Pointwise convergence of ergodic averages of bounded measurable functions for amenable groups

Abstract

Given any amenable group G (with a left Haar measure |·| or dg), we can select out a F subnet \Fθ,θ∈\ from any left Flner net in G, which is L∞-admissible, namely, for any Borel G-space (X,X) and any ∈ L∞(X,X), gather* θ∈1|Fθ|∫Fθ(gx)dg=*(x)\ ∀ x∈ X and *=(g)*\ ∀ g∈ G. gather* Moreover, if G is σ-compact such as a locally compact second countable Hausdorff amenable group, then *∈ L∞(X,X), *(gx)=*(x) a.e., and * is a.e. independent of the choice of the admissible Flner net \Fθ,θ∈\ in G. Consequently, we may easily obtain the ergodic disintegration of invariant probability measures for any σ-compact amenable group acting Borel on a compact metric space X by continuous transformations of X, and the existence of σ-finite invariant Radon measures for any Borel action of an amenable group on a locally compact, σ-compact, metric space X by continuous maps of X, and a L∞-pointwise multiple ergodic theorem.