Singular selfadjoint perturbations of unbounded selfadjoint operators. Reverse approach

Abstract

Let A and A1 are unbounded selfadjoint operators in a Hilbert space H. Following AK we call A1 a singular perturbation of A if A and A1 have different domains D(A),D(A1) but D(A)(A1) is dense in H and A=A1 on D(A)(A1). In this note we specify without recourse to the theory of selfadjoint extensions of symmetric operators the conditions under which a given bounded holomorphic operator function in the open upper and lower half-planes is the resolvent of a singular perturbation A1 of a given selfadjoint operator A. For the special case when A is the standardly defined selfadjoint Laplace operator in L2(R3) we describe using the M.G. Krein resolvent formula a class of singular perturbations A1, which are defined by special selfadjoint boundary conditions on a finite or spaced apart by bounded from below distances infinite set of points in R3 and also on a bounded segment of straight line embedded into R3 by connecting parameters in the boundary conditions for A1 and the independent on A matrix or operator parameter in the Krein formula for the pair A, A1.