Expansive actions of countable amenable groups, homoclinic pairs, and the Myhill property

Abstract

Let X be a compact metrizable space equipped with a continuous action of a countable amenable group G. Suppose that the dynamical system (X,G) is expansive and is the quotient by a uniformly bounded-to-one factor map of a strongly irreducible subshift. Let τ X X be a continuous map commuting with the action of G. We prove that if there is no pair of distinct G-homoclinic points in X having the same image under τ, then τ is surjective.