Scattering Matrices for Close Singular Selfadjoint Perturbations of Unbounded Selfadjoint Operators

Abstract

In this paper, we consider an unbounded selfadjoint operator A and its selfadjoint perturbations in the same Hilbert space H. As S.Albeverio and P. Kurosov (2000), we call a selfadjoint operator A1 the singular perturbation of A if A1 and A have different domains D(A),D(A1) but A=A1 on D(A)(A1). Assuming that A has absolutely continuous spectrum and the difference of resolvents Rz(A1) -Rz(A) of A1 and A for non-real z is a trace class operator we find the explicit expression for the scattering matrix for the pair A, A1 through the constituent elements of the Krein formula for the resolvents of this pair. As an illustration, we find the scattering matrix for the standardly defined Laplace operator in L2(R3) and its singular perturbation in the form of an infinite sum of zero-range potentials.