English

Expansion, divisibility and parity

Number Theory 2021-04-14 v2

Abstract

Let P[H0,H]\mathbf{P} \subset [H_0,H] be a set of primes, where logH0(logH)2/3+ϵ\log H_0 \geq (\log H)^{2/3 + \epsilon}. Let L=pP1/p\mathscr{L} = \sum_{p \in \mathbf{P}} 1/p. Let NN be such that logH(logN)1/2ϵ\log H \leq (\log N)^{1/2-\epsilon}. We show there exists a subset X(N,2N]\mathscr{X} \subset (N, 2N] of density close to 11 such that all the eigenvalues of the linear operator (AXf)(n)=pP:pnn,n±pXf(n±p)  pPn,n±pXf(n±p)p(A_{|\mathscr{X}} f)(n) = \sum_{\substack{p \in \mathbf{P} : p | n \\ n, n \pm p \in \mathscr{X}}} f(n \pm p) \; - \sum_{\substack{p \in\mathbf{P} \\ n, n \pm p \in \mathscr{X}}} \frac{f(n \pm p)}{p} are O(L)O(\sqrt{\mathscr{L}}). 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 f(n)=λ(n)f(n) = \lambda(n) with λ(n)\lambda(n) the Liouville function, and using an estimate by Matom\"aki, Radziwi{\l}{\l} and Tao on the average of λ(n)\lambda(n) in short intervals, we derive that 1logxnxλ(n)λ(n+1)n=O(1loglogx),\frac{1}{\log x} \sum_{n\leq x} \frac{\lambda(n) \lambda(n+1)}{n} = O\Big(\frac{1}{\sqrt{\log \log x}}\Big), improving on a result of Tao's. We also prove that N<n2Nλ(n)λ(n+1)=o(N)\sum_{N<n\leq 2 N} \lambda(n) \lambda(n+1)=o(N) 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 HH, and thus consider many more primes.) We can also prove sharper results with ease. For instance: let SN,kS_{N,k} the set of all N<n2NN<n\leq 2N such that Ω(n)=k\Omega(n) = k. Then, for any fixed value of kk with k=loglogN+O(loglogN)k = \log \log N + O(\sqrt{\log \log N}) (that is, any "popular" value of kk) the average of λ(n+1)\lambda(n+1) over SN,kS_{N,k} is o(1)o(1) at almost all scales.

Keywords

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

R2 v1 2026-06-24T00:01:09.899Z