Bulk-Boundary Correspondence for Non-Hermitian Hamiltonians via Green Functions
Heinrich-Gregor Zirnstein, Gil Refael, Bernd Rosenow
Abstract
Genuinely non-Hermitian topological phases can be realized in open systems with sufficiently strong gain and loss; in such phases, the Hamiltonian cannot be deformed into a gapped Hermitian Hamiltonian without energy bands touching each other. Comparing Green functions for periodic and open boundary conditions we find that, in general, there is no correspondence between topological invariants computed for periodic boundary conditions, and boundary eigenstates observed for open boundary conditions. Instead, we find that the non-Hermitian winding number in one dimension signals a topological phase transition in the bulk: It implies spatial growth of the bulk Green function.
Topics & Concepts
Hermitian matrixHamiltonian (control theory)PhysicsBoundary value problemEigenvalues and eigenvectorsBoundary (topology)Periodic boundary conditionsWinding numberTopology (electrical circuits)Mathematical physicsMathematical analysisQuantum mechanicsMathematicsCombinatoricsMathematical optimizationQuantum Mechanics and Non-Hermitian PhysicsTopological Materials and PhenomenaQuantum chaos and dynamical systems