We give a self-contained description of the main results from the paper (Cacciapuoti et al., J Math Anal Appl 473(1):215–257, 2019). We focus on the fundamental concepts and on the chief achievements, omitting some auxiliary results and a number of technical details given in the original paper. We discuss the scattering problem for a quantum particle in dimension three in the presence of a semitransparent unbounded obstacle, modelled by a δ-interaction supported on a surface obtained through a local, Lipschitz continuous deformation of a flat plane. We discuss existence and asymptotic completeness of the wave operators with respect to a suitable reference dynamics. Additionally, we provide an explicit expression for the related scattering matrix and show that it converges to the identity as the deformation goes to zero (giving a quantitative estimates on the rate of convergence).

Cacciapuoti, C., Fermi, D., Posilicano, A. (2021). Scattering Theory for Delta-Potentials Supported by Locally Deformed Planes. In A. Michelangeli (a cura di), Mathematical Challenges of Zero-Range Physics (pp. 35-55) [10.1007/978-3-030-60453-0_2].

Scattering Theory for Delta-Potentials Supported by Locally Deformed Planes

Cacciapuoti C.;Fermi D.
;
2021

Abstract

We give a self-contained description of the main results from the paper (Cacciapuoti et al., J Math Anal Appl 473(1):215–257, 2019). We focus on the fundamental concepts and on the chief achievements, omitting some auxiliary results and a number of technical details given in the original paper. We discuss the scattering problem for a quantum particle in dimension three in the presence of a semitransparent unbounded obstacle, modelled by a δ-interaction supported on a surface obtained through a local, Lipschitz continuous deformation of a flat plane. We discuss existence and asymptotic completeness of the wave operators with respect to a suitable reference dynamics. Additionally, we provide an explicit expression for the related scattering matrix and show that it converges to the identity as the deformation goes to zero (giving a quantitative estimates on the rate of convergence).
978-3-030-60452-3
Cacciapuoti, C., Fermi, D., Posilicano, A. (2021). Scattering Theory for Delta-Potentials Supported by Locally Deformed Planes. In A. Michelangeli (a cura di), Mathematical Challenges of Zero-Range Physics (pp. 35-55) [10.1007/978-3-030-60453-0_2].
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Utilizza questo identificativo per citare o creare un link a questo documento: http://hdl.handle.net/11590/413923
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