The counting matrix of a simplicial complex

Abstract

For a finite abstract simplicial complex G with n sets, define the n x n matrix K(x,y) which is the number of subsimplices in the intersection of x and y. We call it the counting matrix of G. Similarly as the connection matrix L which is L(x,y)=1 if x and y intersect and 0 else, the counting matrix K is unimodular. Actually, K is always in SL(n,Z). The inverse of K has the Green function entries K(-1)(x,y)=w(x) w(y) |W+(x) intersected W+y|, where W+(x) is the star of x, the sets in G which contain x and w(x)=(-1)dim(x). The matrix K is always positive definite. The spectra of K and K(-1) always agree so that the matrix Q=K-K(-1) has the spectral symmetry spec(Q)=-spec(Q) and the zeta function z(s) summing l(k)(-s) with eigenvalues l(k) of K satisfies the functional equation z(a+ib)=z(-a+ib). The energy theorem in this case tells that the sum of the matrix elements of K(-1)(x,y) is equal to the number sets in G. In comparison, we had in the connection matrix case the identity that the sum of the matrix elements of L(-1) is the Euler characteristic of G.