Let $\Omega$ be a smooth bounded domain.
Let $v \in H^2(\Omega)$ satisfy $-\Delta v = 0$ on $\Omega$ with $\partial_\nu v = g$ where $g \in H^{1/2}(\partial\Omega)$ is normal derivative data.
Define $F:H^1(\Omega) \to \mathbb{R}$ by $$\langle F, \varphi\rangle = \int_\Omega \nabla v \nabla \varphi.$$ We know $F \in H^1(\Omega)^*$. But is actually $F \in L^2(\Omega)$?
I ask because $v \in H^2$, so I expect $F$ to be nicer.. how to prove if true?