PT-symmetry breaking and universal chirality in a PT-symmetric ring

Abstract

We investigate the properties of an N-site tight-binding lattice with periodic boundary condition (PBC) in the presence of a pair of gain and loss impurities iγ, and two tunneling amplitudes t0,tb that are constant along the two paths that connect them. We show that the parity and time-reversal ()-symmetric phase of the lattice with PBC is robust, insensitive to the distance between the impurities, and that the critical impurity strength for PT-symmetry breaking is given by γPT=|t0-tb|. We study the time-evolution of a typical wave packet, initially localized on a single site, across the PT-symmetric phase boundary. We find that it acquires chirality with increasing γ, and the chirality reaches a universal maximum value at the threshold, γ=γPT, irrespective of the initial location of the wave packet or the lattice parameters. Our results imply that PT-symmetry breaking on a lattice with PBC has consequences that have no counterpart in open chains.