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 $\leq \pi$.Comment: 28 pages, 4 figure

Ma, Biao

English

arXiv

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 $\leq \pi$.Comment: 31 pages, 4 figures. Accepted versio

Curve shortening flow on Riemann surfaces with possible ambient conic singularities

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