On Spectral Stability for Rank One Perturbations

Abstract: Embedded point spectra of rank one singular perturbations of an arbitrary self-adjoint operator A on a Hilbert space H is studied. It is shown that these perturbations can be regarded as self-adjoint extensions of a densely defined closed symmetric operator B with deficiency indices (1; 1). Assuming the deficiency vector of B is cyclic for its self-adjoint extensions, we prove that the spectrum of A contains a dense G{\delta} subset where it is not possible to have eigenvalues for any rank one singular perturbation. Moreover, for a dense G{\delta} set of rank one singular perturbations of A their eigenvalues are isolated. The approach presented here unifies points of view taken by different authors.