Related papers: Knot topology of exceptional point and non-Hermitian no-go theorem

Knot topology of exceptional point and non-Hermitian no-go theorem

URL: http://arxiv.org/abs/2111.11346v4
Date: Tue, 28 Jun 2022 01:59:17 GMT
Title: Knot topology of exceptional point and non-Hermitian no-go theorem
Authors: Haiping Hu, Shikang Sun, and Shu Chen
Abstract summary: We provide a topological classification of isolated EPs based on homotopy theory. The classification indicates that an $n$-th order EP in two dimensions is fully characterized by the braid group B$_n$. We put forward a non-Hermitian no-go theorem, which governs the possible configurations of EPs.
Score: 1.2514666672776884
License: http://creativecommons.org/licenses/by/4.0/
Abstract: Exceptional points (EPs) are peculiar band singularities and play a vital role in a rich array of unusual optical phenomena and non-Hermitian band theory. In this paper, we provide a topological classification of isolated EPs based on homotopy theory. In particular, the classification indicates that an $n$-th order EP in two dimensions is fully characterized by the braid group B$_n$, with its eigenenergies tied up into a geometric knot along a closed path enclosing the EP. The quantized discriminant invariant of the EP is the writhe of the knot. The knot crossing number gives the number of bulk Fermi arcs emanating from each EP. Furthermore, we put forward a non-Hermitian no-go theorem, which governs the possible configurations of EPs and their splitting rules on a two-dimensional lattice and goes beyond the previous fermion doubling theorem. We present a simple algorithm generating the non-Hermitian Hamiltonian with a prescribed knot. Our framework constitutes a systematic topological classification of the EPs and paves the way towards exploring the intriguing phenomena related to the enigmatic non-Hermitian band degeneracy.

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