Multiple recurrence and convergence results associated to   $\mathbb{F}_{p}^{\omega}$-actions

Vitaly Bergelson; Terence Tao; Tamar Ziegler

arXiv:1305.4717·math.DS·November 5, 2013·1 cites

Multiple recurrence and convergence results associated to $\mathbb{F}_{p}^{\omega}$-actions

Vitaly Bergelson, Terence Tao, Tamar Ziegler

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TL;DR

This paper establishes limit formulas for multiple ergodic averages in $\

Contribution

It introduces new limit formulas for $\

Findings

01

Proves multiple Khintchine-type recurrence results for $\

02

Provides counterexamples in the $\

03

Extends ergodic theorems to actions of $\

Abstract

Using an ergodic inverse theorem obtained in our previous paper, we obtain limit formulae for multiple ergodic averages associated with the action of $F_{p}^{ω}$ . From this we deduce multiple Khintchine-type recurrence results analogous to those for $Z$ -systems obtained by Bergelson, Host, and Kra, and also present some new counterexamples in this setting.

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Taxonomy

TopicsLimits and Structures in Graph Theory · Mathematical Dynamics and Fractals · Advanced Topology and Set Theory