Diffusion processes and heat kernels on metric spaces
成果类型:
Article
署名作者:
Sturm, KT
署名单位:
University of Bonn
刊物名称:
ANNALS OF PROBABILITY
ISSN/ISSBN:
0091-1798
发表日期:
1998
页码:
1-55
关键词:
local dirichlet spaces
INEQUALITY
forms
media
摘要:
We present a general method to construct m-symmetric diffusion processes (X-t,P-x) on any given locally compact metric space (X,d) equipped with a Radon measure m. These processes are associated with local regular Dirichlet forms which are obtained as Gamma-limits of approximating nonlocal Dirichlet forms. This general method works without any restrictions on (X, d, m) and yields processes which are well defined for quasi every starting point. The second main topic of this paper is to formulate and exploit the so-called Measure Contraction Property. This is a condition on the original data (X, cl, m) which can be regarded as a generalization of curvature bounds on the metric space (X, cl). It is a bound for distortions of the measure m under contractions of the state space X along suitable geodesics (or quasi geodesics) w.r.t. the metric d. In the case of Riemannian manifolds, this condition is always satisfied. Several other examples will be discussed, including uniformly elliptic operators, operators with weights, certain subelliptic operators, manifolds with boundaries or corners and glueing together of manifolds. The Measure Contraction Property implies (upper and lower) Gaussian estimates for the heat kernel and a Harnack inequality for the associated harmonic functions. Therefore, the above-mentioned diffusion processes are strong Feller processes and are well defined for every starting point.