On the Log-Concavity of Hilbert Series of Veronese Subrings and Ehrhart Series

Abstract

For every positive integer n, consider the linear operator n on polynomials of degree at most d with integer coefficients defined as follows: if we write h(t)(1 - t)d + 1 = Σm ≥ 0 g(m) tm, for some polynomial g(m) with rational coefficients, then nh(t)(1- t)d + 1 = Σm ≥ 0 g(nm) tm. We show that there exists a positive integer nd, depending only on d, such that if h(t) is a polynomial of degree at most d with nonnegative integer coefficients and h(0) ≥ 1, then for n ≥ nd, nh(t) has simple, real, strictly negative roots and positive, strictly log concave and strictly unimodal coefficients. Applications are given to Ehrhart δ-polynomials and unimodular triangulations of dilations of lattice polytopes, as well as Hilbert series of Veronese subrings of Cohen--MacCauley graded rings.