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The fundamental solutions of the curve shortening problem via the Schwarz function

Published 10 Mar 2021 in math.DG and math.CV | (2103.06069v3)

Abstract: Curve shortening in the $z$-plane in which, at a given point on the curve, the normal velocity of the curve is equal to the curvature, is shown to satisfy $S_tS_z=S_{zz}$, where $S(z,t)$ is the Schwarz function of the curve. This equation is shown to have a parametric solution from which the known explicit solutions for curve shortening flow; the circle, grim reaper, paperclip and hairclip, can be recovered.

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