Chow rings and augmented Chow rings of uniform matroids and their q-analogs

Abstract

We study the Hilbert series and the representations of Sn and GLn(Fq) on the (augmented) Chow rings of uniform matroids Ur,n and q-uniform matroids Ur,n(q). The Frobenius series for uniform matroids and their q-analogs are computed. As a byproduct, we recover Hameister, Rao, and Simpson's formula for the Hilbert series of Chow rings of q-uniform matroids in terms of permutations and further obtain their augmented counterpart in terms of decorated permutations. We also show that the equivariant Charney--Davis quantity of the (augmented) Chow ring of a matroid is nonnegative (i.e., a genuine representation of a group of automorphisms of the matroid). When the matroid is a uniform matroid and the group is Sn, the representation either vanishes or is a Foulkes representation (i.e., a Specht module of a ribbon shape). Specializing to the usual Charney--Davis quantities, we obtain an elegant combinatorial interpretation of Hameister, Rao, and Simpson's formula for Chow rings of q-uniform matroids and its augmented counterpart.