2-Log-concavity of the Boros-Moll Polynomials

Abstract

The Boros-Moll polynomials Pm(a) arise in the evaluation of a quartic integral. It has been conjectured by Boros and Moll that these polynomials are infinitely log-concave. In this paper, we show that Pm(a) is 2-log-concave for any m≥ 2. Let di(m) be the coefficient of ai in Pm(a). We also show that the sequence \i (i+1)(di\,2(m)-di-1(m)di+1(m))\1≤ i ≤ m is log-concave. This leads another proof of Moll's minimum conjecture.