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Curve shortening flow on Riemann surfaces with possible ambient conic singularities
Published 30 Jun 2020 in math.DG | (2007.00089v3)
Abstract: In this paper, we study the curve shortening flow (CSF) on Riemann surfaces. We generalize Huisken's comparison function to Riemann surfaces and surfaces with conic singularities. We reprove the Gage-Hamilton-Grayson theorem on surfaces. We also prove that for embedded simple closed curves, CSF can not touch conic singularities with cone angles $\leq \pi$.
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