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https://doi.org/10.1007/s11425-009-0143-2
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Cite Publication Date: Oct 1, 2009 | |
 Citations: 5 |
We study a fourth order curve flow, which is the gradient flow of a functional describing the shapes of human red blood cells. We prove that for any smooth closed initial curve in ℝ2, the flow has a smooth solution for all time and the solution subconverges to a critical point of the functional.
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