Interlacing Polynomials and the Veronese Construction for Rational Formal Power Series

Abstract

Fixing a positive integer r and 0 k r-1, define f r,k for every formal power series f as f(x) = f r,0 (xr)+xf r,1 (xr)+ ·s +xr-1f r,r-1 (xr). Jochemko recently showed that the polynomial Unr,k\, h(x) := ( (1+x+·s+xr-1)n h(x) ) r,k has only nonpositive zeros for any r h(x) -k and any positive integer n. As a consequence, Jochemko confirmed a conjecture of Beck and Stapledon on the Ehrhart polynomial h(x) of a lattice polytope of dimension n, which states that Unr,0\,h(x) has only negative, real zeros whenever r n. In this paper, we provide an alternative approach to Beck and Stapledon's conjecture by proving the following general result: if the polynomial sequence ( h r,r-i (x))1 i r is interlacing, so is ( Unr,r-i\, h(x) )1 i r. Our result has many other interesting applications. In particular, this enables us to give a new proof of Savage and Visontai's result on the interlacing property of some refinements of the descent generating functions for colored permutations. Besides, we derive a Carlitz identity for refined colored permutations.