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Generalized Bloch band theory for non-Hermitian bulk–boundary correspondence

Ken-Ichiro Imura, Yositake Takane

2020Progress of Theoretical and Experimental Physics21 citationsDOIOpen Access PDF

Abstract

Abstract Bulk–boundary correspondence is the cornerstone of topological physics. In some non-Hermitian topological systems this fundamental relation is broken in the sense that the topological number calculated for the Bloch energy band under the periodic boundary condition fails to reproduce the boundary properties under the open boundary. To restore the bulk–boundary correspondence in such non-Hermitian systems a framework beyond the Bloch band theory is needed. We develop a non-Hermitian Bloch band theory based on a modified periodic boundary condition that allows a proper description of the bulk of a non-Hermitian topological insulator in a manner consistent with its boundary properties. Taking a non-Hermitian version of the Su–Schrieffer–Heeger model as an example, we demonstrate our scenario, in which the concept of bulk–boundary correspondence is naturally generalized to non-Hermitian topological systems.

Topics & Concepts

PhysicsBoundary (topology)Bloch wavePeriodic boundary conditionsTopology (electrical circuits)Topological insulatorBoundary value problemCorrespondence principle (sociology)Topological entropy in physicsRelation (database)Bloch oscillationsTheoretical physicsQuantum mechanicsElectronic band structureTopological quantum numberPotential theoryEnergy (signal processing)Quantum Mechanics and Non-Hermitian PhysicsTopological Materials and PhenomenaGeometry and complex manifolds