Ergodic Theorems for coset spaces
Abstract
We study in this paper the validity of the mean ergodic theorem along \emph{left} F\o lner sequences in a countable amenable group . Although the \emph{weak} ergodic theorem always holds along \emph{any} left F\o lner sequence in , we provide examples where the \emph{mean} ergodic theorem fails in quite dramatic ways. On the other hand, if does not admit any ICC quotients, e.g. if is virtually nilpotent, then we prove that the mean ergodic theorem does indeed hold along \emph{any} left F\o lner sequence. In the case when a unitary representation of a countable amenable group is induced from a unitary representation of a "sufficiently thin" subgroup, we prove that the mean ergodic theorem holds along any left F\o lner sequence for this representation. Furthermore, we show that every countable (infinite) amenable group embeds into a countable group which admits a unitary representation with the property that for any left F\o lner sequence in , there exists a sequence in such that the mean (but \emph{not} the weak) ergodic theorem fails for this representation along the sequence . Finally, we provide examples of countable (not necessarily amenable) groups with proper, infinite-index subgroups , so that the \emph{pointwise} ergodic theorem holds for averages along \emph{any} strictly increasing and nested sequence of finite subsets of the coset .
Keywords
Cite
@article{arxiv.1408.6692,
title = {Ergodic Theorems for coset spaces},
author = {Michael Björklund and Alexander Fish},
journal= {arXiv preprint arXiv:1408.6692},
year = {2014}
}
Comments
29 pages, no figures. Comments are welcome!