Sharpness of certain Campbell and Pommerenke estimates

The paper is concerned with the sharpness of some well-known estimates in universal linear-invariant families $\mathscr U_\alpha$ of regular functions. It is shown that the estimate of $|\arg f'(z)|$, $z\in\Delta=\{z:|z|<1\}$ obtained by Pommerenke in 1964 is sharp; the extremal function is found. A lower estimate for the Schwarzian derivative in $\mathscr U_\alpha$ is obtained. For $f\in\mathscr U_\alpha$, a sharp estimate of order of the function $f_r(z)=f(rz)/r$ with $r\in(0,1)$ is found; this estimate is applied to solve other problems.