Spectral Singularity in confined PT symmetric optical potential

Abstract

We present an analytical study for the scattering amplitudes (Reflection |R| and Transmission |T|), of the periodic PT symmetric optical potential V(x) = W0 ( 2 x + i V0 2x ) confined within the region 0 ≤ x ≤ L, embedded in a homogeneous medium having uniform potential W0. The confining length L is considered to be some integral multiple of the period π . We give some new and interesting results. Scattering is observed to be normal (|T| 2 ≤ 1, \ |R|2 ≤ 1) for V0 ≤ 0.5 , when the above potential can be mapped to a Hermitian potential by a similarity transformation. Beyond this point ( V0 > 0.5 ) scattering is found to be anomalous (|T| 2, \ |R|2 not necessarily ≤ 1 ). Additionally, in this parameter regime of V0, one observes infinite number of spectral singularities ESS at different values of V0. Furthermore, for L= 2 n π, the transition point V0 = 0.5 shows unidirectional invisibility with zero reflection when the beam is incident from the absorptive side (Im [V(x)] < 0) but finite reflection when the beam is incident from the emissive side (Im [V(x)] > 0), transmission being identically unity in both cases. Finally, the scattering coefficients |R|2 and |T|2 always obey the generalized unitarity relation : ||T|2 - 1| = |RR|2 |RL|2, where subscripts R and L stand for right and left incidence respectively.