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A new pinching theorem for complete self-shrinkers and its generalization

arXiv:1712.01899

Abstract

In this paper, we firstly verify that if $M$ is a complete self-shrinker with polynomial volume growth in $\mathbb{R}^{n+1}$, and if the squared norm of the second fundamental form of $M$ satisfies $0\leq|A|^2-1\leq\frac{1}{18}$, then $|A|^2\equiv1$ and $M$ is a round sphere or a cylinder. More generally, let $M$ be a complete $λ$-hypersurface with polynomial volume growth in $\mathbb{R}^{n+1}$ with $λ\neq0$. Then we prove that there exists an positive constant $γ$, such that if $|λ|\leqγ$ and the squared norm of the second fundamental form of $M$ satisfies $0\leq|A|^2-β_λ\leq\frac{1}{18}$, then $|A|^2\equiv β_λ$, $λ>0$ and $M$ is a cylinder. Here $β_λ=\frac{1}{2}(2+λ^2+|λ|\sqrt{λ^2+4})$.

14 pages