Litcius/Paper detail

Non-Hermitian boundary spectral winding

Zuxuan Ou, Yucheng Wang, Linhu Li

2023Physical review. B./Physical review. B31 citationsDOI

Abstract

Spectral winding of complex eigenenergies represents a topological aspect unique in non-Hermitian systems, which vanishes in one-dimensional (1D) systems under the open boundary conditions (OBC). In this Letter, we discover a boundary spectral winding in two-dimensional non-Hermitian systems under the OBC, originating from the interplay between Hermitian boundary localization and non-Hermitian nonreciprocal pumping. Such a nontrivial boundary topology is demonstrated in a non-Hermitian breathing Kagome model with a triangle geometry, whose 1D boundary mimics a 1D non-Hermitian system under the periodic boundary conditions with nontrivial spectral winding. In a trapezoidal geometry, this boundary spectral winding can even coexist with corner accumulation of edge states, instead of extended ones along the 1D boundary of a triangle geometry. An OBC type of hybrid skin-topological effect may also emerge in a trapezoidal geometry, provided the boundary spectral winding completely vanishes. By studying the Green's function, we unveil that the boundary spectral winding can be detected from a topological response of the system to a local driving field, offering a realistic method to extract the nontrivial boundary topology for experimental studies.

Topics & Concepts

Hermitian matrixPhysicsBoundary (topology)Quantum electrodynamicsQuantum mechanicsMathematical analysisMathematicsQuantum Mechanics and Non-Hermitian PhysicsTopological Materials and PhenomenaQuantum chaos and dynamical systems