So now I jus thought I'd write down the lipschitz argument I mentioned:
If $f^{(r)}$ is Lipschitz-continuous ($\alpha$-Hölder-continuous with $\alpha=1$) with constant $L$ - that is $\vert f^{(r)}(s) - f^{(r)}(t)| \leq L \vert s -t \vert$ for all $s,t$, then $$\omega_r(\delta) = \max_{\vert s - t \vert < \delta} \vert f^{(r)}(s) - f^{(r)}(t) \vert \leq \max_{\vert s - t \vert < \delta} L \vert s - t \vert < L\delta$$