Decoupling of Deficiency Indices and Applications to Schr\"odinger-Type Operators with Possibly Strongly Singular Potentials

Abstract

We investigate closed, symmetric L2(Rn)-realizations H of Schr\"odinger-type operators (- +V)C0∞(Rn ) whose potential coefficient V has a countable number of well-separated singularities on compact sets j, j ∈ J, of n-dimensional Lebesgue measure zero, with J ⊂eq N an index set and = j ∈ J j. We show that the defect, def(H), of H can be computed in terms of the individual defects, def(Hj), of closed, symmetric L2(Rn)-realizations of (- + Vj)C0∞(Rn j) with potential coefficient Vj localized around the singularity j, j ∈ J, where V = Σj ∈ J Vj. In particular, we prove \[ def(H) = Σj ∈ J def(Hj), \] including the possibility that one, and hence both sides equal ∞. We first develop an abstract approach to the question of decoupling of deficiency indices and then apply it to the concrete case of Schr\"odinger-type operators in L2(Rn). Moreover, we also show how operator (and form) bounds for V relative to H0= - H2(Rn) can be estimated in terms of the operator (and form) bounds of Vj, j ∈ J, relative to H0. Again, we first prove an abstract result and then show its applicability to Schr\"odinger-type operators in L2(Rn). Extensions to second-order (locally uniformly) elliptic differential operators on Rn with a possibly strongly singular potential coefficient are treated as well.