Povzner-Wienholtz-type theorems for Sturm-Liouville operators with singular coefficients

Abstract

We introduce and investigate symmetric operators L0 associated in the complex Hilbert space L2(R) with a formal differential expression \[l[u] :=-(pu')'+qu + i((ru)'+ru') \] under minimal conditions on the regularity of the coefficients. They are assumed to satisfy conditions \[q=Q'+s; 1|p|, Q|p|, r|p| ∈ L2loc(R), s ∈ L1loc(R), 1p≠ 0\,\,a.e., \] where the derivative of the function Q is understood in the sense of distributions, and all functions p, Q, r, s are real-valued. In particular, the coefficients q and r' may be Radon measures on R, while function p may be discontinuous. The main result of the paper are constructive sufficient conditions on the coefficient p which provide that the operator L0 being semi-bounded implies it being self-adjoint.

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