Locality, correlations, information, and non-Hermitian quantum systems

IF 3.7 2区物理与天体物理 Q1 Physics and Astronomy Physical Review B Pub Date : 2024-09-06 DOI:10.1103/physrevb.110.094307

Brian Barch

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引用次数: 0

Abstract

Local non-Hermitian (NH) quantum systems generically exhibit breakdown of Lieb-Robinson (LR) bounds, motivating study of whether new locality measures might shed light not seen by existing measures. In this paper we discuss extensions of the connected correlation function (CC) as measures of locality and information spreading in both Hermitian and NH systems. We find that in Hermitian systems,

δ ρ = ρ - ρ_{A} \otimes ρ_{B}

can be written as a linear combination of CCs, allowing placement of an LR bound on

{∥ δ ρ ∥}_{2}

, which we show generically extends to an LR bound on mutual information. Additionally, we extend the CC to NH systems in a form that recovers locality, and use the metric formalism to derive a modified CC which recovers not just locality but even LR bounds in local

P T

-Symmetric systems. We find that even with these CCs, the bound on

{∥ δ ρ ∥}_{2}

breaks down in certain NH cases, which can be used to place a necessary condition on which local NH Hamiltonians are capable of nonlocal entanglement generation. Numerical simulations are provided by means of exact diagonalization for the NH Transverse-Field Ising Model, demonstrating both breakdown and recovery of LR bounds.

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位置性、相关性、信息和非赫米提量子系统

局部非赫米提量子（NH）系统通常会表现出李布-罗宾逊（LR）边界的崩溃，这促使人们研究新的局域性测量方法是否能揭示现有测量方法所看不到的问题。在本文中，我们讨论了连通相关函数（CC）的扩展，将其作为赫米特系统和非赫米特系统中的局域性和信息传播度量。我们发现，在赫米蒂系统中，δρ=ρ-ρA⊗ρB可以写成CC的线性组合，从而可以在∥δρ∥2上放置一个LR约束，我们展示了该约束一般扩展为互信息的LR约束。此外，我们以一种能恢复局部性的形式将CC扩展到NH系统，并利用度量形式主义推导出一种修正的CC，它不仅能恢复局部性，甚至还能恢复局部PT-对称系统中的LR约束。我们发现，即使有了这些 CC，∥δρ∥2 的约束在某些 NH 情况下也会被打破，这可以用来为局部 NH 哈密尔顿能够产生非局部纠缠设定一个必要条件。通过对NH横场伊辛模型进行精确对角，提供了数值模拟，证明了LR边界的崩溃和恢复。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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来源期刊

Physical Review B 物理-物理：凝聚态物理

CiteScore

6.70

自引率

32.40%

发文量

审稿时长

3.0 months

期刊介绍： Physical Review B (PRB) is the world’s largest dedicated physics journal, publishing approximately 100 new, high-quality papers each week. The most highly cited journal in condensed matter physics, PRB provides outstanding depth and breadth of coverage, combined with unrivaled context and background for ongoing research by scientists worldwide. PRB covers the full range of condensed matter, materials physics, and related subfields, including: -Structure and phase transitions -Ferroelectrics and multiferroics -Disordered systems and alloys -Magnetism -Superconductivity -Electronic structure, photonics, and metamaterials -Semiconductors and mesoscopic systems -Surfaces, nanoscience, and two-dimensional materials -Topological states of matter