Scattering theory with both regular and singular perturbations

Abstract

We provide an asymptotic completeness criterion and a representation formula for the scattering matrix of the scattering couple (AB,A), where both A and AB are self-adjoint operator and AB formally corresponds to adding to A two terms, one regular and the other singular. In particular, our abstract results apply to the couple (B,), where is the free self-adjoint Laplacian in L2(R3) and B is a self-adjoint operator in a class of Laplacians with both a regular perturbation, given by a short-range potential, and a singular one describing boundary conditions (like Dirichlet, Neumann and semi-transparent δ and δ' ones) at the boundary of a open, bounded Lipschitz domain. The results hinge upon a limiting absorption principle for AB and a Krein-like formula for the resolvent difference (-AB+z)-1-(-A+z)-1 which puts on an equal footing the regular (here, in the case of the Laplacian, a Kato-Rellich potential suffices) and the singular perturbations.