Given a sequence $u_k\in W^{1,p}(B_1)\cap C^{\alpha}(B_1)$ such that $\|u_k\|_{C^{\alpha}(B_1)}\le 1$ for all $k\in \mathbb N$. Suppose we have $$ u_k \rightharpoonup u\;\;\mbox{weakly in $W^{1,p}(B_1)$} $$ and we also have $$ u_k \rightarrow u_0\;\;\mbox{in $C^{\alpha}(B_1)$}. $$
Can I imply from the above two informations that $u_k\rightarrow u_0$ strongly in $W^{1,p}(B_1)$?
I don't think so. Define a sequence of 'zig-zag' functions $(f_n)$ on $[0,1]$ as follows. Let $f_n$ be $\frac{2}{n}$-periodic with $f_n(x) = x$ when $x \in [0,\frac{1}{n}]$ and $f_n(x) = \frac{2}{n}- x$ when $x \in [\frac{1}{n},\frac{2}{n}]$. Every function is Lipschitz with $\lvert f_n \rvert_\infty \leq 1/n$ and $\lvert f_n' \rvert_\infty = 1$.
Moreover the sequence converges to zero weakly in $W^{1,p}$ for every $p \in (1,\infty)$ and strongly in $C^{0,\alpha}$ for every $\alpha \in (0,1)$, while $\lvert f_n \rvert_{1,p} \geq 1$ for every $n$.
