We prove that any Kantorovich potential for the distance-squared cost function on a Riemannian manifold is locally semiconvex in the “region of interest”, without any compactness assumption on M, nor any assumption on its curvature. Such a region of interest is of full \mu-measure as soon as the starting measure \mu does not charge n – 1-dimensional rectifiable sets
We analyze the lower semicontinuous envelope of the curvature functional of Cartesian surfaces in co...
Abstract. Given a continuous viscosity solution of a Dirichlet-type Hamilton-Jacobi equation, we sho...
We investigate whether the identification between Cannes' spectral distance in noncommutative geomet...
We prove that any Kantorovich potential for the cost function c = d2/2 on a Riemannian manifold (M, ...
We prove that any Kantorovich potential for the cost function c = d2/2 on a Riemannian manifold (M, ...
In this thesis we study the regularity properties of solutions to the Kantorovich optimal transporta...
AbstractWe address the question of how to represent Kantorovich potentials in the mass transportatio...
International audienceIn this paper we consider the optimal mass transport problem for relativistic ...
International audienceIn this paper we consider the optimal mass transport problem for relativistic ...
We study optimal transportation with the quadratic cost function in geodesic metric spaces satisfyi...
We study optimal transportation with the quadratic cost function in geodesic metric spaces satisfyi...
International audienceWe introduce a general notion of transport cost that encompasses many costs us...
We introduce a new class of distances between nonnegative Radon measures on the euclidean space. The...
Abstract. We introduce a general notion of transport cost that encompasses many costs used in the li...
International audienceThe purpose of the present paper is to establish comprehensive and systematic ...
We analyze the lower semicontinuous envelope of the curvature functional of Cartesian surfaces in co...
Abstract. Given a continuous viscosity solution of a Dirichlet-type Hamilton-Jacobi equation, we sho...
We investigate whether the identification between Cannes' spectral distance in noncommutative geomet...
We prove that any Kantorovich potential for the cost function c = d2/2 on a Riemannian manifold (M, ...
We prove that any Kantorovich potential for the cost function c = d2/2 on a Riemannian manifold (M, ...
In this thesis we study the regularity properties of solutions to the Kantorovich optimal transporta...
AbstractWe address the question of how to represent Kantorovich potentials in the mass transportatio...
International audienceIn this paper we consider the optimal mass transport problem for relativistic ...
International audienceIn this paper we consider the optimal mass transport problem for relativistic ...
We study optimal transportation with the quadratic cost function in geodesic metric spaces satisfyi...
We study optimal transportation with the quadratic cost function in geodesic metric spaces satisfyi...
International audienceWe introduce a general notion of transport cost that encompasses many costs us...
We introduce a new class of distances between nonnegative Radon measures on the euclidean space. The...
Abstract. We introduce a general notion of transport cost that encompasses many costs used in the li...
International audienceThe purpose of the present paper is to establish comprehensive and systematic ...
We analyze the lower semicontinuous envelope of the curvature functional of Cartesian surfaces in co...
Abstract. Given a continuous viscosity solution of a Dirichlet-type Hamilton-Jacobi equation, we sho...
We investigate whether the identification between Cannes' spectral distance in noncommutative geomet...
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