Ubiquity of entropies of intermediate factors

Abstract

We consider topological dynamical systems (X,T), where X is a compact metrizable space and T denotes an action of a countable amenable group G on X by homeomorphisms. For two such systems (X,T) and (Y,S) and a factor map π : X → Y, an intermediate factor is a topological dynamical system (Z,R) for which π can be written as a composition of factor maps : X → Z and : Z → Y. In this paper we show that for any countable amenable group G, for any G-subshifts (X,T) and (Y,S), and for any factor map π :X → Y, the set of entropies of intermediate subshift factors is dense in the interval [h(Y,S), h(X,T)]. As a corollary, we also prove that if (X,T) and (Y,S) are zero-dimensional G-systems, then the set of entropies of intermediate zero-dimensional factors is equal to the interval [h(Y,S), h(X,T)]. Our proofs rely on a generalized Marker Lemma that may be of independent interest.