Abstract
Definition 2.1 (Mean Curvature Flow) A family of smoothly embedded hypersurfaces (Mt)t∈I in R n +1 moves by mean curvature if $$ \frac{{\partial x}} {{\partial t}} = \vec H(x) $$ (2.1) for x ∈ Mt and t ∈ I, I ⊂ R an open interval. Here \( \vec H(x) \) is the mean curvature vector at x ∈ Mt.
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