On the largest multilinear singular values of higher-order tensors

Abstract

Let σn denote the largest mode-n multilinear singular value of an I1×… × IN tensor T. We prove that σ12+…+σn-12+σn+12+…+σN2≤ (N-2)\| T\|2 + σn2, n=1,…,N, (1) where \|·\| denotes the Frobenius norm. We also show that at least for the cubic tensors the inverse problem always has a solution. Namely, for each σ1,…,σN that satisfy (1) and the trivial inequalities σ1≥ 1I\| T\|,…, σN≥ 1I\| T\|, there always exists an I× …× I tensor whose largest multilinear singular values are equal to σ1,…,σN. For N=3 we show that if the equality σ12+σ22= \| T\|2 + σ32 in (1) holds, then T is necessarily equal to a sum of multilinear rank-(L1,1,L1) and multilinear rank-(1,L2,L2) tensors and we give a complete description of all its multilinear singular values. We establish a connection with honeycombs and eigenvalues of the sum of two Hermitian matrices. This seems to give at least a partial explanation of why results on the joint distribution of multilinear singular values are scarce.