A class of non-schlicht conformal mappings with a schlicht quasiconformal extension. II (Q2890381)

Let \(\Sigma \) denote the class of univalent functions \( f \) with \(f=f(z)=z+{{b_1}\over z} + {{b_2}\over{z^2}} + \dots \) for \(|z|>1\) and \(\widetilde{\Sigma _s}(\kappa)\) the class of non-schlicht mappings \( g \) with \(g=g(z)=z+{{b_1}\over z} + {{b_2}\over{ z^2 }} +\dots \) for \(|z|>1\) with a continuous continuation to \( \{ z:|z| \leq 1\}\), where \(\overline {g}=\overline {g(z)} \) is univalent and quasiconformal in \( \{ z:|z|<1\}\) with \( |g_{\bar z}| \geq \kappa |g_z| \) for a fixed \(\kappa >1\). Firstly, the author shows that every mapping \(f \in \Sigma \) may be considered as the limit of a sequence \( \{g^{(n)}\}_{n=1,2,\dots} \subset \bigcup_{1<\kappa}\widetilde{\Sigma _s}(\kappa)\), where the convergence of this sequence is locally uniform in \( \{z: |z|>1\}.\) Secondly, he proves an inequality for the Grunsky coefficients of \(g \in \widetilde{\Sigma _s}(\kappa)\).NEWLINENEWLINENEWLINEFor Part I see [Math. Nachr. 59, 261--263 (1974; Zbl 0278.30026)].