论文信息 - On the geometry and topology of manifolds of positive bi-Ricci curvature

On the geometry and topology of manifolds of positive bi-Ricci curvature

We introduce some new curvature quantities such as conformal Ricci curvature and bi-Ricci curvature and extend the classical Myers theorem under these new curvature conditions. Moreover, we are able to obtain the Myers type theorem for minimal submanifolds in ambient manifolds with positive bi-Ricci curvature. Some topological applications are discussed. We also give examples of manifolds of positive bi-Ricci curvature and prove that the connect sum of manifolds of positive bi-Ricci curvature admits metrics of positive bi-Ricci curvature.

R. Ye | Ying Shen

[1] Shunhui Zhu,et al. Ricci curvature, minimal surfaces and sphere theorems , 1997, dg-ga/9709002.

[2] R. Ye,et al. On stable minimal surfaces in manifolds of positive bi-Ricci curvatures , 1996 .

[3] L. Simon. SURVEY LECTURES ON MINIMAL SUBMANIFOLDS , 1984 .

[4] S. Yau,et al. The existence of a black hole due to condensation of matter , 1983 .

[5] M. Gromov,et al. The Classification of Simply Connected Manifolds of Positive Scalar Curvature Author ( s ) : , 2010 .

[6] Richard Schoen,et al. The structure of complete stable minimal surfaces in 3-manifolds of non-negative scalar curvature , 1980 .

[7] S. Myers,et al. Riemannian manifolds with positive mean curvature , 1941 .

[8] Thierry Aubin. The Ricci Curvature , 1998 .

[9] J. Eschenburg. Comparison Theorems in Riemannian Geometry , 1994 .

[10] S. Yau,et al. On the structure of manifolds with positive scalar curvature , 1979 .