AbstractWe improve the well-known scalar curvature pinching theorem due to Peng–Terng for n (n⩽5)-dimensional minimal hypersurfaces to the case of arbitrary n. Precisely, if M is a closed and minimal hypersurface in a unit sphere Sn+1, then there exists a positive constant δ(n) depending only on n such that if n⩽S⩽n+δ(n), then S≡n, i.e., M is a Clifford torus Sk(kn)×Sn−k(n−kn), k=1,2,…,n−1
AbstractWe investigate the immersed hypersurfaces in a unit sphere Sn+1(1). By using Otsuki's idea, ...
AbstractLet x:M→Sn+p be an n-dimensional submanifold in the unit sphere Sn+p and denote by H and S t...
AbstractIn this paper, by investigating compact rotational hypersurfaces Mn in a unit sphere Sn+1(1)...
AbstractWe improve the well-known scalar curvature pinching theorem due to Peng–Terng for n (n⩽5)-di...
AbstractFor a compact minimal hypersurface M in Sn+1 with the squared length of the second fundament...
summary:In this paper, by using Cheng-Yau's self-adjoint operator $\square$, we study the complete h...
AbstractLet Mn be a complete hypersurface in Sn+1(1) with constant mean curvature. Assume that Mn ha...
AbstractBy investigating hypersurfaces Mn in the unit sphere Sn+1(1) with Hk=0 and with two distinct...
AbstractWe prove some pinching results for the extrinsic radius of compact hypersurfaces in space fo...
In this paper, we give pinching Theorems for the first nonzero eigenvalue $\lambda$ of the Laplacian...
AbstractLet (Mn,g), n⩾3, be a smooth closed Riemannian manifold with positive scalar curvature Rg. T...
In this paper we study n-dimensional compact minimal submanifolds in Sn+p with scalar curvature S sa...
AbstractIn this paper, we proved the Normal Scalar Curvature Conjecture and the Böttcher–Wenzel Conj...
It is the purpose of this article to discuss ccmplete submanifolds in spheres.Complete submanifolds ...
presented by Manfredo do Carmo Let M be an n-dimensional closed minimally immersed hypersurface in t...
AbstractWe investigate the immersed hypersurfaces in a unit sphere Sn+1(1). By using Otsuki's idea, ...
AbstractLet x:M→Sn+p be an n-dimensional submanifold in the unit sphere Sn+p and denote by H and S t...
AbstractIn this paper, by investigating compact rotational hypersurfaces Mn in a unit sphere Sn+1(1)...
AbstractWe improve the well-known scalar curvature pinching theorem due to Peng–Terng for n (n⩽5)-di...
AbstractFor a compact minimal hypersurface M in Sn+1 with the squared length of the second fundament...
summary:In this paper, by using Cheng-Yau's self-adjoint operator $\square$, we study the complete h...
AbstractLet Mn be a complete hypersurface in Sn+1(1) with constant mean curvature. Assume that Mn ha...
AbstractBy investigating hypersurfaces Mn in the unit sphere Sn+1(1) with Hk=0 and with two distinct...
AbstractWe prove some pinching results for the extrinsic radius of compact hypersurfaces in space fo...
In this paper, we give pinching Theorems for the first nonzero eigenvalue $\lambda$ of the Laplacian...
AbstractLet (Mn,g), n⩾3, be a smooth closed Riemannian manifold with positive scalar curvature Rg. T...
In this paper we study n-dimensional compact minimal submanifolds in Sn+p with scalar curvature S sa...
AbstractIn this paper, we proved the Normal Scalar Curvature Conjecture and the Böttcher–Wenzel Conj...
It is the purpose of this article to discuss ccmplete submanifolds in spheres.Complete submanifolds ...
presented by Manfredo do Carmo Let M be an n-dimensional closed minimally immersed hypersurface in t...
AbstractWe investigate the immersed hypersurfaces in a unit sphere Sn+1(1). By using Otsuki's idea, ...
AbstractLet x:M→Sn+p be an n-dimensional submanifold in the unit sphere Sn+p and denote by H and S t...
AbstractIn this paper, by investigating compact rotational hypersurfaces Mn in a unit sphere Sn+1(1)...
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