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arxiv: 2201.00413 · v3 · pith:35CSVXV5new · submitted 2022-01-02 · 🧮 math.AP · math.DG

Strong convergence of the thresholding scheme for the mean curvature flow of mean convex sets

classification 🧮 math.AP math.DG
keywords meanconvexschemeconvergencecurvatureenergyflowotto
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In this work, we analyze Merriman, Bence and Osher's thresholding scheme, a time discretization for mean curvature flow. We restrict to the two-phase setting and mean convex initial conditions. In the sense of the minimizing movements interpretation of Esedoglu and Otto we show the time-integrated energy of the approximation to converge to the time-integrated energy of the limit. As a corollary, the conditional convergence results of Otto and one of the authors become unconditional in the two-phase mean convex case. Our results are general enough to handle the extension of the scheme to anisotropic flows for which a non-negative kernel can be chosen.

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