Evolution of convex lens-shaped networks under curve shortening flow
We consider convex symmetric lens-shaped networks in R^2 that evolve under curve shortening flow. We show that the enclosed convex domain shrinks to a point in finite time. Furthermore, after appropriate rescaling the evolving networks converge to a self-similarly shrinking network, which we prove t...
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Zusammenfassung: | We consider convex symmetric lens-shaped networks in R^2 that evolve under
curve shortening flow. We show that the enclosed convex domain shrinks to a
point in finite time. Furthermore, after appropriate rescaling the evolving
networks converge to a self-similarly shrinking network, which we prove to be
unique in an appropriate class. We also include a classification result for
some self-similarly shrinking networks. |
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DOI: | 10.48550/arxiv.0711.1108 |