Finer limit circle/limit point classification for Sturm-Liouville operators

Abstract

In this paper we introduce an index c ∈ N0 ∞ which we call the `regularization index' associated to the endpoints, c∈\a,b\, of nonoscillatory Sturm-Liouville differential expressions with trace class resolvents. This notion extends the limit circle/limit point dichotomy in the sense that c~=~0 at some endpoint if and only if the expression is in the limit circle case. In the limit point case c>0, a natural interpretation in terms of iterated Darboux transforms is provided. We also show stability of the index c for a suitable class of perturbations, extending earlier work on perturbations of spherical Schr\"odinger operators to the case of general three-coefficient Sturm-Liouville operators. We demonstrate our results by considering a variety of examples including generalized Bessel operators, Jacobi differential operators, and Schr\"odinger operators on the half-line with power potentials.

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