An improved bound for Sullivan's convex hull theorem
Abstract
Sullivan showed that there exists K0 such that if ⊂ C is a simply connected hyperbolic domain, then there exists a conformally natural K0-quasiconformal map from to the boundary Dome() of the convex hull of its complement which extends to the identity on ∂. Explicit upper and lower bounds on K0 were obtained by Epstein, Marden, Markovic and Bishop. We improve on these bounds, by showing that one may choose K0 7.1695.
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