📝 SummarXiv

Abstract

We study the distributions of parts in random integer partitions subject to general arithmetic restrictions. In particular, we enumerate restricted graphical partitions of an even integer $n$ and identify the conditions under which the fraction of graphical partitions, relative to all restricted partitions, is maximal. We prove that this maximal fraction is asymptotically $O(n^{-1/2})$. Furthermore, for any set of arithmetic restrictions, we establish the existence of a minimal lower bound on the parts beyond which the influence of these restrictions on the fraction of graphical partitions becomes negligible; in this regime, the fraction depends primarily on the choice of this lower bound. We highlight a key example of partitions restricted to powers of 2, where the critical lower bound is found to be $\frac{1}{2}n^{\log2}+O(\log n)$.