We generalize the second pinching theorem for minimal hypersurfaces in asphere due to Peng-Terng, Wei-Xu, Zhang, and Ding-Xin to the case ofhypersurfaces with small constant mean curvature. Let $M^n$ be a compacthypersurface with constant mean curvature $H$ in $\mathbb{S}^{n+1}$. Denote by$S$ the squared norm of the second fundamental form of $M$. We prove that thereexist two positive constants $\gamma(n)$ and $\delta(n)$ depending only on $n$such that if $|H|\leq\gamma(n)$ and $\beta(n,H)\leq S\leq\beta(n,H)+\delta(n)$,then $S\equiv\beta(n,H)$ and $M$ is one of the following cases: (i)$\mathbb{S}^{k}(\sqrt{\frac{k}{n}})\times\mathbb{S}^{n-k}(\sqrt{\frac{n-k}{n}})$, $\,1\le k\le n-1$; (ii)$\mathbb{S}^{1}(\frac{1}{\sqrt{1+\mu^2}})\times\mathbb{S}^{n-1}(\frac{\mu}{\sqrt{1+\mu^2}})$. Here$\beta(n,H)=n+\frac{n^3}{2(n-1)}H^2+\frac{n(n-2)}{2(n-1)}\sqrt{n^2H^4+4(n-1)H^2}$and $\mu=\frac{n|H|+\sqrt{n^2H^2+4(n-1)}}{2}$.
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机译:我们将由于Peng-Terng,Wei-Xu,Zhang和Ding-Xin引起的非球面极小超曲面的第二个捏定理推广到恒定曲率较小的超曲面的情况。假设$ M ^ n $是一个常数曲面,在$ \ mathbb {S} ^ {n + 1} $中具有恒定平均曲率$ H $。用$ S $表示$ M $的第二种基本形式的平方范数。我们证明存在两个正常数$ \ gamma(n)$和$ \ delta(n)$仅取决于$ n $,使得如果$ | H | \ leq \ gamma(n)$和$ \ beta(n, H)\ leq S \ leq \ beta(n,H)+ \ delta(n)$,则$ S \ equiv \ beta(n,H)$和$ M $是以下情况之一:(i)$ \ mathbb {S} ^ {k}(\ sqrt {\ frac {k} {n}})\ times \ mathbb {S} ^ {nk}(\ sqrt {\ frac {nk} {n}})$, $ \,1 \ le k \ le n-1 $; (ii)$ \ mathbb {S} ^ {1}(\ frac {1} {\ sqrt {1+ \ mu ^ 2}})\ times \ mathbb {S} ^ {n-1}(\ frac {\ mu} {\ sqrt {1+ \ mu ^ 2}})$。这里$ \ beta(n,H)= n + \ frac {n ^ 3} {2(n-1)} H ^ 2 + \ frac {n(n-2)} {2(n-1)} \ sqrt {n ^ 2H ^ 4 + 4(n-1)H ^ 2} $和$ \ mu = \ frac {n | H | + \ sqrt {n ^ 2H ^ 2 + 4(n-1)}} {2 } $。
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