Real eigenvalues in the non-Hermitian Anderson model

Preprint

7 July 2017

preprint
Published by arXiv in arXiv

Abstract

The eigenvalues of the Hatano--Nelson non-Hermitian Anderson matrices, in the spectral regions in which the Lyapunov exponent exceeds the non-Hermiticity parameter, are shown to be real and exponentially close to the Hermitian eigenvalues.

Keywords

EXPONENTIALLY CLOSE
HERMITIAN ANDERSON
LYAPUNOV EXPONENT
REAL EIGENVALUES
ANDERSON MODEL
MATRICES
MODEL

All Related Versions

Version 1, 2017-07-07, ArXiv
Version 2, 2018-01-28, ArXiv

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