Determinants of incidence and Hessian matrices arising from the vector space lattice

Abstract

Let V=i=0nVi be the lattice of subspaces of the n-dimensional vector space over the finite field Fq and let A be the graded Gorenstein algebra defined over Q which has V as a Q basis. Let F be the Macaulay dual generator for A. We compute explicitly the Hessian determinant |∂ 2F∂ Xi ∂ Xj| evaluated at the point X1 = X2 = ·s = XN=1 and relate it to the determinant of the incidence matrix between V1 and Vn-1. Our exploration is motivated by the fact that both of these matrices arise naturally in the study of the Sperner property of the lattice and the Lefschetz property for the graded Artinian Gorenstein algebra associated to it.