Multiplicity of measures under factor codes and class degree joinings

Abstract

Given a finite-to-one factor code π: X Y between irreducible sofic shifts and an ergodic on Y with full support, it is known that the fiber π-1*() has at most dπ ergodic measures in it where dπ is the degree of π. We introduce the notion of multiplicity for ergodic measures on X (that depends on π) and we prove that dπ is the sum of the multiplicity of μ where μ runs over the ergodic measures in π-1*(). We also build an appropriate generalization to infinite-to-one factor codes in relation to class degree and relatively maximal measures. We also define the notion of degree joining (for finite-to-one factor codes) and class degree joining (for infinite-to-one factor codes) which are the main tool for establishing our results