Related papers: Level statistics of real eigenvalues in non-Hermitian systems

Level statistics of real eigenvalues in non-Hermitian systems

URL: http://arxiv.org/abs/2207.01826v2
Date: Wed, 9 Nov 2022 12:20:33 GMT
Title: Level statistics of real eigenvalues in non-Hermitian systems
Authors: Zhenyu Xiao, Kohei Kawabata, Xunlong Luo, Tomi Ohtsuki, Ryuichi Shindou
Abstract summary: We show that time-reversal symmetry and pseudo-Hermiticity lead to universal level statistics of non-Hermitian random matrices. These results serve as effective tools for detecting quantum chaos, many-body localization, and real-complex transitions in non-Hermitian systems with symmetries.
Score: 3.7448613209842962
License: http://creativecommons.org/licenses/by/4.0/
Abstract: Symmetries associated with complex conjugation and Hermitian conjugation, such as time-reversal symmetry and pseudo-Hermiticity, have great impact on eigenvalue spectra of non-Hermitian random matrices. Here, we show that time-reversal symmetry and pseudo-Hermiticity lead to universal level statistics of non-Hermitian random matrices on and around the real axis. From the extensive numerical calculations of large random matrices, we obtain the five universal level-spacing and level-spacing-ratio distributions of real eigenvalues, each of which is unique to the symmetry class. Furthermore, we analyse spacings of real eigenvalues in physical models, such as bosonic many-body systems and free fermionic systems with disorder and dissipation. We clarify that the level spacings in ergodic (metallic) phases are described by the universal distributions of non-Hermitian random matrices in the same symmetry classes, while the level spacings in many-body localized and Anderson localized phases show the Poisson statistics. We also find that the number of real eigenvalues shows distinct scalings in the ergodic and localized phases in these symmetry classes. These results serve as effective tools for detecting quantum chaos, many-body localization, and real-complex transitions in non-Hermitian systems with symmetries.

Related papers

Exceptional Points and Stability in Nonlinear Models of Population Dynamics having $\mathcal{PT}$ symmetry [49.1574468325115]
We analyze models governed by the replicator equation of evolutionary game theory and related Lotka-Volterra systems of population dynamics. We study the emergence of exceptional points in two cases: (a) when the governing symmetry properties are tied to global properties of the models, and (b) when these symmetries emerge locally around stationary states.
arXiv Detail & Related papers (2024-11-19T02:15:59Z)
Hierarchical analytical approach to universal spectral correlations in Brownian Quantum Chaos [44.99833362998488]
We develop an analytical approach to the spectral form factor and out-of-time ordered correlators in zero-dimensional Brownian models of quantum chaos.
arXiv Detail & Related papers (2024-10-21T10:56:49Z)
Universal hard-edge statistics of non-Hermitian random matrices [4.794899293121226]
We investigate the impact of symmetry on the level statistics around the spectral origin. Within this classification, we discern 28 symmetry classes characterized by distinct hard-edge statistics. We study various open quantum systems in different symmetry classes, including quadratic and many-body Lindbladians.
arXiv Detail & Related papers (2024-01-10T10:05:34Z)
Universality of spectral fluctuations in open quantum chaotic systems [1.1557918404865375]
We study the non-Hermitian and non-unitary ensembles based on the symmetry of matrix elements. We show that the fluctuation statistics of these ensembles are universal and quantum chaotic systems belonging to OE, UE, and SE.
arXiv Detail & Related papers (2024-01-08T18:30:18Z)
Spectral fluctuations of multiparametric complex matrix ensembles: evidence of a single parameter dependence [0.0]
We numerically analyze the spectral statistics of the multiparametric Gaussian ensembles of complex matrices with zero mean and variances with different decay routes away from the diagonals. Such ensembles can serve as good models for a wide range of phase transitions e.g. localization to delocalization in non-Hermitian systems or Hermitian to non-Hermitian one.
arXiv Detail & Related papers (2023-12-13T15:21:35Z)
Degeneracies and symmetry breaking in pseudo-Hermitian matrices [0.0]
We classify the eigenspace of pseudo-Hermitian matrices. We show that symmetry breaking occurs if and only if eigenvalues of opposite kinds on the real axis of the complex eigenvalue plane.
arXiv Detail & Related papers (2022-09-14T19:18:53Z)
Simultaneous Transport Evolution for Minimax Equilibria on Measures [48.82838283786807]
Min-max optimization problems arise in several key machine learning setups, including adversarial learning and generative modeling. In this work we focus instead in finding mixed equilibria, and consider the associated lifted problem in the space of probability measures. By adding entropic regularization, our main result establishes global convergence towards the global equilibrium.
arXiv Detail & Related papers (2022-02-14T02:23:16Z)
Deformed Symmetry Structures and Quantum Many-body Scar Subspaces [12.416248333306237]
A quantum many-body scar system usually contains a special non-thermal subspace decoupled from the rest of the Hilbert space. We propose a general structure called deformed symmetric spaces for the decoupled subspaces hosting quantum many-body scars.
arXiv Detail & Related papers (2021-08-17T18:00:02Z)
Information retrieval and eigenstates coalescence in a non-Hermitian quantum system with anti-$\mathcal{PT}$ symmetry [15.273168396747495]
Non-Hermitian systems with parity-time reversal ($mathcalPT$) or anti-$mathcalPT$ symmetry have attracted a wide range of interest owing to their unique characteristics and counterintuitive phenomena. We implement a Floquet Hamiltonian of a single qubit with anti-$mathcalPT$ symmetry by periodically driving a dissipative quantum system of a single trapped ion.
arXiv Detail & Related papers (2021-07-27T07:11:32Z)
Hilbert-space geometry of random-matrix eigenstates [55.41644538483948]
We discuss the Hilbert-space geometry of eigenstates of parameter-dependent random-matrix ensembles. Our results give the exact joint distribution function of the Fubini-Study metric and the Berry curvature. We compare our results to numerical simulations of random-matrix ensembles as well as electrons in a random magnetic field.
arXiv Detail & Related papers (2020-11-06T19:00:07Z)
Statistical properties of eigenvalues of the non-Hermitian Su-Schrieffer-Heeger model with random hopping terms [0.0]
We find that eigenvalues can be purely real in a certain range of parameters, even in the absence of parity and time-reversal symmetry. We clarify that a non-Hermitian Hamiltonian whose eigenvalues are purely real can be mapped to a Hermitian Hamiltonian which inherits the symmetries of the original Hamiltonian.
arXiv Detail & Related papers (2020-05-06T10:17:58Z)

This list is automatically generated from the titles and abstracts of the papers in this site.