PT-breaking threshold in spatially asymmetric Aubry-Andre Harper models: hidden symmetry and topological states

Abstract

Aubry-Andre Harper (AAH) lattice models, characterized by reflection-asymmetric, sinusoidally varying nearest-neighbor tunneling profile, are well-known for their topological properties. We consider the fate of such models in the presence of balanced gain and loss potentials iγ located at reflection-symmetric sites. We predict that these models have a finite PT breaking threshold only for specific locations of the gain-loss potential, and uncover a hidden symmetry that is instrumental to the finite threshold strength. We also show that the topological edge-states remain robust in the PT-symmetry broken phase. Our predictions substantially broaden the possible realizations of a PT-symmetric system.