English

A Montgomery-Hooley theorem for the k-fold divisor function

Number Theory 2023-02-23 v1

Abstract

Let dk(n)d_k(n) denote the kk-fold divisor function. For a wide range of large qq the expected bound nxna(q)dk(n) main term x/q\sum_{n\leq x\atop {n\equiv a(q)}}d_k(n)-\text { main term }\approx \sqrt {x/q} is shown to be true in an average sense -- for all kk. This generalises the work of Pongsriiam and Vaughan [15] who studied k=2k=2, and answers the work of Rodgers and Soundararajan [17], who used the asymptotic large sieve to study a smoothed version of the problem. We use a circle method approach as developed by Goldston and Vaughan [7] to study the unsmoothed problem.

Keywords

Cite

@article{arxiv.2302.11045,
  title  = {A Montgomery-Hooley theorem for the k-fold divisor function},
  author = {Tomos Parry},
  journal= {arXiv preprint arXiv:2302.11045},
  year   = {2023}
}
R2 v1 2026-06-28T08:46:11.394Z