Scattering from local deformations of a semitransparent plane

Abstract

We study scattering for the couple (AF,A0) of Schr\"odinger operators in L2(R3) formally defined as A0 = - + α\, δπ0 and AF = - + α\, δπF, α >0, where δπF is the Dirac δ-distribution supported on the deformed plane given by the graph of the compactly supported, Lipschitz continuous function F:R2 and π0 is the undeformed plane corresponding to the choice F 0. We provide a Limiting Absorption Principle, show asymptotic completeness of the wave operators and give a representation formula for the corresponding Scattering Matrix SF(λ). Moreover we show that, as F 0, \|SF(λ)- 1\|2B(L2( S2))= O\!(∫R2dx|F(x)|γ), 0<γ<1. We correct a minor mistake in the computation of the scattering matrix, occurring in the published version of this paper (see J. Math. Anal. Appl. 473(1) (2019), pp. 215-257). The mistake was in Section 7, and affected the statement of Corollary 7.2, specifically, Eq. (7.8). Regrettably the formula for SF in the Corrigendum J. Math. Anal. Appl. 482(1) (2020), 123554, still contains a misprint, the correct expression is the one given here.