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Transport and spectral features in non-Hermitian open systems

A. F. Tzortzakakis, Konstantinos G. Makris, Alexander Szameit, E. N. Economou

2021Physical Review Research61 citationsDOIOpen Access PDF

Abstract

We study the transport and spectral properties of a non-Hermitian one-dimensional disordered lattice, the diagonal matrix elements of which are random complex variables taking both positive (loss) and negative (gain) imaginary values: Their distribution is either the usual rectangular one or a binary pair-correlated one possessing, in its Hermitian version, delocalized states and unusual transport properties. Contrary to the Hermitian case, all states in our non-Hermitian system are localized. In addition, the eigenvalue spectrum, for the binary pair-correlated case, exhibits an unexpected intricate fractallike structure on the complex plane and with increasing non-Hermitian disorder, the eigenvalues tend to coalesce in particular small areas of the complex plane, a feature termed "eigenvalue condensation." Despite the strong Anderson localization of all eigenstates, the system appears to exhibit transport not by diffusion but by a new mechanism through sudden jumps between states located even at distant sites. This seems to be a general feature of open non-Hermitian random systems. The relation of our findings to recent experimental results is also discussed.

Topics & Concepts

Hermitian matrixDelocalized electronEigenvalues and eigenvectorsComplex planeDiagonalPhysicsBinary numberLattice (music)Anderson localizationRandom matrixStatistical physicsQuantum mechanicsMathematicsMathematical analysisGeometryArithmeticAcousticsQuantum Mechanics and Non-Hermitian PhysicsQuantum chaos and dynamical systemsSynthesis and Properties of Aromatic Compounds
Transport and spectral features in non-Hermitian open systems | Litcius