Sharp Entropy Bounds for Self-Shrinkers in Mean Curvature Flow
Abstract
Let M⊂ Rm+1 be a smooth, closed, codimension-one self-shrinker (for mean curvature flow) with nontrivial k th homology. We show that the entropy of M is greater than or equal to the entropy of a round k-sphere, and that if equality holds, then M is a round k-sphere in Rk+1.
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