On the product of the singular values of a binary tensor

Abstract

A real binary tensor consists of 2d real entries arranged into hypercube format 2× d. For d=2, a real binary tensor is a 2× 2 matrix with two singular values. Their product is the determinant. We generalize this formula for any d 2. Given a partition μ d and a μ-symmetric real binary tensor t, we study the distance function from t to the variety Xμ,R of μ-symmetric real binary tensors of rank one. The study of the local minima of this function is related to the computation of the singular values of t. Denoting with Xμ the complexification of Xμ,R, the Euclidean Distance polynomial EDpolyXμ,t(ε2) of the dual variety of Xμ at t has among its roots the singular values of t. On one hand, the lowest coefficient of EDpolyXμ,t(ε2) is the square of the μ-discriminant of t times a product of sum of squares polynomials. On the other hand, we describe the variety of μ-symmetric binary tensors that do not admit the maximum number of singular values, counted with multiplicity. Finally, we compute symbolically all the coefficients of EDpolyXμ,t(ε2) for tensors of format 2× 2× 2.