Topological entropy of sets of generic points for actions of amenable groups

Abstract

Let G be a countable discrete amenable group which acts continuously on a compact metric space X and let μ be an ergodic G-invariant Borel probability measure on X. For a fixed tempered Flner sequence \Fn\ in G with n→+∞|Fn| n=∞, we prove the following variational principle: hB(Gμ,\Fn\)=hμ(X,G), where Gμ is the set of generic points for μ with respect to \Fn\ and hB(Gμ,\Fn\) is the Bowen topological entropy (along \Fn\) on Gμ. This generalizes the classical result of Bowen in 1973.