Suppose I have a sequence $u_n \to u$ in $H^1_0(\Omega)$ on a smooth and bounded domain. For some $p>1$ and $s \in (0,\frac 12)$, is it possible to estimate the norm of the characteristic function of the zero level set of $u_n$, $$\lVert \chi_{\{u_n=0\}}\rVert_{W^{s,p}(\Omega)}$$ in terms of norms of $u_n$? In particular I am looking for a uniform bound for the above expression.
We know it belongs eg to $W^{\epsilon, 2}(\Omega)$ for $\epsilon < \frac 12$, I just want to know if it can be bounded uniformly.
