Convolution-type Identity for Characteristic Polynomials of Geometric Semilattices

Abstract

We establish a convolution formula for the characteristic polynomial of a finite geometric semilattice M: \[ χ(M,st)=ΣX∈ M sr- rkM(X)χ(MX,t)\,χ(M(X),s), \] where M denotes the centralization of M, and M(X) denotes the localization at X. This generalizes a nice formula of Southerland, Southern, and Zhou, which is recovered at s=1. When specialized to hyperplane arrangements, the identity yields a new expansion closely related to Wang's convolution formula. We further provide a combinatorial interpretation of the convolution formula using the finite field method over Fp2 and Fp.