Formation of Exceptional Points in pseudo-Hermitian Systems

Abstract

Motivated by the recent growing interest in the field of PT-symmetric Hamiltonian systems we theoretically study the emergency of singularities called Exceptional Points (EPs) in the eigenspectrum of pseudo-Hermitian Hamiltonian as the strength of Hermiticity-breaking terms turns on. Using general symmetry arguments, we characterize the separate energy levels by a topological Z2 index which corresponds to the signs 1 of the eigenvalues of pseudo-metric operator ζ in the absence of Hermiticity-breaking terms. After that, we show explicitly that the formation of second-order EPs is governed by this Z2-index: only the pairs of levels with opposite index can provide second-order EPs. Our general analysis is accompanied by a detailed study of EPs appearance in an exemplary PT-symmetric pseudo-Hermitian system with parity operator in the role of ζ: a transverse-field Ising spin chain with a staggered imaginary longitudinal field. Using analytically computed parity indices of all the levels, we analyze the eigenspectrum of the model in general, and the formation of third-order EPs in particular