Separable symmetric tensors and separable anti-symmetric tensors

Abstract

In this paper, we first introduce the invertibility of even-order tensors and the separable tensors, including separable symmetry tensors and separable anti-symmetry tensors, defined respectively as the sum and the algebraic sum of rank-1 tensors generated by the tensor product of some vectors, say, v1, v2, …, vm. We show that the m! sumrands, each in form vσ(1)× vσ(2)×…× vσ(m), are linearly independent if v1,v2, …, vm are linearly independent, where σ is any permutation on 1,2,…,m. We offer a class of tensors to achieve the upper bound for (A) ≤ 6 for all A∈ R3× 3× 3. We also show that each 3× 3× 3 anti-symmetric tensor is separable.