Variability regions for the third derivative of bounded analytic functions

Abstract: Let $z_0$ and $w_0$ be given points in the open unit disk $\mathbb{D}$ with $|w_0| < |z_0|$, and $\mathcal{H}_0$ be the class of all analytic self-maps $f$ of $\mathbb{D}$ normalized by $f(0)=0$. In this paper, we establish the third order Dieudonn\'e Lemma, and apply it to explicitly determine the variability region ${f'''(z_0): f\in \mathcal{H}_0,f(z_0) =w_0, f'(z_0)=w_1}$ for given $z_0,w_0,w_1$ and give the form of all the extremal functions.