Two-point one-dimensional δ-δ interactions: non-abelian addition law and decoupling limit

Abstract

In this contribution to the study of one dimensional point potentials, we prove that if we take the limit q 0 on a potential of the type v0δ(y)+2v1δ'(y)+w0δ(y-q)+ 2 w1δ'(y-q), we obtain a new point potential of the type u0 δ(y)+2 u1 δ'(y), when u0 and u1 are related to v0, v1, w0 and w1 by a law having the structure of a group. This is the Borel subgroup of SL2( R). We also obtain the non-abelian addition law from the scattering data. The spectra of the Hamiltonian in the exceptional cases emerging in the study are also described in full detail. It is shown that for the v1= 1, w1= 1 values of the δ couplings the singular Kurasov matrices become equivalent to Dirichlet at one side of the point interaction and Robin boundary conditions at the other side.