\mu -A)^{-1}\notin B(\H)\}$. The two are related by
$\sigma(A)=\lim_{n\to\infty}\|A^n\|^{1/n}$.


Our main use of Hilbert space is to house representations of groups, in
particular the discrete group
$\Z^d$ and the continuous group $\R^d$. They are usually represented
by unitary operators $T^g$
on some Hilbert space $\H$, with the representation
``continuous'' in the sense that $T^gy$ is continuous in $g\in G$
for each fixed $y\in \H$ (or equivalently, that $<\!x,T^gy\!>$ is
continuous in $g\in G$ for fixed $x,y\in \H$).

\vfill \eject
\nd
\centerline{\bf References}
\vs.1 \nd
We have tried to use the most accessible references, which are
often not the first published references.
\vs.2 \nd
[BaN]\ G.\ Bachman and L.\ Narici, {\it Functional Analysis}, Academic
Press, New York, 1966.
\vs.1 \nd
[Bil]\ P.\ Billingsley, {\it Ergodic Theory and Information}, John
Wiley, New York, 1965.
\vs.1 \nd
[CoR]\ J.H.\ Conway and C.\ Radin, Quaquaversal tilings and rotations,
{\it Inventiones math.}, to appear.
\vs.1 \nd
[Cul]\ K.\ Culik II, An aperiodic set of 13 Wang tiles, 
{\it Discrete\ Appl.\ Math.}\ , to appear.
\vs.1 \nd
[Cur]\ M.L.\  Curtis, {\it Matrix Groups}, $2^{nd}$ ed., Springer Verlag,
New York, 1984.
\vs.1 \nd
[DeK]\ F. M. Dekking and M. Keane,
Mixing properties of substitutions,
{\it Zeit.\ Wahr.}\ {\bf 42} (1978), 23--33.
\vs.1 \nd
[EiI]\ A.\ Einstein and L.\ Infeld, {\it The Evolution of Physics; the growth 
of ideas from early concepts to relativity and quanta},
Simon and Schuster, New York, 1938.
\vs.1 \nd
[Gar]\ M.\ Gardner, Extraordinary nonperiodic tiling that enriches the
theory of tiles, {\it Sci.\ Am.\ (USA)} (December 1977), 110-119.
\vs.1 \nd
[GrS]\ B.\ Gr\"unbaum\  and G.C.\ Shephard, {\it Tilings and Patterns},
Freeman, New York, 1986.
\vs.1 \nd
[Gui]\ A.\ Guinier, {\it X-ray diffraction in crystals, imperfect
crystals, and amorphous bodies}, Trans. P.\ Lorrain and D.\
Ste.-M. Lorrain, Freeman, San Francisco, 1963.
\vs.1 \nd
[Her]\ I.N.\ Herstein, {\it Topics in Algebra}, Blaisdell, New York, 1964.
\vs.1 \nd
[HiC]\ D. Hilbert and S. Cohn-Vossen, {\it Geometry and the
Imagination}, Chelsea, New York, 1952.
\vs.1 \nd
[Kol]\ A.N.\ Kolmogorov, {\it Foundations of the Theory of Probability},
$2^{nd}$ English edition, trans. N.\ Morrison, Chelsea, New York, 1956.
\vs1 \nd
[Kra]\ H.A.\ Kramers, in {\it Physical Science and Human Values, a Symposium},
ed. E.P.\ Wigner, Princeton University Press, 1947.
\vs.1 \nd
[KuN]\ L.\ Kuipers and H.\ Niederreiter, {\it Uniform Distribution of
Sequences}, John Wiley, New York, 1974.
\vs.1 \nd
[MKS]\ W.\ Magnus, A.\ Karrass and D.\ Solitar, {\it Combinatorial
Group Theory: Presentations of Groups in Terms of Generators and
Relations}, $2^{nd}$ ed., Dover, New York, 1976.
\vs.1 \nd
[Moz]\ S.\ Mozes, Tilings, substitution systems and dynamical systems
generated by them, {\it J. d'Analyse Math.}\ 53 (1989), 139-186.
\vs.1 \nd
[Nai]\ M.A.\ Naimark, {\it Normed Rings}, trans. by L.F.\ Boron,
Noordhoff, Groningen, 1964.
\vs.1 \nd
[Pet]\ K.\ Petersen, {Ergodic theory}, Cambridge University Press,
Cambridge, 1983, p.\ 271.
\vs.1 \nd
[Ra1]\ C.\ Radin, Low temperature and the origin of crystalline
symmetry, {\it Intl.\ J.\ Mod.\ Phys.}\ B1 (1987), 1157-1191.
\vs.1 \nd
[Ra2]\ C.\ Radin, The pinwheel tilings of the plane, {\it Annals of
Math.}\ 139 (1994), 661-702.
\vs.1 \nd
[Ra3]\ C.\ Radin, Space tilings and substitutions, {\it Geometriae Dedicata}\
55 (1995), 257-264.
\vs.1 \nd
[Ra4]\ C.\ Radin, Symmetry and tilings, {\it Notices Amer.\ Math.\ Soc.}\ 
42 (1995), 26-31.
\vs.1 \nd
[RaW]\ C.\ Radin and M.\ Wolff, Space tilings and local isomorphism,
{\it Geometriae Dedicata} 42 (1992), 355-360.
\vs.1 \nd
[RiN] F.\ Riesz and B.\ Sz-Nagy, {\it Functional Analysis}, tr. by
L.F.\ Boron, Frederick Ungar, New York, 1955.
\vs.1 \nd
[Rob]\ R.M.\ Robinson, Undecidability and nonperiodicity for tilings of the
plane, {\it Invent.\ Math.} 12 (1971) 177-209.
\vs.1 \nd
[RS1]\ C.\ Radin and L.\ Sadun, Subgroups of SO(3) associated with tilings,
{\it J. Algebra}, to appear.
\vs.1 \nd
[RS2]\ C.\ Radin and L.\ Sadun, Rotating rationally,
preprint, University of Texas, 1997.
\vs.1 \nd
[Rue]\ D.\ Ruelle, {\it Statistical Mechanics; Rigorous Results},
Benjamin, New York, 1969.
\vs.1 \nd
[Sen]\ M.\ Senechal, {\it Quasicrystals and geometry}, Cambridge
University Press, Cambridge, 1995.  
\vs.1 \nd
[StO]\ P.\ Steinhardt and S.\ Ostlund, {\it The Physics of
Quasicrystals}, World Scientific, Singapore, 1987.
\vs.1 \nd
[Tay]\ A.\ Taylor, {\it General Theory of Functions and Integration},
Blaisdell, Waltham, 1965.
\vs.1 \nd
[Wal]\ P.\ Walters, {\it An Introduction to Ergodic Theory},
Springer-Verlag, New York, 1982.
\vs.1 \nd
[Wan]\ H.\ Wang, Games, logic and computers, {\it Sci.\ Am.\ (USA)}
(November 1965), 98-106.
\vfill \eject

%zw
\nopagenumbers
%\lett
%\nd
\hbox{}
\epsfig 1.15\hsize; fig1.ps ;
\vs-.5
\centerline{Figure 1. A Penrose ``kite \& dart'' tiling}
\vfill\eject
\hbox{}
\vs2
\hs.75 \vbox{\epsfxsize=4.5truein\epsfbox{fig2.ps}}
\vs.5
\centerline{Figure 2. 12 unit cells of a periodic configuration}
\vfill\eject
\hbox{}
\vs2
\hs1.7 \vbox{\epsfxsize=2truein\epsfbox{fig3.ps}}
\vs.5
\centerline{Figure 3. The tile $(3,5)$}
\vfill\eject
\hbox{}
%\vs.5
\hs-.45 \vbox{\epsfxsize=6.5truein\epsfbox{fig4.ps}}
\vs.5
\centerline{Figure 4. Part of a periodic tiling, with unit cells outlined}
\vfill\eject
\hbox{}
%\vs.5
\hs-.45 \vbox{\epsfxsize=6.5truein\epsfbox{fig5.ps}}
\vs.5
\centerline{Figure 5. Part of a periodic tiling, with different unit cells outlined}
\vfill\eject
\hbox{}
%\vs.5
\hs-.45 \vbox{\epsfxsize=6truein\epsfbox{fig6.ps}}
\vs.5
\centerline{Figure 6. The Kari-Culik tiles}
\vfill\eject
\hbox{}
\vs2 \nd
\hs2 \vbox{\epsfxsize=2truein\epsfbox{fig7.ps}}
\vs.5 \nd
\centerline{Figure 7. The ``random tile''}
\vfill\eject
\hbox{}
\vs2 \nd
\hs1 \vbox{\epsfxsize=4truein\epsfbox{fig8.ps}}
\vs.5 \nd
\centerline{Figure 8. Part of a ``random tiling''}
\vfill\eject
\hbox{}\vs2 \nd
\epsfig .4\hsize; fig9.ps;
\vs.1 \nd
\centerline{Figure 9. The Morse tiles}
\vfill\eject
\hbox{}\vs2 \nd
\epsfig .4\hsize; fig10.ps;
\vs.1 \nd
\centerline{Figure 10. The Morse substitution system}
\vfill\eject
\hbox{}\vs2 \nd
\epsfig .4\hsize; fig11.ps;
\vs.1 \nd
\centerline{Figure 11. Expansion}
\vfill\eject
\hbox{}\vs2 \nd
\epsfig .8\hsize; fig12.ps;
\vs.1 \nd
\centerline{Figure 12. A Morse tiling}
\vfill\eject
\hbox{}
\vs0 \hs.3
\vbox{\epsfig 1\hsize; fig13.ps ;}
\vs-.5
\centerline{Figure 13. A pinwheel tiling}
\vfill\eject
\hbox{}\vs2 \nd
\epsfig .8\hsize; fig14.ps;
\vs.1 \nd
\centerline{Figure 14. Two levels of a Morse tiling}
\vfill\eject
\hbox{}\vs2 \nd
\epsfig .8\hsize; fig15.ps;
\vs.1 \nd
\centerline{Figure 15. Two levels of a periodic tiling}
\vfill\eject
\hbox{}\vs2 \hs.5 \vbox{\epsfxsize=5truein\epsfbox{fig16.ps}}
\vs.5 
\centerline{\hs1.3 \hbox{kite}\hs2.2 \hbox{dart}\hfil}
\vs.3
\centerline{Figure 16.\ \ \ The kite and dart}
\vfill\eject
\hbox{}\vs-3 \hs.15 \vbox{\epsfxsize=5.5truein\epsfbox{fig17a.ps}}
\vs-3 \hs.15
\vbox{\epsfxsize=5.5truein\epsfbox{fig17b.ps}}
\vs-2
\centerline{Figure 17.\ \ \ Substitution $\tilde F$ for kite and dart}
\vfill\eject
\hbox{}\vs2
\hbox{}\hs.2 \vbox{\epsfxsize=4.5truein\epsfbox{fig18.ps}}
\vs.3 
\centerline{\hs.45 \hbox{kite}\hs2 \hbox{dart}\hfil}
\vs.4
\centerline{\hs-.75 Figure 18.\ \ \ The modified kite and dart}
\vfill \eject
\hbox{}\vs1 \nd
\epsfig .8\hsize; fig19.ps;
\vs.1 \nd
\centerline{Figure 19. The five basic tiles and three parity tiles}
\vfill\eject
\hbox{}\vs1 \nd
\epsfig .8\hsize; fig20.ps;
\vs.1 \nd
\centerline{Figure 20. Constructing the ten Robinson tiles, a -- j}
\vfill\eject
\hbox{}\vs1 \nd
\epsfig .4\hsize; fig21.ps;
\vs.1 \nd
\centerline{Figure 21. Unit cell of parity tiles}
\vfill\eject
\hbox{}\vs1 \nd
\epsfig .4\hsize; fig22.ps;
\vs.1 \nd
\centerline{Figure 22. Abbreviated basic tiles}
\vfill\eject
\hbox{}\vs1 \nd
\epsfig .4\hsize; fig23.ps;
\vs.1 \nd
\centerline{Figure 23. A 3-square}
\vfill\eject
\hbox{}\vs1 \nd
\epsfig .6\hsize; fig24.ps;
\vs.1 \nd
\centerline{Figure 24. Consecutive crosses}
\vfill\eject
\hbox{}\vs1 \nd
\epsfig .6\hsize; fig25.ps;
\vs.1 \nd
\centerline{Figure 25. An even distance between crosses}
\vfill\eject
\hbox{}\vs1 \nd
\epsfig .6\hsize; fig26.ps;
\vs.1 \nd
\centerline{Figure 26. A 7-square}
\vfill\eject
\hbox{}\vs1 \nd
\epsfig .6\hsize; fig27.ps;
\vs.1 \nd
\centerline{Figure 27. The central column is a fault line}
\vfill\eject
\hbox{}\vs2 \nd
\epsfig .4\hsize; fig28.ps;
\vs.1 \nd
\centerline{Figure 28. The Dekking-Keane tiles}
\vfill\eject
\hbox{}\vs2 \nd
\epsfig .4\hsize; fig29a.ps;
\vs.1 \nd
\centerline{Figure 29a. Part of the Dekking-Keane substitution}
\vfill\eject
\hbox{}\vs2 \nd
\epsfig .6\hsize; fig29b.ps;
\vs.1 \nd
\centerline{Figure 29b. Part of the Dekking-Keane substitution}
\vfill\eject
\hbox{}\vs.5
\epsfig .7\hsize; fig30.ps;
\vs.5
\centerline{Figure 30. The pinwheel substitution}
\vfill \eject
\hbox{}\vs2
\epsfig .7\hsize; triangle.ps;
\vs.5
\centerline{Figure 31a. Decomposing a triangular face of the quaquaversal tile}
\vfill \eject
\hbox{}\vs2
\epsfig .9\hsize; prism1.ps;
\vs.5
\centerline{Figure 31b. One view of the decomposition of the quaquaversal tile}
\vfill \eject
\hbox{}\vs2
\epsfig .6\hsize; prism2.ps;
\vs.5
\centerline{Figure 31c. Another view of the decomposition of the quaquaversal tile}
\vfill \eject
\hbox{}
%\hs-1.5 \vbox{\epsfig 1.15\hsize; new15c.ps;} \vs.5
\vs-.5 \hs-1 \vbox{\epsfig 1\hsize; new9a.ps;} \vs-.5
\centerline{Figure 32.\ \ \ Part of a quaquaversal tiling}
\vfill \eject
\hbox{}
\vs1 \nd
\hs.75 \vbox{\epsfxsize=4.5truein\epsfbox{d+k4.ps}}
\vs-2.6 \nd \hs1 \hbox{$\delta$}
\hs.75 \hbox{$\kappa$}\hs1.25 \hbox{$\tilde\delta$}
\hs1.1 \hbox{$\tilde\kappa$}
\hfil
\vs2.7
\nd \hs.9 \hbox{$D(\delta)$}
\hs.4 \hbox{$D(\kappa)$}\hs1 \hbox{$D(\tilde\delta)$}
\hs.8 \hbox{$D(\tilde\kappa)$}
\hfil
\vs.5 \nd
\centerline{Figure 33. Dites and karts}
\vfill \eject
\hbox{}
%\vs.5 \nd
\hs.75 \vbox{\epsfxsize=4.5truein\epsfbox{newerbox2.ps}}
\vs.5
\nd \hs1.25 original
\hs2.7 rotated
\hfil
\vs.5 \nd
\centerline{Figure 34. Rotating the boxes}
\vfill

\end