Multiple recurrence and large intersections for abelian group actions
Abstract
The purpose of this paper is to study the phenomenon of large intersections in the framework of multiple recurrence for measure-preserving actions of countable abelian groups. Among other things, we show: (1) If is a countable abelian group and are homomorphisms such that , , and have finite index in , then for every ergodic measure-preserving system , every set , and every , the set is syndetic. (2) If is a countable abelian group and are integers such that , , and have finite index in , then for every ergodic measure-preserving system , every set , and every , the set is syndetic. In particular, these extend and generalize results of Bergelson, Host, and Kra concerning -actions and of Bergelson, Tao, and Ziegler concerning -actions. Using an ergodic version of the Furstenberg correspondence principle, we obtain new combinatorial applications. We also discuss numerous examples shedding light on the necessity of the various hypotheses above. Our results lead to a number of interesting questions and conjectures, formulated in the introduction and at the end of the paper.
Cite
@article{arxiv.2101.02811,
title = {Multiple recurrence and large intersections for abelian group actions},
author = {Ethan Ackelsberg and Vitaly Bergelson and Andrew Best},
journal= {arXiv preprint arXiv:2101.02811},
year = {2021}
}
Comments
91 pages. Journal version