The compact minimal submanifold in a locally symetric and conformally flat Riemann manifold is discussed in this paper.We get the Pinching constant for scalar curvature.The result of Li[2]is generallied,but the method...The compact minimal submanifold in a locally symetric and conformally flat Riemann manifold is discussed in this paper.We get the Pinching constant for scalar curvature.The result of Li[2]is generallied,but the method is completely different. Meanwhile,we get better conclusion than that of [3].We also research the Pinching problem for sectional curvature on compact minimal submanifolds in a unit sphere, partially improving the results of S.T.Yan[4].展开更多
In this paper we study on gradient quasi-Einstein solitons with a fourth-order vanishing condition on the Weyl tensor.More precisely,we show that for n≥4,the Cotton tensor of any ndimensional gradient quasi-Einstein ...In this paper we study on gradient quasi-Einstein solitons with a fourth-order vanishing condition on the Weyl tensor.More precisely,we show that for n≥4,the Cotton tensor of any ndimensional gradient quasi-Einstein soliton with fourth order f-divergence free Weyl tensor is flat,if the manifold is compact,or noncompact but the potential function satisfies some growth condition.As corollaries,some local characterization results for the quasi-Einstein metrics are derived.展开更多
文摘The compact minimal submanifold in a locally symetric and conformally flat Riemann manifold is discussed in this paper.We get the Pinching constant for scalar curvature.The result of Li[2]is generallied,but the method is completely different. Meanwhile,we get better conclusion than that of [3].We also research the Pinching problem for sectional curvature on compact minimal submanifolds in a unit sphere, partially improving the results of S.T.Yan[4].
文摘In this paper we study on gradient quasi-Einstein solitons with a fourth-order vanishing condition on the Weyl tensor.More precisely,we show that for n≥4,the Cotton tensor of any ndimensional gradient quasi-Einstein soliton with fourth order f-divergence free Weyl tensor is flat,if the manifold is compact,or noncompact but the potential function satisfies some growth condition.As corollaries,some local characterization results for the quasi-Einstein metrics are derived.
