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 Dal'nevost. Mat. Zh., 2010, Volume 10, Number 1, Pages 41–49 (Mi dvmg8)

On the maximum of the Moebius invariant in the four disjoint domain problem

D. A. Kirillova

Abstract: Let $r(D,a)$ denote the conformal radius of the domain $D$ with respect to the point $a$. In this paper we obtain the supremum of the product
$$\prod_{k=1}^{4}\frac{r(D_{k},a_{k})}{|a_{k+1}-a_{k}|}, \quad a_{5}:=a_{1}$$
for all simply connected disjoint domains $D_{k}\subset\overline{\mathbb{C}}$ and points $a_{k}\in D_{k},k=1,\ldots,4$. Using the method of interior variations due to M. Schiffer we establish the form of quadratic differential associated with extremal partition problem $\prod\limits_{k=1}^{n}r(D_{k},a_{k})|a_{k+1}-a_{k}|^{-1}\to\sup$ for arbitrary $n\geqslant 3$. For $n=4$ we studed the circle domains and their boundaries for the corresponding quadratic differential.

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UDC: 517.54
MSC: Primary 30C70; Secondary 30C75

Citation: D. A. Kirillova, “On the maximum of the Moebius invariant in the four disjoint domain problem”, Dal'nevost. Mat. Zh., 10:1 (2010), 41–49

Citation in format AMSBIB
\Bibitem{Kir10} \by D.~A.~Kirillova \paper On the maximum of the Moebius invariant in the four disjoint domain problem \jour Dal'nevost. Mat. Zh. \yr 2010 \vol 10 \issue 1 \pages 41--49 \mathnet{http://mi.mathnet.ru/dvmg8} \elib{http://elibrary.ru/item.asp?id=15484848} 

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