Litcius/Paper detail

Topological phases in non-Hermitian Aubry-André-Harper models

Qi-Bo Zeng, Yan-Bin Yang, Yong Xu

2020Physical review. B./Physical review. B189 citationsDOIOpen Access PDF

Abstract

Topological phases have recently witnessed rapid progress in non-Hermitian systems. Here we study a one-dimensional non-Hermitian Aubry-Andr\'e-Harper (AAH) model with imaginary periodic or quasiperiodic modulations. We demonstrate that the non-Hermitian off-diagonal AAH models can host zero-energy modes at the edges. In contrast to the Hermitian case, the zero-energy mode can be localized only at one edge. Such a topological phase corresponds to the existence of a quarter winding number defined by eigenenergy in momentum space. We further find the coexistence of a zero-energy mode located only at one edge and topological nonzero-energy edge modes characterized by a generalized Bott index. In the incommensurate case, a topological non-Hermitian quasicrystal is predicted where all bulk states and two topological edge states are localized at one edge. Such topological edge modes are protected by the generalized Bott index. Finally, we propose an experimental scheme to realize these non-Hermitian models in electric circuits. Our findings add another direction for exploring topological properties in Aubry-Andr\'e-Harper models.

Topics & Concepts

Hermitian matrixTopology (electrical circuits)PhysicsMathematicsPure mathematicsCombinatoricsQuantum Mechanics and Non-Hermitian PhysicsTopological Materials and PhenomenaQuantum chaos and dynamical systems