Complete self-shrinkers with bounded the second fundamental form in Rn+1
Abstract
Let X:Mn Rn+1 be a complete properly immersed self-shrinker. In this paper, we prove that if the squared norm of the second fundamental form S satisfies 1≤ S< C for some constant C, then S=1. Further we classify the n-dimensional complete proper self-shrinkers with constant squared norm of the second fundamental form in Rn+1, which solve the conjecture proposed by Q.M. Cheng and G. Wei when the self-shrinker is proper.
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