The inverse Z-polynomial of a matroid

Abstract

Motivated by the Z-polynomials of matroids, Ferroni, Matherne, Stevens, and Vecchi introduced the inverse Z-polynomial of a matroid. In this paper, we prove several fundamental properties of the inverse Z-polynomial, including non-negativity and multiplicativity, and show that it is a valuative invariant. We also provide explicit formulas for the inverse Z-polynomials of uniform matroids and a broader class of matroids, namely sparse paving matroids, which include uniform matroids as a special case. Furthermore, we establish the unimodality and log-concavity of these polynomials in the case of sparse paving matroids. Based on the properties of the Z-polynomial, we conjecture that the coefficients of the inverse Z-polynomial are unimodal and log-concave.