Non-Hermitian Aharonov-Bohm Cage in Bosonic Bogoliubov-de Gennes Systems

TL;DR

This paper investigates the non-Hermitian Aharonov-Bohm cage phenomenon in bosonic BdG systems, classifies degeneracy types of flat bands using mathematical tools, and proposes a scheme for realizing highly degenerate flat bands.

Contribution

It introduces a classification method for degeneracy types of flat bands in non-Hermitian systems using minimal polynomials and transfer matrices.

Findings

Established the localization mechanism of the AB cage.

Derived the minimal polynomial for degeneracy classification.

Proposed a scheme to realize highly degenerate flat bands.

Abstract

The non-Hermitian Aharonov-Bohm (AB) cage is a unique localization phenomenon that confines all possible excitations. This confinement leads to fully flat spectra in momentum space, which are typically accompanied with the degeneracy with various types. Classifying the degeneracy type is crucial for studying the dynamical properties of the non-Hermitian AB cage, but the methods for such classification and their physical connections remain not very clear. Here, we construct a non-Hermitian AB cage in a bosonic Bogoliubov-de Gennes (BdG) system with various types of degenerate flat bands (DFBs). Using the transfer matrix, we demonstrate the localization mechanism for the formation of AB cage and derive the minimal polynomial in mathematics for classifying the degeneracy types of DFBs, thus providing comprehensive understanding of the correspondence among the degeneracy type of DFBs, the minimal polynomial, and the transfer matrix. With such correspondence, we propose a scheme to realize highly degenerate flat bands.