D. del-Castillo-Negrete, J. M. Greene, P. Morrison Renormalization and transition to chaos in area preserving non twist maps. (90K, Latex 2.0) ABSTRACT. The problem of transition to chaos, i.e.\ the destruction of invariant circles or KAM (Kolmogorov-Arnold-Moser) curves, in area preserving {\em nontwist} maps is studied within the renormalization group framework. Nontwist maps are maps for which the twist condition is violated along a curve known as the shearless curve. In renormalization language this problem is that of finding and studying the fixed points of the renormalization group operator ${\cal R}$ that acts on the space of maps. A simple period-two fixed point of ${\cal R}$, whose basin of attraction contains the nontwist maps for which the shearless curve exists, is found. Also, a critical period-twelve fixed point of ${\cal R}$, with two unstable eigenvalues, is found. The basin of attraction of this critical fixed point contains the nontwist maps for which the shearless curve is at the threshold of destruction. This basin defines a new universality class for the transition to chaos in area preserving maps.