Curve-shortening flow of open, elastic curves in $\mathbb{R}^2$ with repelling endpoints: A minimizing movement approach

Rufat Badal

arxiv: 1902.08079 · v1 · pith:MGXSSM73new · submitted 2019-02-21 · 🧮 math.AP

Curve-shortening flow of open, elastic curves in mathbb{R}² with repelling endpoints: A minimizing movement approach

Rufat Badal This is my paper

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keywords flowelasticendpointsmathbbminimizingapproachcomplementedcoulomb

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We study an $L^{2}$-type gradient flow of an immersed elastic curve in $\mathbb{R}^{2}$ whose endpoints repel each other via a Coulomb potential. By De Giorgi's minimizing movements scheme we prove long-time existence of the flow. The work is complemented by several numerical experiments.

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Curve-shortening flow of open, elastic curves in mathbb{R}² with repelling endpoints: A minimizing movement approach

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