Donoghue m-functions for singular Sturm--Liouville operators

Abstract

Let A be a densely defined, closed, symmetric operator in the complex, separable Hilbert space H with equal deficiency indices and denote by Ni = (( A)* - i IH), \, (Ni)=k∈ N \∞\, the associated deficiency subspace of A . If A denotes a self-adjoint extension of A in H, the Donoghue m-operator MA,NiDo (\, · \,) in Ni associated with the pair (A,Ni) is given by \[ MA,NiDo(z)=zINi + (z2+1) PNi (A - z IH)-1 PNi Ni\,, z∈ C R, \] with INi the identity operator in Ni, and PNi the orthogonal projection in H onto Ni. Assuming the standard local integrability hypotheses on the coefficients p, q,r, we study all self-adjoint realizations corresponding to the differential expression \[ τ=1r(x)[-ddxp(x)ddx + q(x)] \, for a.e. x∈(a,b) ⊂eq R, \] in L2((a,b); rdx), and, as the principal aim of this paper, systematically construct the associated Donoghue m-functions (resp., 2 × 2 matrices) in all cases where τ is in the limit circle case at least at one interval endpoint a or b.