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This article is cited in 13 scientific papers (total in 13 papers)
Evolution families of conformal mappings with fixed points and the Löwner-Kufarev equation
V. V. Goryainovab a Moscow Institute of Physics and Technology (State University), Dolgoprudny, Moscow region
b The Volzhsky Institute of Humanities
Abstract:
The paper is concerned with evolution families of conformal mappings of the unit disc to itself that fix an interior point and a boundary point. Conditions are obtained for the evolution families to be differentiable, and an existence and uniqueness theorem for an evolution equation is proved. A convergence theorem is established which describes the topology of locally uniform convergence of evolution families in terms of infinitesimal generating functions. The main result in this paper is the embedding theorem which shows that any conformal mapping of the unit disc to itself with two fixed points can be embedded into a differentiable evolution family of such mappings. This result extends the range of the parametric method in the theory of univalent functions. In this way the problem of the mutual change of the derivative at an interior point and the angular derivative at a fixed point on the boundary is solved for a class of mappings of the unit disc to itself. In particular, the rotation theorem is established for this class of mappings.
Bibliography: 27 titles.
Keywords:
conformal mapping, fixed point, evolution family, angular derivative, rotation theorem.
Received: 12.08.2013 and 20.10.2013
Citation:
V. V. Goryainov, “Evolution families of conformal mappings with fixed points and the Löwner-Kufarev equation”, Sb. Math., 206:1 (2015), 33–60
Linking options:
https://www.mathnet.ru/eng/sm8276https://doi.org/10.1070/SM2015v206n01ABEH004445 https://www.mathnet.ru/eng/sm/v206/i1/p39
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Abstract page: | 2654 | Russian version PDF: | 947 | English version PDF: | 36 | References: | 85 | First page: | 998 |
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