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Estimates of Conformal Radius and Distortion Theorems for Univalent Functions

Authors:	L V Kovalev

Institution:	(1) The Institute of Applied Mathematics of the Far-Eastern Department of the Russian Academy of Sciences, Russia

Abstract:	A simple proof of the recent result by E. G. Emel'yanov concerning the maximum of the conformal radius r(D,1) for a family of simply connected domains with a fixed value r(D,0) is given. A similar problem is solved for a family of convex domains. Exact estimates for functionals of the form $\|g'(w)\| / \|g(w)\|^\delta$ are obtained for families of functions inverse to elements of the classes S and S_m, where S={f:f is regular and univalent in the disk {z:\|z\| < 1} and f(0)=f'(0)-1=0} and S_M= $\{ f \in S:\|f(z) < M$ for $\left\| z \right\| < 1\}$ . Bibliography: 7 titles.

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