Decomposition of infinite-to-one factor codes and uniqueness of relative equilibrium states

Abstract

We show that an arbitrary factor map π:X Y on an irreducible subshift of finite type is a composition of a finite-to-one factor code and a class degree one factor code. Using this structure theorem on infinite-to-one factor codes, we then prove that any equilibrium state on Y for a potential function of sufficient regularity lifts to a unique measure of maximal relative entropy on X. This answers a question raised by Boyle and Petersen (for lifts of Markov measures) and generalizes the earlier known special case of finite-to-one factor codes.