English

The E-Eigenvectors of Tensors

Spectral Theory 2015-03-13 v1

Abstract

We first show that the eigenvector of a tensor is well-defined. The differences between the eigenvectors of a tensor and its E-eigenvectors are the eigenvectors on the nonsingular projective variety S={xPn    i=0nxi2=0}\mathbb S=\{\mathbf x\in\mathbb P^n\;|\;\sum\limits_{i=0}^nx_i^2=0\}. We show that a generic tensor has no eigenvectors on S\mathbb S. Actually, we show that a generic tensor has no eigenvectors on a proper nonsingular projective variety in Pn\mathbb P^n. By these facts, we show that the coefficients of the E-characteristic polynomial are algebraically dependent. Actually, a certain power of the determinant of the tensor can be expressed through the coefficients besides the constant term. Hence, a nonsingular tensor always has an E-eigenvector. When a tensor T\mathcal T is nonsingular and symmetric, its E-eigenvectors are exactly the singular points of a class of hypersurfaces defined by T\mathcal T and a parameter. We give explicit factorization of the discriminant of this class of hypersurfaces, which completes Cartwright and Strumfels' formula. We show that the factorization contains the determinant and the E-characteristic polynomial of the tensor T\mathcal T as irreducible factors.

Keywords

Cite

@article{arxiv.1303.2840,
  title  = {The E-Eigenvectors of Tensors},
  author = {Shenglong Hu and Liqun Qi},
  journal= {arXiv preprint arXiv:1303.2840},
  year   = {2015}
}

Comments

17 pages

R2 v1 2026-06-21T23:40:40.091Z