Properties of Tensor Complementarity Problem and Some Classes of Structured Tensors

Abstract

This paper deals with the class of Q-tensors, that is, a Q-tensor is a real tensor A such that the tensor complementarity problem (, A): finding ∈ Rn such that ≥ \0, + Am-1 ≥ \0, and ( + Am-1) = 0, has a solution for each vector ∈ Rn. Several subclasses of Q-tensors are given: P-tensors, R-tensors, strictly semi-positive tensors and semi-positive R0-tensors. We prove that a nonnegative tensor is a Q-tensor if and only if all of its principal diagonal entries are positive, and so the equivalence of Q-tensor, R-tensors, strictly semi-positive tensors is showed if they are nonnegative tensors. We also show that a tensor is a R0-tensor if and only if the tensor complementarity problem (\0, A) has no non-zero vector solution, and a tensor is a R-tensor if and only if it is a R0-tensor and the tensor complementarity problem (, A) has no non-zero vector solution, where =(1,1·s,1).