In view of studying incompressible inviscid fluids, Brenier introduced in the late 80's a relaxation of a geodesic problem addressed by Arnold in 1966. Instead of inviscid fluids, the present paper is devoted to incompressible viscid fluids. A natural analogue of Brenier's problem is introduced, where generalized flows are no more supported by absolutely continuous paths, but by Brownian sample paths. It turns out that this new variational problem is an entropy minimization problem with marginal constraints entering the class of convex minimization problems. This paper explores the connection between this variational problem and Brenier's original problem. Its dual problem is derived and the general shape of its solution is described. Under...
Monge-Kantorovich optimal mass transport (OMT) provides a blueprint for geometries in the space of p...
International audienceWe study Brenier's variational models for incompressible Euler equations. Thes...
Abstract. In this manuscript we extend De Giorgi’s interpolation method to a class of para-bolic equ...
In view of studying incompressible inviscid fluids, Brenier introduced in the late 80's a relaxation...
In view of studying incompressible inviscid fluids, Brenier introduced in the late 80's a relaxation...
In this article we investigate entropic interpolations. These measure valued curves describe the opt...
We discuss two examples of "dynamical optimal transport problems", whose formulations involve a rela...
We study generalizations of the Schrödinger problem in statistical mechanics in two directions: when...
In this paper we prove a convexity property of the relative entropy along entropic interpolations (s...
This thesis focuses on Incompressible Optimal Transport, a minimization problem introduced by Brenie...
Abstract: A new variational principle for deriving the discontinuous Galerkin method modif...
We study the multiphasic formulation of the incompressible Euler equation introduced by Brenier: inf...
We deal with a single conservation law in one space dimension whose flux function is discontinuous i...
Starting from Brenier's relaxed formulation of the incompress-ible Euler equation in terms of geodes...
We show that, for first-order systems of conservation laws with a strictly convex entropy,in particu...
Monge-Kantorovich optimal mass transport (OMT) provides a blueprint for geometries in the space of p...
International audienceWe study Brenier's variational models for incompressible Euler equations. Thes...
Abstract. In this manuscript we extend De Giorgi’s interpolation method to a class of para-bolic equ...
In view of studying incompressible inviscid fluids, Brenier introduced in the late 80's a relaxation...
In view of studying incompressible inviscid fluids, Brenier introduced in the late 80's a relaxation...
In this article we investigate entropic interpolations. These measure valued curves describe the opt...
We discuss two examples of "dynamical optimal transport problems", whose formulations involve a rela...
We study generalizations of the Schrödinger problem in statistical mechanics in two directions: when...
In this paper we prove a convexity property of the relative entropy along entropic interpolations (s...
This thesis focuses on Incompressible Optimal Transport, a minimization problem introduced by Brenie...
Abstract: A new variational principle for deriving the discontinuous Galerkin method modif...
We study the multiphasic formulation of the incompressible Euler equation introduced by Brenier: inf...
We deal with a single conservation law in one space dimension whose flux function is discontinuous i...
Starting from Brenier's relaxed formulation of the incompress-ible Euler equation in terms of geodes...
We show that, for first-order systems of conservation laws with a strictly convex entropy,in particu...
Monge-Kantorovich optimal mass transport (OMT) provides a blueprint for geometries in the space of p...
International audienceWe study Brenier's variational models for incompressible Euler equations. Thes...
Abstract. In this manuscript we extend De Giorgi’s interpolation method to a class of para-bolic equ...