Topological edge states and disorder robustness in one-dimensional off-diagonal mosaic lattices

IF 4.6 2区物理与天体物理 Q2 MATERIALS SCIENCE, MULTIDISCIPLINARY

Results in Physics Pub Date : 2025-09-19 DOI:10.1016/j.rinp.2025.108433

Ba Phi Nguyen , Kihong Kim

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引用次数: 0

Abstract

We investigate topological edge states in one-dimensional off-diagonal mosaic lattices, where nearest-neighbor hopping amplitudes are modulated periodically with period

κ > 1

. Analytically, we demonstrate that discrete edge states emerge at energy levels

E = ϵ + 2 t cos (π i / κ)

(

i = 1, \dots, κ - 1

), extending the Su–Schrieffer–Heeger model to multi-band systems. Numerical simulations show that these edge states are robustly localized and display characteristic nodal structures, with their existence being strongly dictated by the specific edge arrangement of long and short bonds. We further examine their stability under off-diagonal disorder, where the hopping amplitudes

β

fluctuate randomly at intervals of

κ

. Using the inverse participation ratio as a localization measure, we show that these topological edge states remain robust over a broad range of disorder strengths. In contrast, additional

β

-dependent edge states that appear for

κ \geq 4

are fragile and vanish even under relatively weak disorder. These findings highlight a rich interplay between topology, periodic modulation, and disorder, offering insights for engineering multi-gap topological phases and their realization in synthetic quantum and photonic systems.

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一维非对角镶嵌格子的拓扑边缘状态和无序鲁棒性

我们研究了一维非对角线镶嵌格子的拓扑边缘状态，其中最近邻跳频以周期为κ>；1的周期性调制。解析地，我们证明了离散边缘状态出现在能级E= ε +2tcos(πi/κ) (i=1，…，κ−1)，将Su-Schrieffer-Heeger模型扩展到多波段系统。数值模拟表明，这些边缘状态具有鲁棒定域性，并表现出特有的节点结构，它们的存在强烈地取决于长键和短键的特定边缘排列。我们进一步研究了它们在非对角线无序下的稳定性，其中跳频振幅β以κ的间隔随机波动。使用逆参与比作为定位度量，我们表明这些拓扑边缘状态在广泛的无序强度范围内保持鲁棒性。相反，κ≥4时出现的额外β依赖边缘状态是脆弱的，即使在相对较弱的紊乱下也会消失。这些发现突出了拓扑、周期调制和无序之间丰富的相互作用，为工程多间隙拓扑相及其在合成量子和光子系统中的实现提供了见解。

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

Results in Physics MATERIALS SCIENCE, MULTIDISCIPLINARYPHYSIC-PHYSICS, MULTIDISCIPLINARY

CiteScore

8.70

自引率

9.40%

发文量

754

审稿时长

50 days

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