Green\'s Mapping and Julia Sets
Abstract
In March 1999, the first named author (Binder) posed the problem of showing that a ``good direction'' ∈ [0,2] exists, for any Green's mapping T:H→ , i.e., equationbinder ∫01 |T''(reiπ)|dr <∞, for at least one ∈ [0,2]. equation Presently this problem is open even in the special case where ∂ is a uniformly perfect subset of the real line. In this paper we obtain a positive solution when = C E0 where E0 ⊂ R is the Julia set of an expanding quadratic polynomial.
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