Towards Heim and Neuhauser's Unimodality Conjecture on the Nekrasov-Okounkov polynomials

Abstract

Let Qn(z) be the polynomials associated with the Nekrasov-Okounkov formula Σn≥ 1 Qn(z) qn := Πm = 1∞ (1 - qm)-z - 1. In this paper we partially answer a conjecture of Heim and Neuhauser, which asks if Qn(z) is unimodal, or stronger, log-concave for all n ≥ 1. Through a new recursive formula, we show that if An,k is the coefficient of zk in Qn(z), then An,k is log-concave in k for k n1/6/ n and monotonically decreasing for k n n. We also propose a conjecture that can potentially close the gap.