On the self-adjointness of H+A*+A

Abstract

Let H:D(H)⊂eq F F be self-adjoint and let A:D(H) F (playing the role of the annihilator operator) be H-bounded. Assuming some additional hypotheses on A (so that the creation operator A* is a singular perturbation of H), by a twofold application of a resolvent Krein-type formula, we build self-adjoint realizations H of the formal Hamiltonian H+A*+A with D(H) D( H)=\0\. We give an explicit characterization of D( H) and provide a formula for the resolvent difference (- H+z)-1-(-H+z)-1. Moreover, we consider the problem of the description of H as a (norm resolvent) limit of sequences of the kind H+A*n+An+En, where the An\!'s are regularized operators approximating A and the En's are suitable renormalizing bounded operators. These results show the connection between the construction of singular perturbations of self-adjoint operators by Krein's resolvent formula and nonperturbative theory of renormalizable models in Quantum Field Theory; in particular, as an explicit example, we consider the Nelson model.