Ricci solitons 一方面是爱因斯坦度量标准的自然归纳,并且在另一方面是哈密尔顿的 Ricci 流动的特殊答案.在这篇论文,我们在他们在 Ricci 流动的奇特学习玩的 Ricci solitons 和角色上调查一些最近的开发.Huai-Dong CAO数学年刊B辑(英文版)H.-D. Cao, Geometry of Ricci solitons. Chinese Ann. Math. Ser. B, 27...
Geometry of Ricci Solitons* Ricci solitons are natural generalizations of Einstein metrics on one hand, andare special solutions of the Ricci flow of Hamilton on the other hand. In th... H Cao - 《Chinese Annals of Mathematics》 被引量: 0发表: 2006年 ...
Marco RigoliOn the geometry of complete Ricci solitons. P.MASTROLIA,M.RIGOLI. . 2010P. Mastrolia and M. Rigoli. On the geometry of complete Ricci solitons. arXiv:1009.1480v1 [mathDG], 2010.P. MASTROLIA, M. RIGOLI. On the geometry of complete Ricci solitons. arXiv:1009.1480v1 [...
We show that a compact contact Ricci soliton with a potential vector field V collinear with the Reeb vector field, is Einstein. We also show that a homogeneous H-contact gradient Ricci soliton is locally isometric to E(n+1) x S(n) (4). Finally we obtain
JDG 2017_ Huai-Dong Cao_ Geometry and Stability of Ricci Solitons 01:01:24 JDG 2017_ Jean-Pierre Demailly_ L^2 Extension Theorem 43:01 JDG 2017_ Larry Guth_ Efficiently contracting contractible maps 52:38 JDG 2017_ Steve Zelditch_ Local and global analysis of nodal sets 01:02:45 ...
Chaos Solitons Fractals 101, 50–67 (2017). MathSciNet MATH ADS Google Scholar Samal, A. et al. Comparative analysis of two discretizations of Ricci curvature for complex networks. Sci. Rep. 8, 8650 (2018). ADS Google Scholar Prokhorenkova, L., Samosvat, E. & van der Hoorn, P....
Anti-invariant submanifolds of locally decomposable golden Riemannian manifolds Gök, M.Kiliç, E.Keleş, S. 47-60 Classification of Ricci solitons Li, J.N.Gao, X. 61-83 Characterization of real hypersurfaces in a nonflat complex space form having a special shape operator Lim, Dong...
In this paper we introduce the notion of Einstein-type structure on a Riemannian manifold $\\varrg$, unifying various particular cases recently studied in the literature, such as gradient Ricci solitons, Yamabe solitons and quasi-Einstein manifolds. We show that these general structures can be ...
Akiyama, Applications of Nonstandard Analysis to Stochastic Flows and Heat Kernels on Manifolds. Y. Watanabe, Hamiltonian Structure and Formal Complete Integrability of Third-Order Evolution Equations of Not Normal Type. A. Yoshioka, The Quasi-Classical Calculation of Eigenvalues for the Bochner-...
Some Geometry and Analysis on Ricci Solitons The Bakry-Emery Ricci tensor of a metric-measure space (M,g,e^{-f}dv_{g}) plays an important role in both geometric measure theory and the study of Hamilto... A Naber - 《Mathematics》 被引量: 47发表: 2006年 ...