Tensor Complementarity Problem and Semi-positive Tensors

Abstract

The tensor complementarity problem (, A) is to find ∈ Rn such that ≥ \0, + Am-1 ≥ \0, and ( + Am-1) = 0. We prove that a real tensor A is a (strictly) semi-positive tensor if and only if the tensor complementarity problem (, A) has a unique solution for >\0 (≥\0), and a symmetric real tensor is a (strictly) semi-positive tensor if and only if it is (strictly) copositive. That is, for a strictly copositive symmetric tensor A, the tensor complementarity problem (, A) has a solution for all ∈ Rn.