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Scientific Part
Mathematics
An asymptotic relation for conformal radii of two nonoverlapping domains
A. V. Zherdevab a Petrozavodsk State University, 33, Lenin Str., Petrozavodsk, Republic of Karelia, 185910, Russia
b Saratov State University, 83, Astrakhanskaya Str.,
Saratov, 410012, Russia
Abstract:
We consider a family of continuously varying closed Jordan curves given by a polar equation, such that the interiors of the curves form an increasing or decreasing chain of domains. Such chains can be described by the Löwner – Kufarev differential equation. We deduce an integral representation of a driving function in the equation. Using this representation we obtain an asymptotic formula, which establishes a connection between conformal radii of bounded and unbounded components of the complement of the Jordan curve when the bounded component is close to the unit disk.
Key words:
Löwner – Kufarev equation, conformal radius, asymptotic expansion, nonoverlapping domains.
Citation:
A. V. Zherdev, “An asymptotic relation for conformal radii of two nonoverlapping domains”, Izv. Saratov Univ. Math. Mech. Inform., 18:3 (2018), 274–283
Linking options:
https://www.mathnet.ru/eng/isu762 https://www.mathnet.ru/eng/isu/v18/i3/p274
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