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A Central Limit Theorem for Integer Partitions into Small Powers

Number Theory 2024-01-05 v2 Combinatorics

Abstract

The study of the well-known partition function p(n)p(n) counting the number of solutions to n=a1++an = a_{1} + \dots + a_{\ell} with integers 1a1a1 \leq a_{1} \leq \dots \leq a_{\ell} has a long history in combinatorics. In this paper, we study a variant, namely partitions of integers into \begin{equation*} n=\lfloor a_1^\alpha\rfloor + \cdots + \lfloor a_\ell^\alpha\rfloor \end{equation*} with 1a1<<a1\leq a_1 < \cdots < a_\ell and some fixed 0<α<10 < \alpha < 1. In particular, we prove a central limit theorem for the number of summands in such partitions, using the saddle point method.

Keywords

Cite

@article{arxiv.2204.05592,
  title  = {A Central Limit Theorem for Integer Partitions into Small Powers},
  author = {Gabriel F. Lipnik and Manfred G. Madritsch and Robert F. Tichy},
  journal= {arXiv preprint arXiv:2204.05592},
  year   = {2024}
}

Comments

17 pages

R2 v1 2026-06-24T10:45:27.858Z