Litcius/Paper detail

Exact Mobility Edges and Topological Anderson Insulating Phase in a Slowly Varying Quasiperiodic Model

Zhanpeng Lu, Zhihao Xu, Yunbo Zhang

2022Annalen der Physik15 citationsDOIOpen Access PDF

Abstract

Abstract The relationship of topology and disorder in a 1D Su–Schrieffer–Heeger chain subjected to a slowly varying quasi‐periodic modulation is uncovered. By numerically calculating the disorder‐averaged winding number and analytically studying the localization length of the zero modes, the topological phase diagram is obtained, which implies that the topological Anderson insulator (TAI) can be induced by a slowly varying quasi‐periodic modulation. Moreover, unlike the localization properties in the TAI phase caused by random disorder, mobility edges can enter into the TAI region identified by the fractal dimension, the inverse participation ratio, and the spatial distributions of the wave functions, the boundaries of which coincide with the analytical results presented here.

Topics & Concepts

Quasiperiodic functionPhase (matter)Topology (electrical circuits)PhysicsCondensed matter physicsStatistical physicsMathematicsQuantum mechanicsCombinatoricsTopological Materials and PhenomenaQuantum many-body systemsAdvanced Condensed Matter Physics