Twisted Recurrence via Polynomial Walks
Abstract
In this paper we show how polynomial walks can be used to establish a twisted recurrence for sets of positive density in . In particular, we prove that if is finitely generated by unipotents and acts irreducibly on , then for any set of positive density, there exists such that for any one can find with . Our method does not require the linearity of the action, and we prove a twisted recurrence for semigroups of maps from to satisfying some irreducibility and polynomial assumptions. As one of the consequences, we prove a non-linear analog of Bogolubov's theorem -- for any set of positive density, and , with and , there exists such that . Unlike the previous works on twisted recurrence that used recent results of Benoist-Quint and Bourgain-Furman-Lindenstrauss-Mozes on equidistribution of random walks on automorphism groups of tori, our method relies on the classical Weyl equidistribution for polynomial orbits on tori.
Cite
@article{arxiv.1706.07921,
title = {Twisted Recurrence via Polynomial Walks},
author = {Kamil Bulinski and Alexander Fish},
journal= {arXiv preprint arXiv:1706.07921},
year = {2017}
}
Comments
13 pages, 0 figures