Eigenstate Correlations, the Eigenstate Thermalization Hypothesis, and Quantum Information Dynamics in Chaotic Many-Body Quantum Systems

IF 11.6 1区 物理与天体物理 Q1 PHYSICS, MULTIDISCIPLINARY
Dominik Hahn, David J. Luitz, J. T. Chalker
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Abstract

We consider the statistical properties of eigenstates of the time-evolution operator in chaotic many-body quantum systems. Our focus is on correlations between eigenstates that are specific to spatially extended systems and that characterize entanglement dynamics and operator spreading. In order to isolate these aspects of dynamics from those arising as a result of local conservation laws, we consider Floquet systems in which there are no conserved densities. The correlations associated with scrambling of quantum information lie outside the standard framework established by the eigenstate thermalization hypothesis (ETH). In particular, ETH provides a statistical description of matrix elements of local operators between pairs of eigenstates, whereas the aspects of dynamics we are concerned with arise from correlations among sets of four or more eigenstates. We establish the simplest correlation function that captures these correlations and discuss features of its behavior that are expected to be universal at long distances and low energies. We also propose a maximum-entropy ansatz for the joint distribution of a small number n of eigenstates. In the case n=2, this ansatz reproduces ETH. For n=4 it captures both the growth with time of entanglement between subsystems, as characterized by the purity of the time-evolution operator, and also operator spreading, as characterized by the behavior of the out-of-time-order correlator. We test these ideas by comparing results from Monte Carlo sampling of our ansatz with exact diagonalization studies of Floquet quantum circuits.

Abstract Image

混沌多体量子系统中的特征态相关性、特征态热化假说和量子信息动力学
我们考虑了混沌多体量子系统中时间演化算子特征状态的统计特性。我们的重点是特征状态之间的相关性,这是空间扩展系统所特有的,也是纠缠动力学和算子扩散的特征。为了将动力学的这些方面与因局部守恒定律而产生的方面区分开来,我们考虑了不存在守恒密度的 Floquet 系统。与量子信息扰乱相关的相关性超出了特征态热化假说(ETH)所建立的标准框架。特别是,ETH 提供了对特征态之间局部算子矩阵元素的统计描述,而我们关注的动力学方面则产生于四个或更多特征态集合之间的相关性。我们建立了捕捉这些相关性的最简单相关函数,并讨论了其行为特征,这些特征预计在远距离和低能量时具有普遍性。我们还提出了少量 n 特征态联合分布的最大熵解析。在 n=2 的情况下,该等式再现了 ETH。在 n=4 的情况下,它既能捕捉到子系统间纠缠随时间的增长(以时间演化算子的纯度为特征),也能捕捉到算子扩散(以时阶外相关器的行为为特征)。我们通过比较蒙特卡洛抽样分析法与弗洛克量子回路精确对角化研究的结果来验证这些观点。
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来源期刊
Physical Review X
Physical Review X PHYSICS, MULTIDISCIPLINARY-
CiteScore
24.60
自引率
1.60%
发文量
197
审稿时长
3 months
期刊介绍: Physical Review X (PRX) stands as an exclusively online, fully open-access journal, emphasizing innovation, quality, and enduring impact in the scientific content it disseminates. Devoted to showcasing a curated selection of papers from pure, applied, and interdisciplinary physics, PRX aims to feature work with the potential to shape current and future research while leaving a lasting and profound impact in their respective fields. Encompassing the entire spectrum of physics subject areas, PRX places a special focus on groundbreaking interdisciplinary research with broad-reaching influence.
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