An analytic version of stable arithmetic regularity
Abstract
We prove a structure theorem for stable functions on amenable groups, which extends the arithmetic regularity lemma for stable subsets of finite groups. Given a group , a function is called stable if the binary function is stable in the sense of continuous logic. Roughly speaking, our main result says that if is amenable, then any stable function on is almost constant on all translates of a unitary Bohr neighborhood in of bounded complexity. The proof uses ingredients from topological dynamics and continuous model theory. We also prove several applications which generalize results in arithmetic combinatorics to nonabelian groups.
Cite
@article{arxiv.2401.14363,
title = {An analytic version of stable arithmetic regularity},
author = {Gabriel Conant and Anand Pillay},
journal= {arXiv preprint arXiv:2401.14363},
year = {2024}
}
Comments
28 pages; substantial changes to first version; the previous subsection 4.3 (on applications) has been turned into Section 5 and expanded significantly