Multiple phase transitions on compact symbolic systems
Abstract
Let be a continuous potential associated with a symbolic dynamical system over a finite alphabet. Introducing a parameter (interpreted as the inverse temperature) we study the regularity of the pressure function on an interval with . We say that has a phase transition at if the pressure function is not differentiable at . This is equivalent to the condition that the potential has two (ergodic) equilibrium states with distinct entropies. For any and any increasing sequence of real numbers contained in , we construct a potential whose phase transitions in occur precisely at the 's. In particular, we obtain a potential which has a countably infinite set of phase transitions.
Cite
@article{arxiv.2006.13988,
title = {Multiple phase transitions on compact symbolic systems},
author = {Tamara Kucherenko and Anthony Quas and Christian Wolf},
journal= {arXiv preprint arXiv:2006.13988},
year = {2020}
}
Comments
In this update we present a revised version of the main theorem which now only deals with phase transitions in an interval $[\alpha,\infty)$ for some fixed $\alpha>0.$