English

P-Tensors, P$_0$-Tensors, and Tensor Complementarity Problem

Spectral Theory 2015-07-27 v1

Abstract

The concepts of P- and P0_0-matrices are generalized to P- and P0_0-tensors of even and odd orders via homogeneous formulae. Analog to the matrix case, our P-tensor definition encompasses many important classes of tensors such as the positive definite tensors, the nonsingular M-tensors, the nonsingular H-tensors with positive diagonal entries, the strictly diagonally dominant tensors with positive diagonal entries, etc. As even-order symmetric PSD tensors are exactly even-order symmetric P0_0-tensors, our definition of P0_0-tensors, to some extent, can be regarded as an extension of PSD tensors for the odd-order case. Along with the basic properties of P- and P0_0-tensors, the relationship among P0_0-tensors and other extensions of PSD tensors are then discussed for comparison. Many structured tensors are also shown to be P- and P0_0-tensors. As a theoretical application, the P-tensor complementarity problem is discussed and shown to possess a nonempty and compact solution set.

Keywords

Cite

@article{arxiv.1507.06731,
  title  = {P-Tensors, P$_0$-Tensors, and Tensor Complementarity Problem},
  author = {Weiyang Ding and Ziyan Luo and Liqun Qi},
  journal= {arXiv preprint arXiv:1507.06731},
  year   = {2015}
}
R2 v1 2026-06-22T10:17:37.653Z