English

The Quantum Eigenvalue Problem and Z-Eigenvalues of Tensors

Spectral Theory 2012-05-08 v1

Abstract

The quantum eigenvalue problem arises in the study of the geometric measure of the quantum entanglement. In this paper, we convert the quantum eigenvalue problem to the Z-eigenvalue problem of a real symmetric tensor. In this way, the theory and algorithms for Z-eigenvalues can be applied to the quantum eigenvalue problem. In particular, this gives an upper bound for the number of quantum eigenvalues. We show that the quantum eigenvalues appear in pairs, i.e., if a real number λ\lambda is a quantum eigenvalue of a square symmetric tensor Ψ\Psi, then λ-\lambda is also a quantum eigenvalue of Ψ\Psi. When Ψ\Psi is real, we show that the entanglement eigenvalue of Ψ\Psi is always greater than or equal to the Z-spectral radius of Ψ\Psi, and that in several cases the equality holds. We also show that the ratio between the entanglement eigenvalue and the Z-spectral radius of a real symmetric tensor is bounded above in a real symmetric tensor space of fixed order and dimension.

Keywords

Cite

@article{arxiv.1205.1342,
  title  = {The Quantum Eigenvalue Problem and Z-Eigenvalues of Tensors},
  author = {Xinzhen Zhang and Liqun Qi},
  journal= {arXiv preprint arXiv:1205.1342},
  year   = {2012}
}
R2 v1 2026-06-21T20:59:29.958Z