Closed embedded self-shrinkers of mean curvature flow

Abstract

In this article we show the existence of closed embedded self-shrinkers in Rn+1 that are topologically of type S1× M, where M⊂ Sn is any isoparametric hypersurface in Sn for which the multiplicities of the principle curvatures agree. This yields new examples of closed self-shrinkers, for example self-shrinkers of topological type S1× Sk× Sk⊂ R2k+2 for any k. If the number of distinct principle curvatures of M is one the resulting self-shrinker is topologically S1× Sn-1 and the construction recovers Angenent's shrinking doughnut.

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