Powers of sequences and convergence of ergodic averages

Abstract

A sequence (sn) of integers is good for the mean ergodic theorem if for each invertible measure preserving system (X,B,μ,T) and any bounded measurable function f, the averages 1N Σn=1N f(Tsnx) converge in the L2 norm. We construct a sequence (sn) that is good for the mean ergodic theorem, but the sequence (sn2) is not. Furthermore, we show that for any set of bad exponents B, there is a sequence (sn) where (snk) is good for the mean ergodic theorem exactly when k is not in B. We then extend this result to multiple ergodic averages. We also prove a similar result for pointwise convergence of single ergodic averages.