A new characterization of symmetric H+-tensors and M-tensors

Abstract

In this work, we present a new characterization of symmetric H+-tensors. It is known that a symmetric tensor is an H+-tensor if and only if it is a generalized diagonally dominant tensor with nonnegative diagonal elements. By exploring the diagonal dominance property, we derive new necessary and sufficient conditions for a symmetric tensor to be an H+-tensor. Based on these conditions, we propose a novel method that allows to check if a tensor is a symmetric H+-tensor in polynomial time. Moreover, these results can be applied to the closely related and important class of M-tensors. In particular, this allows to efficiently compute the minimum H-eigenvalue of symmetric M-tensors. Furthermore, we show how this latter result can be used to provide tighter lower bounds for the minimum H-eigenvalue of the Fan product of two symmetric M-tensors.