Sturm-Liouville boundary value problems with operator potentials and unitary equivalence

Abstract

Consider the minimal Sturm-Liouville operator A = A min generated by the differential expression A := -d2dt2 + T in the Hilbert space L2(R+,H) where T = T* 0 in H. We investigate the absolutely continuous parts of different self-adjoint realizations of A. In particular, we show that Dirichlet and Neumann realizations, AD and AN, are absolutely continuous and unitary equivalent to each other and to the absolutely continuous part of the Krein realization. Moreover, if ∈fσess(T) = ∈fσ(T) 0, then the part AacEA(σ(AD)) of any self-adjoint realization A of A is unitarily equivalent to AD. In addition, we prove that the absolutely continuous part Aac of any realization A is unitarily equivalent to AD provided that the resolvent difference (A - i)-1- (AD - i)-1 is compact. The abstract results are applied to elliptic differential expression in the half-space.