Let $\{u_n\}_n$ be a bounded sequence on $H_0^1(0,1)$. Can we find a subsequence such that $u_{n_k}'(x)\longrightarrow u'(x)\text{ a.e. }x\in(0,1)$ for some $u\in H_0^1(0,1)$?
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Sorry, I made a mistake in the question – user432701 Jan 10 '18 at 11:54
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Here's a suggestion for a counterexample:
For the sake of simplicity, I changed the interval to $(0, \pi)$, otherwise you can shift everything. Define:
$$ u_n (x) := \frac{\sin(nx)}{n} $$
Then $ (u_n)_n$ is bounded in $ H^{1}_0(0, \pi)$ and $ u'_n(x)= \cos(nx) $. But such sequence does not admit any a.e convergent subsequence, as you can see here (discussion made for sine, but the idea is the same); in particular, there is no $u \in H^1_0(0, \pi)$ such that $u'_{n_k} \rightarrow u'$ almost everywhere.
GaC
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