Related papers: Spectral anomalies and broken symmetries in maximally chaotic quantum maps

Spectral anomalies and broken symmetries in maximally chaotic quantum maps

URL: http://arxiv.org/abs/2312.14067v1
Date: Thu, 21 Dec 2023 17:46:22 GMT
Title: Spectral anomalies and broken symmetries in maximally chaotic quantum maps
Authors: Laura Shou, Amit Vikram, Victor Galitski
Abstract summary: We show that long-range spectral rigidity remains directly correlated with ergodicity in the quantum dynamical sense of visiting a complete orthonormal basis. We provide numerical evidence that long-range spectral rigidity remains directly correlated with ergodicity in the quantum dynamical sense of visiting a complete orthonormal basis.
Score: 0.0
License: http://arxiv.org/licenses/nonexclusive-distrib/1.0/
Abstract: Spectral statistics such as the level spacing statistics and spectral form factor (SFF) are widely expected to accurately identify ``ergodicity'', including the presence of underlying macroscopic symmetries, in generic quantum systems ranging from quantized chaotic maps to interacting many-body systems. By studying various quantizations of maximally chaotic maps that break a discrete classical symmetry upon quantization, we demonstrate that this approach can be misleading and fail to detect macroscopic symmetries. Notably, the same classical map can exhibit signatures of different random matrix symmetry classes in short-range spectral statistics depending on the quantization. While the long-range spectral statistics encoded in the early time ramp of the SFF are more robust and correctly identify macroscopic symmetries in several common quantizations, we also demonstrate analytically and numerically that the presence of Berry-like phases in the quantization leads to spectral anomalies, which break this correspondence. Finally, we provide numerical evidence that long-range spectral rigidity remains directly correlated with ergodicity in the quantum dynamical sense of visiting a complete orthonormal basis.

Related papers

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 quantum frequency comb measurements by spectral mode-matching [39.58317527488534]
We present the first general approach to make arbitrary, one-shot measurements of a multimode quantum optical source. This approach uses spectral mode-matching, which can be understood as interferometry with a memory effect.
arXiv Detail & Related papers (2024-05-28T15:17:21Z)
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)
Anomalies of Average Symmetries: Entanglement and Open Quantum Systems [0.0]
We show that anomalous average symmetry implies degeneracy in the density matrix eigenvalues. We discuss several applications in the contexts of many body localization, quantum channels, entanglement phase transitions and also derive new constraints on the Lindbladian evolution of open quantum systems.
arXiv Detail & Related papers (2023-12-14T16:10:49Z)
Enhanced Entanglement in the Measurement-Altered Quantum Ising Chain [46.99825956909532]
Local quantum measurements do not simply disentangle degrees of freedom, but may actually strengthen the entanglement in the system. This paper explores how a finite density of local measurement modifies a given state's entanglement structure.
arXiv Detail & Related papers (2023-10-04T09:51:00Z)
Symmetry classification of typical quantum entanglement [10.698681396351494]
Entanglement entropy of typical quantum states, also known as the Page curve, plays an important role in quantum many-body systems and quantum gravity. Our work elucidates the interplay of symmetry and entanglement in quantum physics and provides characterization of symmetry-enriched quantum chaos.
arXiv Detail & Related papers (2023-01-18T20:41:32Z)
Calculating non-linear response functions for multi-dimensional electronic spectroscopy using dyadic non-Markovian quantum state diffusion [68.8204255655161]
We present a methodology for simulating multi-dimensional electronic spectra of molecular aggregates with coupling electronic excitation to a structured environment. A crucial aspect of our approach is that we propagate the NMQSD equation in a doubled system Hilbert space but with the same noise.
arXiv Detail & Related papers (2022-07-06T15:30:38Z)
Generalized quantum measurements with matrix product states: Entanglement phase transition and clusterization [58.720142291102135]
We propose a method for studying the time evolution of many-body quantum lattice systems under continuous and site-resolved measurement. We observe a peculiar phenomenon of measurement-induced particle clusterization that takes place only for frequent moderately strong measurements, but not for strong infrequent measurements.
arXiv Detail & Related papers (2021-04-21T10:36:57Z)
Missing-level statistics in classically chaotic quantum systems with symplectic symmetry [0.0]
We present experimental and theoretical results for the fluctuation properties in the incomplete spectra of quantum systems with symplectic symmetry. We extend the random-matrix theory (RMT) approach introduced in [O. Bohigas and M. P. Pato, Phys. Rev. E 74, 036212 (2006)] for incomplete spectra of quantum systems with symmetry.
arXiv Detail & Related papers (2021-04-01T10:06:18Z)
Quantum particle across Grushin singularity [77.34726150561087]
We study the phenomenon of transmission across the singularity that separates the two half-cylinders. All the local realisations of the free (Laplace-Beltrami) quantum Hamiltonian are examined as non-equivalent protocols of transmission/reflection. This allows to comprehend the distinguished status of the so-called bridging' transmission protocol previously identified in the literature.
arXiv Detail & Related papers (2020-11-27T12:53:23Z)
Anharmonic effects on phase-space quantum profiles: an exact approach [0.0]
Wigner flow analysis is presumedly useful in identifying stable quantum configurations. A phase-space quantum purity quantifier is analytically computed and reproduces exactly the same quantum ensemble statistical mixture profile.
arXiv Detail & Related papers (2020-01-11T19:17:14Z)

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