Competing PT potentials and re-entrant PT symmetric phase for a particle in a box

Abstract

We investigate the effects of competition between two complex, PT-symmetric potentials on the PT-symmetric phase of a "particle in a box". These potentials, given by VZ(x)=iZsign(x) and V(x)=i[δ(x-a)-δ(x+a)], represent long-range and localized gain/loss regions respectively. We obtain the PT-symmetric phase in the (Z,) plane, and find that for locations a near the edge of the box, the PT-symmetric phase is strengthened by additional losses to the loss region. We also predict that a broken PT-symmetry will be restored by increasing the strength of the localized potential. By comparing the results for this problem and its lattice counterpart, we show that a robust PT-symmetric phase in the continuum is consistent with the fragile phase on the lattice. Our results demonstrate that systems with multiple, PT-symmetric potentials show unique, unexpected properties.