Mixing for progressions in non-abelian groups
Abstract
We study the mixing properties of progressions , of length three and four in a model class of finite non-abelian groups, namely the special linear groups over a finite field , with bounded. For length three progressions , we establish a strong mixing property (with error term that decays polynomially in the order of ), which among other things counts the number of such progressions in any given dense subset of , answering a question of Gowers for this class of groups. For length four progressions , we establish a partial result in the case if the shift is restricted to be diagonalisable over the field, although in this case we do not recover polynomial bounds in the error term. Our methods include the use of the Cauchy-Schwarz inequality, the abelian Fourier transform, the Lang-Weil bound for the number of points in an algebraic variety over a finite field, some algebraic geometry, and (in the case of length four progressions) the multidimensional Szemer\'edi theorem.
Cite
@article{arxiv.1212.2586,
title = {Mixing for progressions in non-abelian groups},
author = {Terence Tao},
journal= {arXiv preprint arXiv:1212.2586},
year = {2013}
}
Comments
31 pages, no figures, to appear, Forum of Mathematics, Sigma. Referee suggestions incorporated