Inequalities among two rowed immanants of the q-Laplacian of Trees and Odd height peaks in generalized Dyck paths

Abstract

Let T be a tree on n vertices and let LqT be the q-analogue of its Laplacian. For a partition λ n, let the normalized immanant of LqT indexed by λ be denoted as dλ(LqT). A string of inequalities among dλ(LqT) is known when λ varies over hook partitions of n as the size of the first part of λ decreases. In this work, we show a similar sequence of inequalities when λ varies over two row partitions of n as the size of the first part of λ decreases. Our main lemma is an identity involving binomial coefficients and irreducible character values of Sn indexed by two row partitions. Our proof can be interpreted using the combinatorics of Riordan paths and our main lemma admits a nice probabilisitic interpretation involving peaks at odd heights in generalized Dyck paths or equivalently involving special descents in Standard Young Tableaux with two rows. As a corollary, we also get inequalities between dλ1(LqT1) and dλ2(LqT2) when T1 and T2 are comparable trees in the GTSn poset and when λ1 and λ2 are both two rowed partitions of n, with λ1 having a larger first part than λ2.