There are well-established connections between combinatorial optimization, optimal transport theory and Hydrodynamics, through the linear assignment problem in combinatorics, the Monge-Kantorovich problem in optimal transport theory and the model of inviscid, potential, pressure-less fluids in Hydrodynamics. Here, we consider the more challenging quadratic assignment problem (which is NP, while the linear assignment problem is just P) and find, in some particular case, a correspondence with the problem of finding stationary solutions of Euler's equations for incompressible fluids. For that purpose, we introduce and analyze a suitable "gradient flow" equation. Combining some ideas of P.-L. Lions (for the Euler equations) and Ambrosio-Gigli-S...
In dimension one, optimal transportation is rather straightforward. The easiness with which a soluti...
In the past 20 years the optimal transport theory revealed to be an efficient tool to study the asym...
We consider the Euler equations of incompressible fluids and attempt to solve the initial value prob...
There are well-established connections between combinatorial optimization, optimal transport theory ...
We discuss a new connection between combinatorial optimization and optimal transport theor...
Starting from Brenier's relaxed formulation of the incompress-ible Euler equation in terms of geodes...
This thesis focuses on Incompressible Optimal Transport, a minimization problem introduced by Brenie...
Geodesics along the group of volume preserving diffeomorphisms are solutions to Euler equations of i...
Geometric Hydrodynamics has flourished ever since the celebrated 1966 paper of V. Arnold. In this pa...
Cette thèse porte sur le problème de transport optimal incompressible, un problème introduit par Bre...
This chapter describes techniques for the numerical resolution of optimal transport problems. We wil...
This thesis is devoted to to the study of optimal transport problems, alternative to the so called M...
In this thesis we aim at giving a general numerical framework to approximate solutions to optimal tr...
We present results concerning the local existence, regularity and possible blow up of solutions to i...
Motivated by the theory of turbulence in fluids, the physicist and chemist Lars Onsager conjectured ...
In dimension one, optimal transportation is rather straightforward. The easiness with which a soluti...
In the past 20 years the optimal transport theory revealed to be an efficient tool to study the asym...
We consider the Euler equations of incompressible fluids and attempt to solve the initial value prob...
There are well-established connections between combinatorial optimization, optimal transport theory ...
We discuss a new connection between combinatorial optimization and optimal transport theor...
Starting from Brenier's relaxed formulation of the incompress-ible Euler equation in terms of geodes...
This thesis focuses on Incompressible Optimal Transport, a minimization problem introduced by Brenie...
Geodesics along the group of volume preserving diffeomorphisms are solutions to Euler equations of i...
Geometric Hydrodynamics has flourished ever since the celebrated 1966 paper of V. Arnold. In this pa...
Cette thèse porte sur le problème de transport optimal incompressible, un problème introduit par Bre...
This chapter describes techniques for the numerical resolution of optimal transport problems. We wil...
This thesis is devoted to to the study of optimal transport problems, alternative to the so called M...
In this thesis we aim at giving a general numerical framework to approximate solutions to optimal tr...
We present results concerning the local existence, regularity and possible blow up of solutions to i...
Motivated by the theory of turbulence in fluids, the physicist and chemist Lars Onsager conjectured ...
In dimension one, optimal transportation is rather straightforward. The easiness with which a soluti...
In the past 20 years the optimal transport theory revealed to be an efficient tool to study the asym...
We consider the Euler equations of incompressible fluids and attempt to solve the initial value prob...