Interlacing property of a family of generating polynomials over Dyck paths

Abstract

In the study of a tantalizing symmetry on Catalan objects, B\'ona et al. introduced a family of polynomials \Wn,k(x)\n≥ k≥ 0 defined by align* Wn,k(x)=Σm=0kwn,k,mxm, align* where wn,k,m counts the number of Dyck paths of semilength n with k occurrences of UD and m occurrences of UUD. They proposed two conjectures on the interlacing property of these polynomials, one of which states that \Wn,k(x)\n≥ k is a Sturm sequence for any fixed k≥ 1, and the other states that \Wn,k(x)\1≤ k≤ n is a Sturm-unimodal sequence for any fixed n≥ 1. In this paper, we obtain certain recurrence relations for Wn,k(x), and further confirm their conjectures.