Dimension-Free Harnack Inequalities on Spaces

被引:0
|
作者
Li, Huaiqian [1 ,2 ]
机构
[1] Sichuan Univ, Sch Math, Chengdu 610064, Peoples R China
[2] Macquarie Univ, Dept Math, Sydney, NSW 2109, Australia
来源
JOURNAL OF THEORETICAL PROBABILITY | 2016年 / 29卷 / 04期
基金
澳大利亚研究理事会; 中国国家自然科学基金;
关键词
Harnack inequality; Heat semigroup; Metric measure space; Riemannian curvature; METRIC-MEASURE-SPACES; LOGARITHMIC SOBOLEV INEQUALITIES; RICCI CURVATURE; ALEXANDROV SPACES; HEISENBERG-GROUP; HEAT KERNEL; OPERATORS; GEOMETRY; BOUNDS; ULTRACONTRACTIVITY;
D O I
10.1007/s10959-015-0621-0
中图分类号
O21 [概率论与数理统计]; C8 [统计学];
学科分类号
020208 ; 070103 ; 0714 ;
摘要
The dimension-free Harnack inequality for the heat semigroup is established on the space, which is a non-smooth metric measure space having the Ricci curvature bounded from below in the sense of Lott-Sturm-Villani plus the Cheeger energy being quadratic. As its applications, the heat semigroup entropy-cost inequality and contractivity properties of the semigroup are studied, and a strong-enough Gaussian concentration implying the log-Sobolev inequality is also shown as a generalization of the one on the smooth Riemannian manifold.
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页码:1280 / 1297
页数:18
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