A Probabilistic Characterization of the Dominance Order on Partitions

Abstract

A probabilistic characterization of the dominance partial order on the set of partitions is presented. This extends work in "Symmetric polynomials and symmetric mean inequalities". Electron. J. Combin., 20(3): Paper 34, 2013. Let n be a positive integer and let be a partition of n. Let F be the Ferrers diagram of . Let m be a positive integer and let p ∈ (0,1). Fill each cell of F with balls, the number of which is independently drawn from the random variable X = Bin(m,p). Given non-negative integers j and t, let P(,j,t) be the probability that the total number of balls in F is j and that no row of F contains more that t balls. We show that if and μ are partitions of n, then dominates μ, i.e. Σi=1k (i) ≥ Σi=1k μ(i) for all positive integers k, if and only if P(,j,t) ≤ P(μ,j,t) for all non-negative integers j and t. It is also shown that this same result holds when X is replaced by any one member of a large class of random variables. Let p = \pn\n=0∞ be a sequence of real numbers. Let Tp be the N by N matrix with ( Tp)i,j = pj-i for all i, j ∈ N where we take pn = 0 for n < 0. Let (pi)j be the coefficient of xj in (p(x))i where p(x) = Σn=0∞ pn xn and p0(x) =1. Let Sp be the N by N matrix with ( Sp)i,j = (pi)j for all i, j ∈ N. We show that if Tp is totally non-negative of order k then so is Sp. The case k=2 of this result is a key step in the proof of the result on domination. We also show that the case k=2 would follow from a combinatorial conjecture that might be of independent interest.