Infinite log-concavity and higher order Tur\'an inequality for the sequences of Speyer's g-polynomial of uniform matroids

Abstract

Let Un,d be the uniform matroid of rank d on n elements. Denote by gUn,d(t) the Speyer's g-polynomial of Un,d. The Tur\'an inequality and higher order Tur\'an inequality are related to the Laguerre-P\'olya (L-P) class of real entire functions, and the L-P class has close relation with the Riemann hypothesis. The Tur\'an type inequalities have received much attention. Infinite log-concavity is also a deep generalization of Tur\'an inequality with different direction. In this paper, we mainly obtain the infinite log-concavity and the higher order Tur\'an inequality of the sequence \gUn,d(t)\d=1n-1 for any t>0. In order to prove these results, we show that the generating function of gUn,d(t), denoted hn(x;t), has only real zeros for t>0. Consequently, for t>0, we also obtain the γ-positivity of the polynomial hn(x;t), the asymptotical normality of gUn,d(t), and the Laguerre inequalities for gUn,d(t) and hn(x;t).