Continuous boundary values of conformal maps
Abstract
Let G be a bounded simply connected domain in the complex plane. A point a∈ ∂ G is said to be accessible from inside of G if there is a Jordan arc J such that J⊂ G and J∂ G=\a\. In this paper the author shows that a univalent analytic function from the unit disk D onto G extends continuously to D if and only if every a∈∂ G is accessible. The main result covers a famous theorem proved by C. Carathe\"odory, which says that if G is a Jordan domain, then extends to be a homeomorphism from D onto to G.
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