English

Effective Bounds for the Andrews spt-function

Number Theory 2022-06-22 v3

Abstract

In this paper, we establish an asymptotic formula with an effective bound on the error term for the Andrews smallest parts function spt(n)\mathrm{spt}(n). We use this formula to prove recent conjectures of Chen concerning inequalities which involve the partition function p(n)p(n) and spt(n)\mathrm{spt}(n). Further, we strengthen one of the conjectures, and prove that for every ϵ>0\epsilon>0 there is an effectively computable constant N(ϵ)>0N(\epsilon) > 0 such that for all nN(ϵ)n\geq N(\epsilon), we have \begin{equation*} \frac{\sqrt{6}}{\pi}\sqrt{n}\,p(n)<\mathrm{spt}(n)<\left(\frac{\sqrt{6}}{\pi}+\epsilon\right) \sqrt{n}\,p(n). \end{equation*} Due to the conditional convergence of the Rademacher-type formula for spt(n)\mathrm{spt}(n), we must employ methods which are completely different from those used by Lehmer to give effective error bounds for p(n)p(n). Instead, our approach relies on the fact that p(n)p(n) and spt(n)\mathrm{spt}(n) can be expressed as traces of singular moduli.

Keywords

Cite

@article{arxiv.1706.01814,
  title  = {Effective Bounds for the Andrews spt-function},
  author = {Madeline Locus Dawsey and Riad Masri},
  journal= {arXiv preprint arXiv:1706.01814},
  year   = {2022}
}

Comments

Changed the title. Added more details and simplified some arguments in Section 3

R2 v1 2026-06-22T20:10:41.204Z