A quadratic form generalization of rational dinv

Abstract

We introduce a quadratic form Q on the space of functions on the gap poset G of the numerical semigroup a,b. We prove combinatorially that when evaluated on the indicator function of an upward closed subset D, this quadratic form precisely recovers the Gorsky--Mazin dinv statistic of D, viewed as a Young subdiagram of G. Furthermore, we prove Theorem~1.2 that when evaluated on a pair of subdiagrams of G, the symmetric bilinear form associated with Q is equal to a novel cross-dinv statistic, which is nonnegative. Combining these, we prove the inequality \[ Q(n)≥ 1|G|\,\|n\|∞2\] if n is a real-valued decreasing function on G, showing an effective positive definiteness of Q on the corresponding cone. Theorem~1.2, the main engine of the paper, was autoformalized in Lean/Mathlib by AxiomProver.