Add to ORKGThe stability of solutions to optimal transport problems under variation of the measures is fundamental from a mathematical viewpoint: it is closely related to the convergence of numerical approaches to solve optimal transport problems and justifies many of the applications of optimal transport. In this article, we introduce the notion of strong c-concavity, and we show that it plays an important role for proving stability results in optimal transport for general cost functions c. We then introduce a differential criterion for proving that a function is strongly c-concave, under an hypothesis on the cost introduced originally by Ma-Trudinger-Wang for establishing regularity of optimal transport maps. Finally, we provide two examples where t...
In this paper the regularity of optimal transportation potentials defined on round spheres is invest...
and convexity of injectivity domains on small deformations of S2 A. Figalli ∗ L. Rifford† Given a co...
International audienceWe consider the problem of optimal transportation with quadratic cost between ...
The stability of solutions to optimal transport problems under variation of the measures is fundamen...
The stability of solutions to optimal transport problems under variation of the measures is fundamen...
The stability of solutions to optimal transport problems under variation of the measures is fundamen...
The stability of solutions to optimal transport problems under variation of the measures is fundamen...
Abstract. We identify a condition for regularity of optimal transport maps that requires only three ...
Abstract. This paper slightly improves a classical result by Gangbo and McCann (1996) about the stru...
In this paper we prove the strict c-convexity and the C1,α regularity for potential functions in opt...
AbstractA certain curvature condition, introduced by Ma, Trudinger and Wang in relation with the reg...
In this thesis we study the regularity properties of solutions to the Kantorovich optimal transporta...
A usual approach for proving the existence of an optimal transport map, be it in ℝd or on more gener...
We consider the Monge-Kantorovich transport problem in a purely measure the-oretic setting, i.e. wit...
The usual optimal transport (for the quadratic cost c(z) = |z|2/2) characterized by Brenier [2] as ...
In this paper the regularity of optimal transportation potentials defined on round spheres is invest...
and convexity of injectivity domains on small deformations of S2 A. Figalli ∗ L. Rifford† Given a co...
International audienceWe consider the problem of optimal transportation with quadratic cost between ...
The stability of solutions to optimal transport problems under variation of the measures is fundamen...
The stability of solutions to optimal transport problems under variation of the measures is fundamen...
The stability of solutions to optimal transport problems under variation of the measures is fundamen...
The stability of solutions to optimal transport problems under variation of the measures is fundamen...
Abstract. We identify a condition for regularity of optimal transport maps that requires only three ...
Abstract. This paper slightly improves a classical result by Gangbo and McCann (1996) about the stru...
In this paper we prove the strict c-convexity and the C1,α regularity for potential functions in opt...
AbstractA certain curvature condition, introduced by Ma, Trudinger and Wang in relation with the reg...
In this thesis we study the regularity properties of solutions to the Kantorovich optimal transporta...
A usual approach for proving the existence of an optimal transport map, be it in ℝd or on more gener...
We consider the Monge-Kantorovich transport problem in a purely measure the-oretic setting, i.e. wit...
The usual optimal transport (for the quadratic cost c(z) = |z|2/2) characterized by Brenier [2] as ...
In this paper the regularity of optimal transportation potentials defined on round spheres is invest...
and convexity of injectivity domains on small deformations of S2 A. Figalli ∗ L. Rifford† Given a co...
International audienceWe consider the problem of optimal transportation with quadratic cost between ...