Gamma-positivity of variations of Eulerian polynomials

Abstract

An identity of Chung, Graham and Knuth involving binomial coefficients and Eulerian numbers motivates our study of a class of polynomials that we call binomial-Eulerian polynomials. These polynomials share several properties with the Eulerian polynomials. For one thing, they are h-polynomials of simplicial polytopes, which gives a geometric interpretation of the fact that they are palindromic and unimodal. A formula of Foata and Sch\"utzenberger shows that the Eulerian polynomials have a stronger property, namely γ-positivity, and a formula of Postnikov, Reiner and Williams does the same for the binomial-Eulerian polynomials. We obtain q-analogs of both the Foata-Sch\"utzenberger formula and an alternative to the Postnikov-Reiner-Williams formula, and we show that these q-analogs are specializations of analogous symmetric function identities. Algebro-geometric interpretations of these symmetric function analogs are presented.