On supersymmetric Dirac delta interactions

Abstract

In this paper we construct N=2 supersymmetric (SUSY) quantum mechanics over several configurations of Dirac-δ potentials from one single delta to a Dirac " comb . We show in detail how the building of supersymmetry on potentials with delta interactions placed in two or more points on the real line requires the inclusion of quasi-square wells. Therefore, the basic ingredient of a supersymmetric Hamiltonian containing two or more Dirac-δs is the singular potential formed by a Dirac-δ plus a step (θ) at the same point. In this δ/θ SUSY Hamiltonian there is only one singlet ground state of zero energy annihilated by the two supercharges or a doublet of ground states paired by supersymmetry of positive energy depending on the relation between the Dirac well strength and the height of the step potential. We find a scenario of either unbroken supersymmetry with Witten index one or supersymmetry breaking when there is one " bosonic and one " fermionic ground state such that the Witten index is zero. We explain next the different structure of the scattering waves produced by three δ/θ potentials with respect to the eigenfunctions arising in the non-SUSY case. In particular, many more bound states paired by supersymmetry exist within the supersymmetric framework compared with the non-SUSY problem. An infinite array of equally spaced δ-interactions of the same strength but alternatively attractive and repulsive are susceptible of being promoted to a N=2 supersymmetric system...