New Journal of Physics (Jan 2025)
Exact solution of the relationship between the eigenvalue discreteness and the behavior of eigenstates in Su–Schrieffer–Heeger lattices
Abstract
The interplay between eigenvalue discreteness and eigenstate localization is a fundamental characteristic of one-dimensional Su–Schrieffer–Heeger (SSH) lattices. In this study, we investigate the relationship between the eigenvalue discreteness and the eigenstates behavior in 1D SSH lattices. The discreteness fraction ( D ) are introduced in combination with the inverse participation ratio to quantify this relationship. By employing the bulk-edge correspondence and perturbation theory, we derive an exact solution that accounts for both zero and non-zero modes. Our findings reveal a logarithmic relationship between the degree of eigenvalue discreteness and eigenstate localization in both the Hermitian and non-Hermitian conditions. This result provides a direct measure of edge-state localization strength in the topologically nontrivial phase.
Keywords
