Add to ORKGWe study a generalization of the Bakry-\'Emery pointwise gradient estimate for the heat semigroup and its equivalence with some entropic inequalities along the heat flow and Wasserstein geodesics for metric-measure spaces with a suitable group structure. Our main result applies to Carnot groups of any step and to the $\mathbb{SU}(2)$ group.Comment: 76 page
International audienceWe develop connections between Harnack inequalities for the heat flow of diffu...
peer reviewedUsing the curvature-dimension inequality proved in Part I, we look at consequences of t...
The paper proves transportation inequalities for probability measures on spheres for the Wasserstein...
We prove the correspondence between the solutions of the sub-elliptic heat equation in a Carnot grou...
In this article, exponential contraction in Wasserstein distance for heat semigroups of diffusion pr...
AbstractLet G be a connected Lie group with the Lie algebra G. The action of Cameron–Martin space H(...
13International audienceWe prove a refined contraction inequality for diffusion semigroups with resp...
International audienceWe study metric contraction properties for metric spaces associated with left-...
The theory of curvature-dimension bounds for nonsmooth spaces has several motivations: the study of ...
AbstractThe Dirichlet form on the loop group Le(G) with respect to the heat measure defines a Laplac...
This paper is devoted to a deeper understanding of the heat flow and to the refinement of calculus t...
We provide a quick overview of various calculus tools and of the main results concerning the heat fl...
International audienceThe curvature-dimension condition is a generalization of the Bochner inequalit...
In this paper we introduce a synthetic notion of Riemannian Ricci bounds from below for metric meas...
International audienceWe develop connections between Harnack inequalities for the heat flow of diffu...
peer reviewedUsing the curvature-dimension inequality proved in Part I, we look at consequences of t...
The paper proves transportation inequalities for probability measures on spheres for the Wasserstein...
We prove the correspondence between the solutions of the sub-elliptic heat equation in a Carnot grou...
In this article, exponential contraction in Wasserstein distance for heat semigroups of diffusion pr...
AbstractLet G be a connected Lie group with the Lie algebra G. The action of Cameron–Martin space H(...
13International audienceWe prove a refined contraction inequality for diffusion semigroups with resp...
International audienceWe study metric contraction properties for metric spaces associated with left-...
The theory of curvature-dimension bounds for nonsmooth spaces has several motivations: the study of ...
AbstractThe Dirichlet form on the loop group Le(G) with respect to the heat measure defines a Laplac...
This paper is devoted to a deeper understanding of the heat flow and to the refinement of calculus t...
We provide a quick overview of various calculus tools and of the main results concerning the heat fl...
International audienceThe curvature-dimension condition is a generalization of the Bochner inequalit...
In this paper we introduce a synthetic notion of Riemannian Ricci bounds from below for metric meas...
International audienceWe develop connections between Harnack inequalities for the heat flow of diffu...
peer reviewedUsing the curvature-dimension inequality proved in Part I, we look at consequences of t...
The paper proves transportation inequalities for probability measures on spheres for the Wasserstein...