Multivariable averaging on sparse sets

Abstract

Nonstandard ergodic averages can be defined for a measure-preserving action of a group on a probability space, as a natural extension of classical (nonstandard) ergodic averages. We extend the one-dimensional theory, obtaining L1 pointwise ergodic theorems for several kinds of nonstandard sparse group averages, with a special focus on the group Zd. Namely, we extend results for sparse block averages and sparse random averages to their analogues on virtually nilpotent groups, and extend Christ's result for sparse deterministic sequences to its analogue on Zd. The second and third results have two nontrivial variants on Zd: a "native" d-dimensional average and a "product" average from the 1-dimensional averages.