The Schrödinger particle on the half-line with an attractive δ-interaction: bound states and resonances

In this paper, we provide a detailed description of the eigenvalue ED(x0) ≤ 0 (respectively, EN (x0) ≤ 0) of the self-adjoint Hamiltonian operator representing the negative Laplacian on the positive half-line with a Dirichlet (resp. Neuman) boundary condition at the origin perturbed by an attractive Dirac distribution −λδ(x − x0) for any fixed value of the magnitude of the coupling constant.We also investigate the λ-dependence of both eigenvalues for any fixed value of x0. Furthermore, we show that both systems exhibit resonances as poles of the analytic continuation of the resolvent. These results will be connected with the study of the ground state energy of two remarkable three-dimensional self-adjoint operators, studied in depth in Albeverio’s et al. monograph, perturbed by an attractive δ-distribution supported on the spherical shell of radius r0.