On Mex-related partition functions of Andrews and Newman

Abstract

The minimal excludant, or "mex" function, on a set S of positive integers is the least positive integer not in S. In a recent paper, Andrews and Newman extended the mex-function to integer partitions and found numerous surprising partition identities connected with these functions. Very recently, da Silva and Sellers present parity considerations of one of the families of functions Andrews and Newman studied, namely pt,t(n), and provide complete parity characterizations of p1,1(n) and p3,3(n). In this article, we study the parity of pt,t(n) when t=2α, 3· 2α for all α≥ 1. We prove that p2α,2α(n) and p3·2α, 3·2α(n) are almost always even for all α≥ 1. Using a result of Ono and Taguchi on nilpotency of Hecke operators, we also find infinite families of congruences modulo 2 satisfied by p2α,2α(n) and p3·2α, 3·2α(n) for all α≥ 1.