Multiple phase transitions on compact symbolic systems

Abstract

Let φ:X R be a continuous potential associated with a symbolic dynamical system T:X X over a finite alphabet. Introducing a parameter β>0 (interpreted as the inverse temperature) we study the regularity of the pressure function β P top(βφ) on an interval [α,∞) with α>0. We say that φ has a phase transition at β0 if the pressure function P top(βφ) is not differentiable at β0. This is equivalent to the condition that the potential β0φ has two (ergodic) equilibrium states with distinct entropies. For any α>0 and any increasing sequence of real numbers (βn) contained in [α,∞), we construct a potential φ whose phase transitions in [α,∞) occur precisely at the βn's. In particular, we obtain a potential which has a countably infinite set of phase transitions.