Related papers: Singular-Value Statistics of Non-Hermitian Random Matrices and Open Quantum Systems

Singular-Value Statistics of Non-Hermitian Random Matrices and Open Quantum Systems

URL: http://arxiv.org/abs/2307.08218v2
Date: Wed, 18 Oct 2023 14:34:59 GMT
Title: Singular-Value Statistics of Non-Hermitian Random Matrices and Open Quantum Systems
Authors: Kohei Kawabata, Zhenyu Xiao, Tomi Ohtsuki, Ryuichi Shindou
Abstract summary: We show that singular values of open quantum many-body systems follow the random-matrix statistics. Our work elucidates that the singular-value statistics serve as a clear indicator of symmetry and lay a foundation for statistical physics of open quantum systems.
Score: 4.794899293121226
License: http://arxiv.org/licenses/nonexclusive-distrib/1.0/
Abstract: The spectral statistics of non-Hermitian random matrices are of importance as a diagnostic tool for chaotic behavior in open quantum systems. Here, we investigate the statistical properties of singular values in non-Hermitian random matrices as an effective measure of quantifying dissipative quantum chaos. By means of Hermitization, we reveal the unique characteristics of the singular-value statistics that distinguish them from the complex-eigenvalue statistics, and establish the comprehensive classification of the singular-value statistics for all the 38-fold symmetry classes of non-Hermitian random matrices. We also analytically derive the singular-value statistics of small random matrices, which well describe those of large random matrices in the similar spirit to the Wigner surmise. Furthermore, we demonstrate that singular values of open quantum many-body systems follow the random-matrix statistics, thereby identifying chaos and nonintegrability in open quantum systems. Our work elucidates that the singular-value statistics serve as a clear indicator of symmetry and lay a foundation for statistical physics of open quantum systems.

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