The omega invariant of a matroid

The third author introduced the $g$-polynomial $g_M(t)$ 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 $g_1 t + g_2 t^2 + \cdots + g_r t^r$. The coefficient $g_1$ is Crapo’s classical $β$-invariant. In this paper, we study the coefficient $g_r$, 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 $g_M(t)$ 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.

💡 Research Summary

The paper “The omega invariant of a matroid” investigates the last coefficient of the g‑polynomial introduced by the third author in earlier work. For a matroid (M) of rank (r) the g‑polynomial is a covaluative invariant of the form
\