Congruence of matrix spaces, matrix tuples, and multilinear maps

Abstract

Two matrix vector spaces V,W⊂ Cn× n are said to be equivalent if SVR=W for some nonsingular S and R. These spaces are congruent if R=ST. We prove that if all matrices in V and W are symmetric, or all matrices in V and W are skew-symmetric, then V and W are congruent if and only if they are equivalent. Let F: U×…× U V and G: U'×…× U' V' be symmetric or skew-symmetric k-linear maps over C. If there exists a set of linear bijections 1,…,k:U U' and :V V' that transforms F to G, then there exists such a set with 1=…=k.