Let $dot A$ be a densely defined, closed, symmetric operator in the complex, separable Hilbert space $mathcal{H}$ with equal deficiency indices and denote by $mathcal{N}_i = ker big(big(dot Abig)^* - i I_{mathcal{H}}big)$, $dim , (mathcal{N}_i)=kin mathbb{N} cup {infty}$, the associated deficiency subspace of $dot A$ . If $A$ denotes a self-adjoint extension of $dot A$ in $mathcal{H}$, the Donoghue $m$-operator $M_{A,mathcal{N}_i}^{Do} (, cdot ,)$ in $mathcal{N}_i$ associated with the pair $(A,mathcal{N}_i)$ is given by [ M_{A,mathcal{N}_i}^{Do}(z)=zI_{mathcal{N}_i} + (z^2+1) P_{mathcal{N}_i} (A - z I_{mathcal{H}})^{-1} P_{mathcal{N}_i} bigvert_{mathcal{N}_i},, quad zin mathbb{C} backslash mathbb{R}, ] with $I_{mathcal{N}_i}$ the identity operator in $mathcal{N}_i$, and $P_{mathcal{N}_i}$ the orthogonal projection in $mathcal{H}$ onto $mathcal{N}_i$. Assuming the standard local integrability hypotheses on the coefficients $p, q,r$, we study all self-adjoint realizations corresponding to the differential expression [ tau=frac{1}{r(x)}left[-frac{d}{dx}p(x)frac{d}{dx} + q(x)right] , text{ for a.e. $xin(a,b) subseteq mathbb{R}$,} ] in $L^2((a,b); rdx)$, and, as the principal aim of this paper, systematically construct the associated Donoghue $m$-functions (resp., $2 times 2$ matrices) in all cases where $tau$ is in the limit circle case at least at one interval endpoint $a$ or $b$.
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