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Hülder Conditions and the Topology of Simply Connected Domains*

Published online by Cambridge University Press:  20 November 2018

Dov Aharonov*
Affiliation:
Israel Inst. of Tech.Technion, Haifa, Israel
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Abstract

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Let ƒ be regular univalent and normalized in the unit disc U (i.e. ƒ ∊ S) and continuous on U ∈ T, where T denotes the boundary of U.

Recently Essén proved [5] a conjecture of Piranian [7] stating that if the derivative of ƒ ∊ S is bounded in U and ƒ(z1) = ƒ(z2) = … = ƒ(zn) for ZjT, 1 ≤ jn, then n ≤ 2. In fact, Essén proved a more general result, using a deep result on harmonic functions. The aim of the following article is to replace Essén's proof by a completely different proof which is based only on Goluzin's inequalities and is much more elementary.

Keywords

Type
Research Article
Copyright
Copyright © Canadian Mathematical Society 1983

Footnotes

*

The research was supported by the Fund for the Promotion of Research at the Technion.

References

1. Aharonov, D. and Shapiro, H. S., A minimal area problem in Conformai Mapping, Royal Institute of Technology, Preprint, 3rd printing, 34 p. Part II, 70 p. 1978.Google Scholar
2. Aharonov, D. and Shapiro, H. S., On the topology of certain simply connected domains Technion?I.I.T., Preprint, 24 p. 1979.Google Scholar
3. Aharonov, D. and Srebro, U., A short proof of the Denjoy conjecture, Bull. Amer. Math. Soc. vol. 4, No. 3, 325328, 1981.Google Scholar
4. Aharonov, D. and Srebro, U., to appear in Ann. Acad. Sci. Fenn. Google Scholar
5. Essén, M., Boundary behavior of univalent functions satisfying a Holder condition, to appear, Proc. Amer. Math. Soc. Google Scholar
6. Goluzin, G. M., Geometric Function Theory of Functions of the Complex Variable, Translation of mathematical monographs, vol. 26, Amer. Math. Soc, Providence, Rhode Island, 1969.Google Scholar
7. Piranian, G., Private communication, with H. S. Shapiro, 1979.Google Scholar
8. Pommerenke, Ch., Univalent Functions, Göttingen, Vandenhoeck and Ruprecht, 1975.Google Scholar