Large p-core p'-partitions and walks on the additive residue graph

Abstract

This paper investigates partitions which have neither parts nor hook lengths divisible by p, referred to as p-core p'-partitions. We show that the largest p-core p'-partition corresponds to the longest walk on a graph with vertices \0, 1, …, p-1\ and labelled edges defined via addition modulo p. We also exhibit an explicit family of large p-core p'-partitions, giving a lower bound on the size of the largest such partition which is of the same degree as the upper bound found by McSpirit and Ono.

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