Random Sequences and Pointwise Convergence of Multiple Ergodic Averages

Abstract

We prove pointwise convergence, as N ∞, for the multiple ergodic averages 1NΣn=1N f(Tnx)· g(Sanx), where T and S are commuting measure preserving transformations, and an is a random version of the sequence [nc] for some appropriate c>1. We also prove similar mean convergence results for averages of the form 1NΣn=1N f(Tanx)· g(Sanx), as well as pointwise results when T and S are powers of the same transformation. The deterministic versions of these results, where one replaces an with [nc], remain open, and we hope that our method will indicate a fruitful way to approach these problems as well.