On effective Birkhoff's ergodic theorem for computable actions of amenable groups

Abstract

We introduce computable actions of computable groups and prove the following versions of effective Birkhoff's ergodic theorem. Let be a computable amenable group, then there always exists a canonically computable tempered two-sided Flner sequence (Fn)n ≥ 1 in . For a computable, measure-preserving, ergodic action of on a Cantor space \0,1\ N endowed with a computable probability measure μ, it is shown that for every bounded lower semicomputable function f on \0,1\ N and for every Martin-L\"of random ω ∈ \0,1\ N the equality \[ n ∞ 1|Fn| Σg ∈ Fn f(g · ω) = ∫ f d μ \] holds, where the averages are taken with respect to a canonically computable tempered two-sided Flner sequence (Fn)n ≥ 1. We also prove the same identity for all lower semicomputable f's in the special case when is a computable group of polynomial growth and Fn:=B(n) is the Flner sequence of balls around the neutral element of .