Asymptotic pairs in topological actions of amenable groups

Abstract

We provide a definition of a -asymptotic pair in a topological action of a countable group G, where is an order on G of type Z. We then prove that if G is a countable amenable group and (X,G) is a topological G-action of positive entropy, then for every multiorder ( O,,G) and -almost every order \,∈ O there exists a -asympotic pair in X. This result is a generalization of the Blanchard-Host-Ruette Theorem for classical topological dynamical systems (actions of~ Z). We also prove that for every countable amenable group G, and every multiorder on G arising from a tiling system, every topological G-action of entropy zero has an extension which has no -asymptotic pairs for any belonging to this multiorder. Together, these two theorems give a characterization of topological G-actions of entropy zero: (X,G) has topological entropy zero if and only if, for any multiorder O T on G arising from a tiling system of entropy zero, there exists an extension (Y,G) of (X,G), which has no -asymptotic pairs for any \,∈ O T, equivalently, there exists a multiorder ( O,,G) on G, such that for -almost any \,∈ O, there are no -asymptotic pairs in (Y,G).