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General Rules Governing the Dynamical Encircling of an Arbitrary Number of Exceptional Points

Feng Yu, Xu-Lin Zhang, Zhen-Nan Tian, Qi-Dai Chen, Hong-Bo Sun

2021Physical Review Letters68 citationsDOI

Abstract

Dynamically encircling an exceptional point in non-Hermitian systems has drawn great attention recently, since a nonadiabatic transition process can occur and lead to intriguing phenomena and applications such as the asymmetric switching of modes. While all previous experiments have been restricted to two-state systems, the dynamics in multistate systems where more complex topology can be formed by exceptional points, is still unknown and associated experiments remain elusive. Here, we propose an on-chip photonic system in which an arbitrary number of exceptional points can be encircled dynamically. We reveal in experiment a robust state-switching rule for multistate systems, and extend it to an infinite-period system in which an exceptional line is encircled with outcomes being located at the Brillouin-zone boundary. The proposed versatile platform is expected to reveal more physics related to multiple exceptional points and exceptional lines, and give rise to applications in multistate non-Hermitian systems.

Topics & Concepts

PhysicsPoint (geometry)Topology (electrical circuits)Process (computing)Statistical physicsDynamical systems theoryLine (geometry)Computer scienceTheoretical physicsComplex systemDynamical system (definition)Classical mechanicsPhotonicsQuantum Mechanics and Non-Hermitian PhysicsNonlinear Waves and SolitonsQuantum chaos and dynamical systems
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