Two-dimensional lattice with an imaginary magnetic field

TL;DR

This paper introduces a two-dimensional non-Hermitian lattice model with an imaginary magnetic field, revealing unique spectral properties, gauge transformation effects, and an observable non-Hermitian Aharonov-Bohm effect.

Contribution

It presents a novel non-Hermitian lattice model with an imaginary magnetic field, analyzing its spectral properties, gauge invariance, and experimental implications.

Findings

Energy spectrum does not converge with increasing lattice size.

Spectrum converges when fixing one side length, explained by non-Bloch band theory.

Net wave function norm change depends on enclosed imaginary magnetic flux.

Abstract

We introduce a two-dimensional non-Hermitian lattice model with an imaginary magnetic field and elucidate various unique features which are absent in Hermitian lattice models with real magnetic fields. To describe the imaginary magnetic field, we consider both the Landau gauge and the symmetric gauge, which are related by a generalized gauge transformation, changing not only the phase but also the amplitude of the wave function. We discuss the complex energy spectrum and the non-Hermitian Aharonov-Bohm effect as examples of properties which are due to the imaginary magnetic field independent of the generalized gauge transformation. We show that the energy spectrum does not converge as the lattice size is made larger, which comes from the intrinsic nonperiodicity of the model. However, we have found that the energy spectrum does converge if one fixes the length of one side and makes the other side longer; this asymptotic behavior can be understood in the framework of the non-Bloch band theory. We also find an analog of the Aharonov-Bohm effect; the net change of the norm of the wave function upon adiabatically forming a closed path is determined by the imaginary magnetic flux enclosed by the path, which provides an experimentally observable feature of the imaginary magnetic field.