We prove the equivalence of the curvature-dimension bounds of Lott-Sturm-Villani (via entropy and optimal transport) and of Bakry-Émery (via energy and Γ2-calculus) in complete generality for infinitesimally Hilbertian metric measure spaces. In particular, we establish the full Bochner inequality on such metric measure spaces. Moreover, we deduce new contraction bounds for the heat flow on Riemannian manifolds and on mms in terms of the L 2 -Wasserstein distance.
We establish a duality between L p -Wasserstein control and L q -gradient estimate in a general framework. Our result extends a known result for a heat flow on a Riemannian manifold. Especially, we can derive a Wasserstein control of a heat flow directly from the corresponding gradient estimate of the heat semigroup without using any other notion of lower curvature bound. By applying our result to a subelliptic heat flow on a Lie group, we obtain a coupling of heat distributions which carries a good control of their relative distance.
We study the problem of non-explosion of diffusion processes on a manifold with time-dependent Riemannian metric. In particular we obtain that Brownian motion cannot explode in finite time if the metric evolves under backwards Ricci flow. Our result makes it possible to remove the assumption of non-explosion in the pathwise contraction result established by Arnaudon et al. (arXiv:0904.2762, to appear in Sém. Prob.). As an important tool which is of independent interest we derive an Itô formula for the distance from a fixed reference point, generalising a result of Kendall (Ann. Prob. 15:1491-1500, 1987.Keywords Ricci flow · Diffusion process · Non-explosion · Radial process Mathematics Subject Classification (2000) 53C21 · 53C44 · 58J35 · 60J60
Brownian motion with respect to time-changing Riemannian metricsLet M be a d-dimensional differentiable manifold with d ≥ 2, π : F (M) → M the frame bundle and (g(t)) t∈[0,T ] a family of Riemannian metrics on M depending smoothly on t such that (M, g(t)) is geodesically complete for all tβ=1 be the canonical vertical vector fields. Let (W t ) t≥0 be a standard R d -valued Brownian motion. In this situation Arnaudon et al. [1,5] defined horizontal Brownian motion on F (M) as the solution of the K. Kuwada was partially supported by the JSPS fellowship for research abroad.
scite is a Brooklyn-based organization that helps researchers better discover and understand research articles through Smart Citations–citations that display the context of the citation and describe whether the article provides supporting or contrasting evidence. scite is used by students and researchers from around the world and is funded in part by the National Science Foundation and the National Institute on Drug Abuse of the National Institutes of Health.