Related papers: Deviations from random matrix entanglement statistics for kicked quantum chaotic spin-$1/2$ chains

Deviations from random matrix entanglement statistics for kicked quantum chaotic spin-$1/2$ chains

URL: http://arxiv.org/abs/2405.07545v1
Date: Mon, 13 May 2024 08:27:07 GMT
Title: Deviations from random matrix entanglement statistics for kicked quantum chaotic spin-$1/2$ chains
Authors: Tabea Herrmann, Roland Brandau, Arnd Bäcker,
Abstract summary: It is commonly expected that for quantum chaotic body systems the statistical properties approach those of random matrices when increasing the system size. We demonstrate for various kicked spin-$1/2$ chain models that the average eigenstate entanglement indeed approaches the random matrix result. While for autonomous systems such deviations are expected, they are surprising for the more scrambling kicked systems.
Score: 0.0
License: http://arxiv.org/licenses/nonexclusive-distrib/1.0/
Abstract: It is commonly expected that for quantum chaotic many body systems the statistical properties approach those of random matrices when increasing the system size. We demonstrate for various kicked spin-$1/2$ chain models that the average eigenstate entanglement indeed approaches the random matrix result. However, the distribution of the eigenstate entanglement differs significantly. While for autonomous systems such deviations are expected, they are surprising for the more scrambling kicked systems. We attribute the origin of the deviations to the local two-dimensional Hilbert spaces. This is also supported by similar deviations occurring in a local random matrix model with global diagonal coupling.

Related papers

Efficient conversion from fermionic Gaussian states to matrix product states [48.225436651971805]
We propose a highly efficient algorithm that converts fermionic Gaussian states to matrix product states. It can be formulated for finite-size systems without translation invariance, but becomes particularly appealing when applied to infinite systems. The potential of our method is demonstrated by numerical calculations in two chiral spin liquids.
arXiv Detail & Related papers (2024-08-02T10:15:26Z)
Tensor product random matrix theory [39.58317527488534]
We introduce a real-time field theory approach to the evolution of correlated quantum systems. We describe the full range of such crossover dynamics, from initial product states to a maximum entropy ergodic state.
arXiv Detail & Related papers (2024-04-16T21:40:57Z)
From Spectral Theorem to Statistical Independence with Application to System Identification [11.98319841778396]
We provide first quantitative handle on decay rate of finite powers of state transition matrix $|Ak|$. It is shown that when a stable dynamical system has only one distinct eigenvalue and discrepancy of $n-1$: $|A|$ has a dependence on $n$, resulting dynamics are inseparable. We show that element-wise error is essentially a variant of well-know Littlewood-Offord problem.
arXiv Detail & Related papers (2023-10-16T15:40:43Z)
Characterizing quantum chaoticity of kicked spin chains [0.0]
Quantum many-body systems are commonly considered as quantum chaotic if their spectral statistics agree with those of random matrix theory. We demonstrate that even if both level spacing distribution and eigenvector statistics agree well with random matrix predictions, the entanglement entropy deviates from the expected Page curve.
arXiv Detail & Related papers (2023-06-15T10:51:11Z)
Re-Analyze Gauss: Bounds for Private Matrix Approximation via Dyson Brownian Motion [28.431572772564518]
Given a symmetric matrix $M$ and a vector $lambda$, we present new bounds on the Frobenius-distance utility of the Gaussian mechanism for approximating $M$ by a matrix. Our bounds depend on both $lambda$ and the gaps in the eigenvalues of $M$, and hold whenever the top $k+1$ eigenvalues of $M$ have sufficiently large gaps.
arXiv Detail & Related papers (2022-11-11T18:54:01Z)
An Equivalence Principle for the Spectrum of Random Inner-Product Kernel Matrices with Polynomial Scalings [21.727073594338297]
This study is motivated by applications in machine learning and statistics. We establish the weak limit of the empirical distribution of these random matrices in a scaling regime. Our results can be characterized as the free additive convolution between a Marchenko-Pastur law and a semicircle law.
arXiv Detail & Related papers (2022-05-12T18:50:21Z)
Markov chains with doubly stochastic transition matrices and application to a sequence of non-selective quantum measurements [0.0]
A time-dependent finite-state Markov chain that uses doubly transition matrices is considered. entropy that describe the randomness of the probability vectors, and also the randomness of the discrete paths, are studied.
arXiv Detail & Related papers (2022-03-16T14:58:38Z)
Eigenvalue Distribution of Large Random Matrices Arising in Deep Neural Networks: Orthogonal Case [1.6244541005112747]
The paper deals with the distribution of singular values of the input-output Jacobian of deep untrained neural networks in the limit of their infinite width. It was claimed that in these cases the singular value distribution of the Jacobian in the limit of infinite width coincides with that of the analog of the Jacobian with special random but weight independent diagonal matrices.
arXiv Detail & Related papers (2022-01-12T16:33:47Z)
Statistical limits of dictionary learning: random matrix theory and the spectral replica method [28.54289139061295]
We consider increasingly complex models of matrix denoising and dictionary learning in the Bayes-optimal setting. We introduce a novel combination of the replica method from statistical mechanics together with random matrix theory, coined spectral replica method.
arXiv Detail & Related papers (2021-09-14T12:02:32Z)
Statistics of the Spectral Form Factor in the Self-Dual Kicked Ising Model [0.0]
We show that at large enough times the probability distribution agrees exactly with the prediction of Random Matrix Theory. This behaviour is due to a recently identified additional anti-unitary symmetry of the self-dual kicked Ising model.
arXiv Detail & Related papers (2020-09-07T16:02:29Z)
A Matrix Chernoff Bound for Markov Chains and Its Application to Co-occurrence Matrices [30.49132891333353]
We prove a Chernoff-type bound for sums of matrix-valued random variables sampled via a regular (aperiodic and irreducible) finite Markov chain. Our proof is based on the matrix expander (regular undirected graph) Chernoff bound [Garg et al. STOC '18] and scalar Chernoff-Hoeffding bounds for Markov chains. Our matrix Chernoff bound for Markov chains can be applied to analyze the behavior of co-occurrence statistics for sequential data.
arXiv Detail & Related papers (2020-08-06T05:44:54Z)

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