The omega invariant of a matroid
Abstract
The third author introduced the g-polynomial gM(t) of a matroid, a covaluative matroid statistic which is unchanged under series and parallel extension. The g-polynomial of a rank r matroid M has the form g1 t + g2 t2 + ·s + gr tr. The coefficient g1 is Crapo's classical β-invariant. In this paper, we study the coefficient gr, which we term the ω-invariant of M. We show that, if M/F is connected for every proper flat F of M, and ω(N) is nonnegative for every minor N of M, then all the coefficients of gM(t) are nonnegative. We give several simplified versions of Ferroni's formula for ω(M), and compute ω(M) when r or |E(M)|-2r is small.
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