New features of scattering from a one-dimensional non-Hermitian (complex) potential

Abstract

For complex one-dimensional potentials, we propose the asymmetry of both reflectivity and transmitivity under time-reversal: R(-k) R(k) and T(-k) T(k), unless the potentials are real or PT-symmetric. For complex PT-symmetric scattering potentials, we propose that Rleft(-k)=Rright(k) and T(-k)=T(k). So far, the spectral singularities (SS) of a one-dimensional non-Hermitian scattering potential are witnessed/conjectured to be at most one. We present a new non-Hermitian parametrization of Scarf II potential to reveal its four new features. Firstly, it displays the just acclaimed (in)variances. Secondly, it can support two spectral singularities at two pre-assigned real energies (E*=α2,β2) either in T(k) or in T(-k), when αβ>0. Thirdly, when α β <0 it possesses one SS in T(k) and the other in T(-k). Fourthly, when the potential becomes PT-symmetric [(α+β)=0], we get T(k)=T(-k), it possesses a unique SS at E=α2 in both T(-k) and T(k). Lastly, for completeness, when α=iγ and β=iδ, there are no SS, instead we get two negative energies -γ2 and -δ2 of the complex PT-symmetric Scarf II belonging to the two well-known branches of discrete bound state eigenvalues and no spectral singularity exists in this case. We find them as E+M=-(γ-M)2 and E-N=-(δ-N)2; M(N)=0,1,2,... with 0 M (N)< γ (δ). PACS: 03.65.Nk,11.30.Er,42.25.Bs