Recurrence method in Non-Hermitian Systems

TL;DR

This paper introduces a recurrence-based method for accurately calculating energy spectra in non-Hermitian systems with open boundaries, outperforming existing techniques and enabling detailed analysis of edge physics.

Contribution

It presents a new recurrence formalism that improves accuracy and efficiency in analyzing bulk and edge spectra of multi-band non-Hermitian models.

Findings

Enhanced accuracy over numerical diagonalization

Efficient derivation of bulk and edge spectra

Insights into non-Hermitian edge phenomena

Abstract

We propose a novel and systematic recurrence method for the energy spectra of non-Hermitian systems under open boundary conditions based on the recurrence relations of their characteristic polynomials. Our formalism exhibits better accuracy and performance on multi-band non-Hermitian systems than numerical diagonalization or the non-Bloch band theory. It also provides a targeted and efficient formulation for the non-Hermitian edge spectra. As demonstrations, we derive general expressions for both the bulk and edge spectra of multi-band non-Hermitian models with nearest-neighbor hopping and under open boundary conditions, such as the non-Hermitian Su-Schrieffer-Heeger and Rice-Mele models and the non-Hermitian Hofstadter butterfly - 2D lattice models in the presence of non-reciprocity and perpendicular magnetic fields, which is only made possible by the significantly lower complexity of the recurrence method. In addition, we use the recurrence method to study non-Hermitian edge physics, including the size-parity effect and the stability of the topological edge modes against boundary perturbations. Our recurrence method offers a novel and favorable formalism to the intriguing physics of non-Hermitian systems under open boundary conditions.