Approximate lattices and S-adic linear groups
Abstract
We provide and motivate in this paper a natural framework for the study of approximate lattices. Namely, we consider approximate lattices in so-called -adic linear groups and define relevant notions of arithmeticity. We also adapt to this framework classical results of the theory of lattices and Meyer sets. Results from this paper will play a role in the proof of a structure theorem for approximate lattices in -adic linear groups which is the subject of a companion paper. We extend a theorem of Schreiber's concerning the coarse structure of approximate subgroups in Euclidean spaces to approximate subgroups of unipotent -adic groups. We generalise Meyer's structure theorem for approximate lattices in locally compact abelian groups to a precise structure theorem for approximate lattices in unipotent -adic groups. Finally, we study intersections of approximate lattices of -adic linear groups with certain subgroups such as the nilpotent radical and Levi subgroups. We furthermore show that the framework of -adic linear groups enables us to provide statements more precise than earlier results.
Keywords
Cite
@article{arxiv.2310.10246,
title = {Approximate lattices and S-adic linear groups},
author = {Simon Machado},
journal= {arXiv preprint arXiv:2310.10246},
year = {2023}
}
Comments
28 pages; comments welcome! This paper is adapted from one part of the former version of arXiv:2306.09899 that has now been cut into three