Two equalities expressing the determinant of a matrix in terms of expectations over matrix-vector products

Abstract

We introduce two equations expressing the inverse determinant of a full rank matrix A ∈ Rn × n in terms of expectations over matrix-vector products. The first relationship is |det (A)|-1 = Es Sn-1[\, As-n ], where expectations are over vectors drawn uniformly on the surface of an n-dimensional radius one hypersphere. The second relationship is |det(A)|-1 = Ex q[\,p(Ax) /\, q(x)], where p and q are smooth distributions, and q has full support.