Expansion, divisibility and parity
Abstract
Let be a set of primes, where . Let . Let be such that . We show there exists a subset of density close to such that all the eigenvalues of the linear operator are . This bound is optimal up to a constant factor. In other words, we prove that a graph describing divisibility by primes is a strong local expander almost everywhere, and indeed within a constant factor of being "locally Ramanujan" (a.e.). Specializing to with the Liouville function, and using an estimate by Matom\"aki, Radziwi{\l}{\l} and Tao on the average of in short intervals, we derive that improving on a result of Tao's. We also prove that at almost all scales with a similar error term, improving on a result by Tao and Ter\"av\"ainen. (Tao and Tao-Ter\"av\"ainen followed a different approach, based on entropy, not expansion; significantly, we can take a much larger value of , and thus consider many more primes.) We can also prove sharper results with ease. For instance: let the set of all such that . Then, for any fixed value of with (that is, any "popular" value of ) the average of over is at almost all scales.
Cite
@article{arxiv.2103.06853,
title = {Expansion, divisibility and parity},
author = {Harald Andrés Helfgott and Maksym Radziwiłł},
journal= {arXiv preprint arXiv:2103.06853},
year = {2021}
}
Comments
Second version: 101 pages, 3 figures. Last section much expanded. Minor corrections