MPEJ Volume 1, No.1, 12pp Received: March 23, 1995, Revised: May 3, 1995, Accepted: May 3, 1995 Giovanni Gallavotti Reversible Anosov diffeomorphisms and large deviations. ABSTRACT: the volume contraction obeys a large deviation rule ------------------------------------------------------------------------------- MPEJ Volume 1, No.2, 37pp Received: June 17, 1995, Accepted: July 10, 1995 Adam W. Majewski, Boguslaw Zegarlinski Quantum Stochastic Dynamics I ABSTRACT: In the context of non-commutative $\BL_p$ spaces we discuss the conditions for existence and ergodicity of translation invariant stochastic spin flip and diffusion dynamics for quantum spin systems with finite range interactions on a lattice. ------------------------------------------------------------------------------- MPEJ Volume 1, No.3, 28pp Received: September 8, 1995, Revised: October 16, 1995, Accepted: October 23, 1995 Jacques Magnen, Vincent Rivasseau A Single Scale Infinite Volume Expansion for Three Dimensional Many Fermion Green's Functions ABSTRACT: In [FMRT1] we introduced a cluster expansion for many Fermion systems in two space dimensions based on a so-called sector decomposition. In this paper a completely different expansion is introduced to treat the more difficult case of three (or more) space dimensions: it is based on an auxiliary scale decomposition and the use of the Hadamard inequality. We prove that the perturbative expansion for a single scale model has a convergence radius independent of the scale. This is a typical result, proved in the two dimensional case in [FMRT1], which we cannot obtain in three dimensions by naive extrapolation of the sector method. Although we do not treat in this paper the full (multiscale) system, we hope this new method to be a significant step towards the rigorous construction of the BCS theory of superconductivity in three space dimensions. ------------------------------------------------------------------------------- MPEJ Volume 1, No.4, 35pp Received: August 25, 1995, Revised: November 16, 1995, Accepted: November 22, 1995 Gregory F. Lawler Nonintersecting Planar Brownian Motions ABSTRACT: In this paper we construct a measure on pairs of Brownian motions starting at the same point conditioned so their paths do not intersect. The construction of this measure is a start towards the rigorous understanding of nonintersecting Brownian motions as a conformal field. Let $B^1,B^2$ be independent Brownian motions in $\R^2$ starting at distinct points on the unit circle. Let $T_r^j$ be the first time that the $j$th Brownian motion reaches distance $r$ and let $D_r$ be the event $$ D_r = \{B^1[0,T_{e^r}^1] \cap B^2[0,T_{e^r}^2] = \emptyset \} . $$ We construct the measure by considering the limit of the measure induced by Brownian motions conditioned on the event $D_r$. ------------------------------------------------------------------------------- MPEJ Volume 1, No.5, 13pp Received: March 24, 1995, Revised: September 11, 1995, Accepted: September 29, 1995 G. Gallavotti, G. Gentile, V. Mastropietro Field theory and KAM tori ABSTRACT: The parametric equations of KAM tori for an l degrees of freedom quasi integrable system, are shown to be one point Schwinger functions of a suitable euclidean quantum field theory on the l dimensional torus. The KAM theorem is equivalent to an ultraviolet stability theorem. A renormalization group treatment of the field theory leads to a resummation of the formal perturbation series and to an expansion in terms of $l^2$ new parameters forming a $l\times l$ matrix $\sigma_\epsilon$ (identified as a family of renormalization constants). The matrix $\sigma_\epsilon$ is an analytic function of the coupling $\epsilon$ at small $\epsilon$: the breakdown of the tori at large $\epsilon$ is speculated to be related to the crossing by $\sigma_\epsilon$ of a "critical" surface at a value $\epsilon=\epsilon_c$ where the function $\sigma_epsilon$ is still finite. A mechanism for the possible universality of the singularities of parametric equations for the invariant tori, in their parameter dependence as well as in the $\epsilon_c-\epsilon$ dependence, is proposed. ------------------------------------------------------------------------------- MPEJ Volume 1, No.6, 24pp Received: October 5, 1995, Revised: November 30, 1995, Accepted: December 6, 1995 Hans Koch, Peter Wittwer Bounds on the Zeros of a Renormalization Group Fixed Point ABSTRACT: We prove that the Renormalization Group transformation for the Laplace transform of the d=3 Dyson-Baker hierarchical model has a nontrivial entire analytic fixed point whose zeros all lie on the imaginary axis. Sharp upper and lower bounds on 80 of these zeros are used to verify the assumptions made in reference [11]. Our proof is computer-assisted.