Homoclinically expansive actions and a Garden of Eden theorem for harmonic models

Abstract

Let be a countable Abelian group and f ∈ [], where [] denotes the integral group ring of . Consider the Pontryagin dual Xf of the cyclic []-module []/[] f and suppose that f is weakly expansive (e.g., f is invertible in 1(), or, when is not virtually or 2, f is well-balanced) and that Xf is connected. We prove that if τ Xf Xf is a -equivariant continuous map, then τ is surjective if and only if the restriction of τ to each -homoclinicity class is injective. We also show that this equivalence remains valid in the case when = d and f ∈ [] = [u1,u1-1, …, ud, ud-1] is an irreducible atoral polynomial such that its zero-set Z(f) is contained in the image of the intersection of [0,1]d and a finite union of hyperplanes in d under the quotient map d d (e.g., when d ≥ 2 such that Z(f) is finite). These two results are analogues of the classical Garden of Eden theorem of Moore and Myhill for cellular automata with finite alphabet over .