Related papers: Geometric origin of self-intersection points in non-Hermitian energy spectra

Geometric origin of self-intersection points in non-Hermitian energy spectra

URL: http://arxiv.org/abs/2502.04755v1
Date: Fri, 07 Feb 2025 08:42:34 GMT
Title: Geometric origin of self-intersection points in non-Hermitian energy spectra
Authors: Jinghui Pi, Chenyang Wang, Yong-Chun Liu, Yangqian Yan,
Abstract summary: Unlike Hermitian systems, non-Hermitian energy spectra can form closed loops in the complex energy plane. We rigorously demonstrate that these self-intersection points result from the intersection of the auxiliary generalized Brillouin zone and the Brillouin zone in one-band systems.
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Abstract: Unlike Hermitian systems, non-Hermitian energy spectra under periodic boundary conditions can form closed loops in the complex energy plane, a phenomenon known as point gap topology. In this paper, we investigate the self-intersection points of such non-Hermitian energy spectra and reveal their geometric origins. We rigorously demonstrate that these self-intersection points result from the intersection of the auxiliary generalized Brillouin zone and the Brillouin zone in one-band systems, as confirmed by an extended Hatano-Nelson model. This finding is further generalized to multi-band systems, illustrated through a non-Hermitian Su-Schrieffer-Heeger model. Moreover, we address multiple self-intersection points and derive the geometric conditions for general n-fold self-intersection points. Our results enhance the fundamental understanding of generic non-Hermitian quantum systems and provide theoretical support for further experimental investigations of energy self-intersection points.

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