International audienceWe consider L2 minimizing geodesics along the group of volume preserving maps SDiff(D) of a given 3-dimensional domain D. The corresponding curves describe the motion of an ideal incompressible fluid inside D and are (formally) solutions of the Euler equations. It is known that there is a unique possible pressure gradient for these curves whenever their end points are fixed. In addition, this pressure field has a limited but unconditional (internal) regularity. The present paper completes these results by showing: (1) the uniqueness property can be viewed as an infinite dimensional phenomenon (related to the possibility of relaxing the corresponding minimization problem by convex optimization), which is false for finit...
We investigate the existence of a drag-minimizing shape for two classes of optimal-design problem o...
In this paper, we study the motion of rigid bodies in a perfect incompressible fluid. The rigid-flu...
We prove the existence, uniqueness, and regularity of minimizers of a polyconvex functional in two a...
International audienceWe introduce a numerical method for extracting minimal geodesics along the gro...
Geodesics along the group of volume preserving diffeomorphisms are solutions to Euler equations of i...
In this paper we consider the problem of minimizing functionals of the form $E(u)=\int_B f(x,\nabla ...
International audienceWe study Brenier's variational models for incompressible Euler equations. Thes...
International audienceWe study the geodesic problem on the group of diffeomorphism of a domain M⊂Rd,...
International audienceWe obtain a result about propagation of geometric properties for solutions of ...
none2noWe investigate the existence of a drag-minimizing shape for two classes of optimal-design pro...
International audienceThe motion of a rigid body immersed in an incompressible perfect fluid which o...
The Minimizing Movement (MM) scheme is a variational method introduced by E. De Giorgi to solve grad...
International audienceWe approximate the regular solutions of the incompressible Euler equations by ...
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...
We investigate the existence of a drag-minimizing shape for two classes of optimal-design problem o...
In this paper, we study the motion of rigid bodies in a perfect incompressible fluid. The rigid-flu...
We prove the existence, uniqueness, and regularity of minimizers of a polyconvex functional in two a...
International audienceWe introduce a numerical method for extracting minimal geodesics along the gro...
Geodesics along the group of volume preserving diffeomorphisms are solutions to Euler equations of i...
In this paper we consider the problem of minimizing functionals of the form $E(u)=\int_B f(x,\nabla ...
International audienceWe study Brenier's variational models for incompressible Euler equations. Thes...
International audienceWe study the geodesic problem on the group of diffeomorphism of a domain M⊂Rd,...
International audienceWe obtain a result about propagation of geometric properties for solutions of ...
none2noWe investigate the existence of a drag-minimizing shape for two classes of optimal-design pro...
International audienceThe motion of a rigid body immersed in an incompressible perfect fluid which o...
The Minimizing Movement (MM) scheme is a variational method introduced by E. De Giorgi to solve grad...
International audienceWe approximate the regular solutions of the incompressible Euler equations by ...
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...
We investigate the existence of a drag-minimizing shape for two classes of optimal-design problem o...
In this paper, we study the motion of rigid bodies in a perfect incompressible fluid. The rigid-flu...
We prove the existence, uniqueness, and regularity of minimizers of a polyconvex functional in two a...