Unimodality of the Andrews-Garvan-Dyson cranks of partitions

Abstract

The main objective of this paper is to investigate the distribution of the Andrews-Garvan-Dyson crank of a partition. Let M(m,n) denote the number of partitions of n with the Andrews-Garvan-Dyson crank m, we show that the sequence \M(m,n)\|m|≤ n-1 is unimodal for n≥ 44. It turns out that the unimodality of \M(m,n)\|m|≤ n-1 is related to the monotonicity properties of two partition functions pk(n) and ppk(n). Let pk(n) denote the number of partitions of n with at most k parts such that the largest part appears at least twice and let ppk(n) denote the number of pairs (α,β) of partitions of n, where α is a partition counted by pk(i) and β is a partition counted by pk+1(n-i) for 0≤ i≤ n. We show that pk(n)≥ pk(n-1) for k≥ 5 and n≥ 14 and ppk(n)≥ ppk(n-1) for k≥ 3 and n≥ 2. With the aid of the monotonicity properties on pk(n) and ppk(n), we show that M(m,n)≥ M(m,n-1) for n≥ 14 and 0≤ m ≤ n-2 and M(m-1,n)≥ M(m,n) for n≥ 44 and 1≤ m≤ n-1. By means of the symmetry M(m,n)=M(-m,n), we find that M(m-1,n)≥ M(m,n) for n≥ 44 and 1≤ m≤ n-1 implies that the sequence \M(m,n)\|m|≤ n-1 is unimodal for n≥ 44. We also give a proof of an upper bound for ospt(n) conjectured by Chan and Mao in light of the inequality M(m-1,n)≥ M(m,n) for n≥ 44 and 0≤ m≤ n-1.