English

Exact Limit Theorems for Restricted Integer Partitions

Number Theory 2021-04-07 v1 Combinatorics

Abstract

For a set of positive integers AA, let pA(n)p_A(n) denote the number of ways to write nn as a sum of integers from AA, and let p(n)p(n) denote the usual partition function. In the early 40s, Erd\H{o}s extended the classical Hardy--Ramanujan formula for p(n)p(n) by showing that AA has density α\alpha if and only if logpA(n)logp(αn)\log p_A(n) \sim \log p(\alpha n). Nathanson asked if Erd\H{o}s's theorem holds also with respect to AA's lower density, namely, whether AA has lower-density α\alpha if and only if logpA(n)/logp(αn)\log p_A(n) / \log p(\alpha n) has lower limit 11. We answer this question negatively by constructing, for every α>0\alpha > 0, a set of integers AA of lower density α\alpha, satisfying lim infnlogpA(n)logp(αn)(6πoα(1))log(1/α)  . \liminf_{n \rightarrow \infty} \frac{\log p_A(n)}{\log p(\alpha n)} \geq \left(\frac{\sqrt{6}}{\pi}-o_{\alpha}(1)\right)\log(1/\alpha)\;. We further show that the above bound is best possible (up to the oα(1)o_\alpha(1) term), thus determining the exact extremal relation between the lower density of a set of integers and the lower limit of its partition function. We also prove an analogous theorem with respect to the upper density of a set of integers, answering another question of Nathanson.

Keywords

Cite

@article{arxiv.2104.02692,
  title  = {Exact Limit Theorems for Restricted Integer Partitions},
  author = {Asaf Cohen Antonir and Asaf Shapira},
  journal= {arXiv preprint arXiv:2104.02692},
  year   = {2021}
}
R2 v1 2026-06-24T00:53:56.668Z