Non-catastrophic resonant states in one dimensional scattering from a rising exponential potential

Abstract

Investigation of scattering from rising potentials has just begun, these unorthodox potentials have earlier gone unexplored. Here, we obtain reflection amplitude (r(E)) for scattering from a two-piece rising exponential potential: V(x 0)=V1[1-e-2x/a], V(x > 0)=V2[e2x/b-1], where V1,2>0. This potential is repulsive and rising for x>0; it is attractive and diverging (to -∞) for x<0. The complex energy poles ( En= En-in/2, n>0) of r(E) manifest as resonances. Wigner's reflection time-delay displays peaks at energies E(≈ En) but the eigenstates do not show spatial catastrophe for E= En.