We prove the correspondence between the solutions of the sub-elliptic heat equation in a Carnot group G and the gradient flows of the relative entropy functional in the Wasserstein space of probability measures on G. Our result completely answers a question left open in a previous paper by N. Juillet, where the same correspondence was proved for G = Hn, the n-dimensional Heisenberg group
In this paper we study the generalized mean curvature flow of sets in the sub-Riemannian geometry of...
In this thesis, we examine key geometric properties of a class of Carnot groups of Heisenberg type. ...
none2In this paper we study the generalized mean curvature flow of sets in the sub-Riemannian geomet...
We prove the correspondence between the solutions of the sub-elliptic heat equation in a Carnot grou...
We prove the correspondence between the solutions of the sub-elliptic heat equation in a Carnot grou...
The contents of this thesis are an assortment of results in analysis and subRiemannian geometry, wit...
We introduce a sub-Riemannian analogue of the Bence-Merriman-Osher algorithm (Merriman et al., 1992 ...
We introduce a sub-Riemannian analogue of the Bence-Merriman-Osher algorithm (Merriman et al., 1992 ...
We introduce a sub-Riemannian analogue of the Bence-Merriman-Osher algorithm (Merriman et al., 1992 ...
In this paper we study heat kernels associated with a Carnot group G, endowed with a family of colla...
none3siIn this paper we study heat kernels associated with a Carnot group G, endowed with a family o...
In this paper we study heat kernels associated with a Carnot group G, endowed with a family of colla...
In this paper we study the generalized mean curvature flow of sets in the sub-Riemannian geometry of...
In this paper we study the generalized mean curvature flow of sets in the sub-Riemannian geometry of...
In this thesis, we examine key geometric properties of a class of Carnot groups of Heisenberg type. ...
In this paper we study the generalized mean curvature flow of sets in the sub-Riemannian geometry of...
In this thesis, we examine key geometric properties of a class of Carnot groups of Heisenberg type. ...
none2In this paper we study the generalized mean curvature flow of sets in the sub-Riemannian geomet...
We prove the correspondence between the solutions of the sub-elliptic heat equation in a Carnot grou...
We prove the correspondence between the solutions of the sub-elliptic heat equation in a Carnot grou...
The contents of this thesis are an assortment of results in analysis and subRiemannian geometry, wit...
We introduce a sub-Riemannian analogue of the Bence-Merriman-Osher algorithm (Merriman et al., 1992 ...
We introduce a sub-Riemannian analogue of the Bence-Merriman-Osher algorithm (Merriman et al., 1992 ...
We introduce a sub-Riemannian analogue of the Bence-Merriman-Osher algorithm (Merriman et al., 1992 ...
In this paper we study heat kernels associated with a Carnot group G, endowed with a family of colla...
none3siIn this paper we study heat kernels associated with a Carnot group G, endowed with a family o...
In this paper we study heat kernels associated with a Carnot group G, endowed with a family of colla...
In this paper we study the generalized mean curvature flow of sets in the sub-Riemannian geometry of...
In this paper we study the generalized mean curvature flow of sets in the sub-Riemannian geometry of...
In this thesis, we examine key geometric properties of a class of Carnot groups of Heisenberg type. ...
In this paper we study the generalized mean curvature flow of sets in the sub-Riemannian geometry of...
In this thesis, we examine key geometric properties of a class of Carnot groups of Heisenberg type. ...
none2In this paper we study the generalized mean curvature flow of sets in the sub-Riemannian geomet...
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