Phase transitions for surface diffeomorphisms

Abstract

In this paper we consider C1 surface diffeomorphisms and study the existence of phase transitions, here expressed by the non-analiticity of the pressure function associated to smooth and geometric-type potentials. We prove that the space of C1-surface diffeomorphisms admitting phase transitions is a C1-Baire generic subset of the space of non-Anosov diffeomorphisms. In particular, if S is a compact surface which is not homeomorphic to the 2-torus then a C1-generic diffeomorphism on S has phase transitions. We obtain similar statements in the context of C1--volume preserving diffeomorphisms. Finally, we prove that a C2-surface diffeomorphism exhibiting a dominated splitting admits phase transitions if and only if has some non-hyperbolic periodic point.