English

Squarefree Integers in Arithmetic Progressions to Smooth Moduli

Number Theory 2023-06-22 v2

Abstract

Let ϵ>0\epsilon > 0 be sufficiently small and let 0<η<1/5220 < \eta < 1/522. We show that if XX is large enough in terms of ϵ\epsilon then for any squarefree integer qX196/261ϵq \leq X^{196/261-\epsilon} that is XηX^{\eta}-smooth one can obtain an asymptotic formula with power-saving error term for the number of squarefree integers in an arithmetic progression a(modq)a \pmod{q}, with (a,q)=1(a,q) = 1. In the case of squarefree, smooth moduli this improves upon previous work of Nunes, in which 196/261=0.75096...196/261 = 0.75096... was replaced by 25/36=0.694ˉ25/36 = 0.69\bar{4}. This also establishes a level of distribution for a positive density set of moduli that improves upon a result of Hooley. We show more generally that one can break the X3/4X^{3/4}-barrier for a density 1 set of XηX^{\eta}-smooth moduli qq (without the squarefree condition). Our proof appeals to the qq-analogue of the van der Corput method of exponential sums, due to Heath-Brown, to reduce the task to estimating correlations of certain Kloosterman-type complete exponential sums modulo prime powers. In the prime case we obtain a power-saving bound via a cohomological treatment of these complete sums, while in the higher prime power case we establish savings of this kind using pp-adic methods.

Keywords

Cite

@article{arxiv.2008.11163,
  title  = {Squarefree Integers in Arithmetic Progressions to Smooth Moduli},
  author = {Alexander P. Mangerel},
  journal= {arXiv preprint arXiv:2008.11163},
  year   = {2023}
}

Comments

44 pages; referee comments incorporated. Forum Math. Sigma (to appear)

R2 v1 2026-06-23T18:05:52.541Z