Parametric finite element approximations of curvature driven interface evolutions
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Parametric finite elements lead to very efficient numerical methods for surface evolution equations. We introduce several computational techniques for curvature driven evolution equations based on a weak formulation for the mean curvature. The approaches discussed, in contrast to many other methods, have good mesh properties that avoid mesh coalescence and very non-uniform meshes. Mean curvature flow, surface diffusion, anisotropic geometric flows, solidification, two-phase flow, Willmore and Helfrich flow as well as biomembranes are treated. We show stability results as well as results explaining the good mesh properties.
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A Second-order Structure-preserving Parametric FEM for Surface Evolution
A second-order structure-preserving parametric FEM for surface diffusion and mean curvature flow that maintains mesh quality via harmonic map heat flow and guarantees volume preservation.
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