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 , where both and are self-adjoint operator and formally corresponds to adding to two terms, one regular and the other singular. In particular, our abstract results apply to the couple , where is the free self-adjoint Laplacian in and 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 and ones) at the boundary of a open, bounded Lipschitz domain. The results hinge upon a limiting absorption principle for and a Krein-like formula for the resolvent difference which puts on an equal footing the regular (here, in the case of the Laplacian, a Kato-Rellich potential suffices) and the singular perturbations.
Cite
@article{arxiv.2208.03106,
title = {Scattering theory with both regular and singular perturbations},
author = {Andrea Mantile and Andrea Posilicano},
journal= {arXiv preprint arXiv:2208.03106},
year = {2024}
}
Comments
final version, to appear in Journal of Spectral Theory