Log-Concavity in Powers of Infinite Series Close to (1-z)-1

Abstract

In this paper, we use the analytic method of Odlyzko and Richmond to study the log-concavity of power series. If f(z) = Σn anzn is an infinite series with an ≥ 1 and a0 + ·s + an = O(n + 1) for all n, we prove that a super-polynomially long initial segment of fk(z) is log-concave. Furthermore, if there exists constants C > 1 and α < 1 such that a0 + ·s + an = C(n + 1) - Rn where 0 ≤ Rn ≤ O((n + 1)α), we show that an exponentially long initial segment of fk(z) is log-concave. This resolves a conjecture proposed by Letong Hong and the author, which implies another conjecture of Heim and Neuhauser that the Nekrasov-Okounkov polynomials Qn(z) are unimodal for sufficiently large n.