Coefficients of univariate Tutte polynomials with one variable fixed

Abstract

It is well known that the 2-variable Tutte polynomial of a graph G includes chromatic polynomial and flow polynomial of G, i.e. the cases of y=0 and x=0. In 2013, Kálmán introduced the interior and exterior polynomials which generalized the cases of y=1 and x=1 of Tutte polynomials of graphs to hypergraphs, and further polymatroids. There have been some results on coefficients of these polynomials, which motivate us to study uniformly the coefficients of TM(x,t) and TM(t,y), where TM(x,y) denotes the Tutte polynomial of a matroid M and t is a fixed real number. In this paper, we introduce two mutually dual parameters fk(M) and gk(M) (g1(M) is the girth of M) for any nonnegative integer k, and obtain the following results: (1) Formulas for coefficients of the higher-degree terms (related to g2(M) and f2(M), respectively) of TM(x,t) and TM(t,y) in terms of circuits and hyperplanes of M; (2) when 0≤ t ≤ 1, coefficients of the more higher-degree terms (related to g1(M) and f1(M), respectively) of TM(x,t) and TM(t,y) are further simplified and characterized; (3) As applications, some known results in the cases t=0 and t=1 are derived and generalized, and the unimodality of these coefficients in (1) are proved when t≤ 1.