Quasiconformal Homogeneity of Genus Zero Surfaces
Abstract
A Riemann surface M is said to be K-quasiconformally homogeneous if for every two points p,q ∈ M, there exists a K-quasiconformal homeomorphism f M → M such that f(p) = q. In this paper, we show there exists a universal constant K0 > 1 such that if M is a K-quasiconformally homogeneous hyperbolic genus zero surface other than the disk D, then K ≥ K0. This answers a question by Gehring and Palka.
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