Braids and Higher-order Exceptional Points from the Interplay Between Lossy Defects and Topological Boundary States

Zi-Jian Li, Gabriel Cardoso, Emil J. Bergholtz, Qing-Dong Jiang
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Abstract

We show that the perturbation of the Su-Schrieffer-Heeger chain by a localized lossy defect leads to higher-order exceptional points (HOEPs). Depending on the location of the defect, third- and fourth-order exceptional points (EP3s & EP4s) appear in the space of Hamiltonian parameters. On the one hand, they arise due to the non-Abelian braiding properties of exceptional lines (ELs) in parameter space. Namely, the HOEPs lie at intersections of mutually non-commuting ELs. On the other hand, we show that such special intersections happen due to the fact that the delocalization of edge states, induced by the non-Hermitian defect, hybridizes them with defect states. These can then coalesce together into an EP3. When the defect lies at the midpoint of the chain, a special symmetry of the full spectrum can lead to an EP4. In this way, our model illustrates the emergence of interesting non-Abelian topological properties in the multiband structure of non-Hermitian perturbations of topological phases.
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从有损缺陷和拓扑边界态的相互作用看编织和高阶异常点
我们的研究表明,局部有损缺陷对苏-施里弗-希格链的扰动会导致高阶异常点(HOEPs)。根据缺陷的位置,哈密顿参数空间会出现三阶和四阶异常点(EP3s & EP4s)。一方面,它们是由于参数空间中例外线(EL)的非阿贝尔编织特性而产生的。也就是说,HOEPs 位于互不换向的 EL 的交点上。另一方面,我们证明了这种特殊交集的发生是由于非赫米提缺陷引起的边缘态的非局域化,使它们与缺陷态杂交。然后,这些态会凝聚成一个 EP3。当缺陷位于链的中点时,全谱的特殊对称性会导致 EP4。通过这种方式,我们的模型说明了在拓扑相的非ermitian扰动的多带结构中出现了有趣的非阿贝尔拓扑特性。
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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