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Curve shortening flows in warped product manifolds

Published 24 Nov 2015 in math.DG | (1511.07553v2)

Abstract: We study curve shortening flows in two types of warped product manifolds. These manifolds are $S1\times N$ with two types of warped metrics where $S1$ is the unit circle in $R2$ and $N$ is a closed Riemannian manifold. If the initial curve is a graph over $S1$, then its curve shortening flow exists for all times and finally converges to a geodesic closed curve.

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