I want to know that how the statement below holds.
The statement : There exists a constant $C = C(s)$ such that the continuous embedding of $W^{s,2}$ into the space of uniformly bounded, continuous functions if $s > n/2$, i.e., $ |w(x)| \leqslant C \| w\|_{s,2}$ for $w \in W^{s,2}$ and almost all $x \in \mathbb R^n$.
Would you tell me how this holds by using the usual Sobolev embedding theorem? Thank you.