Curve Shortening Flow of Space Curves with Convex Projections
Abstract
We show that under Space Curve Shortening flow any closed immersed curve in Rn whose projection onto R2×\0\ is convex remains smooth until it shrinks to a point. Throughout its evolution, the projection of the curve onto R2×\0\ remains convex. As an application, we show that any closed immersed curve in Rn can be perturbed to an immersed curve in Rn+2 whose evolution by Space Curve Shortening shrinks to a point.
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