Isoperimetric conditions, poisson problems, and diffusions in Riemannian manifolds

McDonald P.

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Isoperimetric conditions, poisson problems, and diffusions in Riemannian manifolds

机译：黎曼流形中的等渗条件，泊松问题和扩散

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Let (M,g) be a complete Riemannian manifold. We study exit time moments of natural diffusions from smoothly bounded domains in M with compact closure. Our results give relationships between bounds on the exit time moments and their corresponding averages (over the associated domain), and the global geometry of M. In particular, for averaged moments of Brownian motion, we prove an analog of the Faber-Krahn theorem. [References: 21]

机译：令（M，g）为完整的黎曼流形。我们研究了具有紧闭的M中平滑边界域的自然扩散的退出时刻。我们的结果给出了出口时刻的边界与其对应的平均值（在关联域上）和M的整体几何之间的关系。特别是，对于布朗运动的平均时刻，我们证明了Faber-Krahn定理的类似物。 [参考：21]

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《Potential analysis: An international journal devoted to the interactions between potential theory, probability theory, geometry and functional analysis》 |2002年第2期|共24页
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McDonald P.;
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1. Isoperimetric conditions, poisson problems, and diffusions in Riemannian manifolds [J] . McDonald P. Potential analysis: An international journal devoted to the interactions between potential theory, probability theory, geometry and functional analysis . 2002,第2期

机译：黎曼流形中的等渗条件，泊松问题和扩散
2. Existence of isoperimetric regions in non-compact Riemannian manifolds under Ricci or scalar curvature conditions [J] . Mondino Andrea, Nardulli Stefano Communications in analysis and geometry . 2016,第1期

机译：Ricci或标量曲率条件下非紧致黎曼流形中等压区域的存在
3. Keller-Osserman conditions for diffusion-type operators on Riemannian manifolds [J] . Mari L, Rigoli M, Setti AG Journal of Functional Analysis . 2010,第2期

机译：黎曼流形上扩散型算子的Keller-Osserman条件
4. Non-symmetric diffusions on a Riemannian manifold [C] . Ichiro Shigekawa Conference on Probabilistic Approach to Geometry . 2010

机译：在riemannian歧管上的非对称扩散
5. Isoperimetric inequalities and the first eigenvalue of the Laplacian on a Riemannian manifold. [D] . Craig, Gordon. 1999

机译：黎曼流形上拉普拉斯算术的等值不等式和第一个特征值。
6. Multivariate General Linear Models (MGLM) on Riemannian Manifolds with Applications to Statistical Analysis of Diffusion Weighted Images [O] . Hyunwoo J. Kim, Nagesh Adluru, Maxwell D. Collins, -1

机译：黎曼流形上的多元通用线性模型（MGLM）及其在扩散加权图像统计分析中的应用
7. Existence of isoperimetric regions in non-compact Riemannian manifolds under Ricci or scalar curvature conditions [O] . Mondino, Andrea, Nardulli, Stefano 2012

机译：非紧致黎曼流形中等周区域的存在性在Ricci或标量曲率条件下
8. Isoperimetric Inequalities for Two- Dimensional Riemannian Manifolds [R] . Hsiung, C. C. 1960

机译：二维黎曼流形的等周不等式

Isoperimetric conditions, poisson problems, and diffusions in Riemannian manifolds

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