A point on that curve can be connected to infinity by a Jordan arc.
2.
These are conformal maps of the unit disk onto the complex plane with a Jordan arc connecting a finite point to " omitted.
3.
A "'Jordan arc "'in the plane is the image of an injective continuous map of a closed interval into the plane.
4.
In particular, for any point " P " in the interior region and a point " A " on the Jordan curve, there exists a Jordan arc connecting " P " with " A " and, with the exception of the endpoint " A ", completely lying in the interior region.
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