Lengths of radii under conformal maps of the unit disc

Balogh, Zoltan; Bonk, Mario

doi:10.1090/S0002-9939-99-04565-7

Lengths of radii under conformal maps of the unit disc
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by Zoltan Balogh and Mario Bonk PDF

Proc. Amer. Math. Soc. 127 (1999), 801-804 Request permission

Abstract:

If $E_{f}(R)$ is the set of endpoints of radii which have length greater than or equal to $R>0$ under a conformal map $f$ of the unit disc, then $\operatorname {cap} E_{f}(R)=O(R^{-1/2})$ as $R\to \infty$ for the logarithmic capacity of $E_{f}(R)$. The exponent $-1/2$ is sharp.

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