The ratio monotonicity of Eulerian-type polynomials

Abstract

This paper is motivated by determining the location of modes of some unimodal Eulerian-type polynomials. The notion of ratio monotonicity was introduced by Chen-Xia when they investigated the q-derangement numbers. Let (fn(x))n≥slant 0 be a sequence of real polynomials satisfying the Eulerian-type recurrence relation fn+1(x)=(anx+bx+c)fn(x)+ax(1-x)ddxfn(x),~f0(x)=1, where a,b and c are nonnegative integers. Assume that deg fn(x)=n. Setting gn(x)=xnfn(1x), we have gn+1(x)=(anx+b+cx)gn(x)+ax(1-x)ddxgn(x), We find that if a+c≥slant b≥slant c>0, then fn(x) is bi-gamma-positive and gn(x) is ratio monotone. As applications, we discover the ratio monotonicity of several Eulerian-type polynomials, including the (exc,cyc) q-Eulerian polynomials, the 1/k-Eulerian polynomials, a kind of generalized Eulerian polynomials studied by Carlitz-Scoville, the (desB,neg) q-Eulerian polynomials over the hyperoctahedral group and the r-colored Eulerian polynomials. In particular, let An(x,q) be the (exc,cyc) q-Eulerian polynomials, we find that the polynomials xn-1An(1/x,q) are ratio monotone when 0<q≤slant 1, while An(x,q) are ratio monotone when 1≤slant q≤slant 2.