Continuous extension of conformal maps

Abstract

For a simply connected domain G, let ∂aG be the set of accessible points in ∂ G and let ∂n G=∂ G-∂aG. A point a∈∂ G is called semi-unreachable if there is a crosscut J of G and domains U and V such that G-J=U V and a∈(∂n U∂n V)-J. We use ∂snG to denote the set of semi-unreachable points. In this article we show that a univalent analytic function from the unit disk D onto G extends continuously to D if and only if ∂snG=. As a consequence, we provide a very short and elementary proof for the Osgood conjecture: if G is a Jordan domain, then -1, the Riemann map, extends to be a homeomorphism from G to D.