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7 results on '"Gu, Juanru"'

1. The topological rigidity theorem for submanifolds in space forms

Author

Gu, Juanru and Xu, Hongwei

Subjects
Mathematics - Differential Geometry
Abstract

Let $M$ be an $n(\geq 4)$-dimensional compact submanifold in the simply connected space form $F^{n+p}(c)$ with constant curvature $c\geq 0$, where $H$ is the mean curvature of $M$. We verify that if the scalar curvature of $M$ satisfies $R>n(n-2)(c+H^2)$, and if $Ric_M\geq (n-2-\frac{2\sigma_n}{2n-\sigma_n})(c+H^2)$, then $M$ is homeomorphic to a sphere. Here $\sigma_n=sgn(n-4)((-1)^n+3)$, and $sgn(\cdot)$ is the standard sign function. This improves our previous sphere theorem \cite{XG2}. It should be emphasized that our pinching conditions above are optimal. We also obtain some new topological sphere theorems for submanifolds with pinched scalar curvature and Ricci curvature., Comment: 16 pages

Published
2019

2. A new gap for complete hypersurfaces with constant mean curvature in space forms

Author

Gu, Juanru, Lei, Li, and Xu, Hongwei

Subjects
Mathematics - Differential Geometry
Abstract

Let $M$ be an $n$-dimensional closed hypersurface with constant mean curvature and constant scalar curvature in an unit sphere. Denote by $H$ and $S$ the mean curvature and the squared length of the second fundamental form respectively. We prove that if $S > \alpha (n, H)$, where $n\geq 4$ and $H\neq 0$, then $S > \alpha (n, H) + B_n\frac{n H^2}{n - 1}$. Here \[ \alpha (n, H) = n + \frac{n^3}{2 (n - 1)} H^2 - \frac{n (n - 2)}{2 (n - 1)}\sqrt{n^2 H^4 + 4 (n - 1) H^2}, \] $B_n=\frac{1}{5}$ for $4\leq n \leq 20$, and $B_n=\frac{49}{250}$ for $n>20$. Moreover, we obtain a gap theorem for complete hypersurfaces with constant mean curvature and constant scalar curvature in space forms., Comment: 13 pages

Published
2018

3. Submanifolds with constant scalar curvature in space forms.

Author

Gu, Juanru and Lu, Yao

Subjects
*SPACES of constant curvature, *SELFADJOINT operators, *CURVATURE, *SPHERES
Abstract

Let M be an n-dimensional oriented compact submanifold with constant normalized scalar curvature R ≥ c in the space form Fn+p(c). Denote by H and RicM the mean curvature and the Ricci curvature of M respectively. By applying Cheng-Yau’s self-adjoint operator, we first prove that if M is a hypersurface in a unit sphere, and RicM ≥ (n−2)(1+H2), then M is totally umbilical. Furthermore, we investigate the submanifolds in Fn+p(c) with flat normal bundle satisfying RicM ≥ (n − 2)(c + H2) > 0, and obtain a complete classification theorem. [ABSTRACT FROM AUTHOR]

Published
2024
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