Homomorphisms from aperiodic subshifts to subshifts with the finite extension property

Abstract

Given a countable group G and two subshifts X and Y over G, a continuous, shift-commuting map φ : X Y is called a homomorphism. Our main result states that if every finitely generated subgroup of G has polynomial growth, X is aperiodic, and Y has the finite extension property (FEP), then there exists a homomorphism φ : X Y. By combining this theorem with a previous result of Bland, we obtain that if the same conditions hold, and if additionally the topological entropy of X is less than the topological entropy of Y and Y has no global period, then X embeds into Y. We also establish some facts about subshifts with the FEP that may be of independent interest.

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