Let us consider the Hilbert space $L^2([0,\infty))$ and operator $H=-\frac{d^2}{dx^2} + \frac{1}{x}$ on the domain of $C^{\infty}_0((0,\infty))$ (smooth functions with compact support away from $0$).
Is the operator H essentially self-adjoint? What is the domain of its self-adjoint extension?
The answer is classical and negative. It is a particular instance of Thm X.11 of Reed-Simon here.
Let $V(x)$ be a continous potential on $(0,+\infty)$. If \begin{equation} V(x) \geq \frac{3}{4x^2} \end{equation} Then $-\partial_x^2 +V$ it is essentially self-adjoint. On the other hand, if for some $\varepsilon >0$ \begin{equation} 0\leq V(x) \leq \left(\frac{3}{4} - \varepsilon\right)\frac{1}{x^2} \end{equation} Then $-\partial_x^2 +V$ is not essentially self-adjoint
