The optimal transport problem in the context of Lorentz–Finsler geometry is studied. Besides deducing the existence of optimal couplings a result on the intermediate regularity of optimal couplings is given. Furthermore, a solution to the Monge problem and an exact criterion for the existence of causal couplings are established. The results generalize parts of [6], [8] and [11].</p
Cette thèse comporte deux parties distinctes, toutes les deux liées à la théorie du transport optima...
This article complements the Lorentzian Aubry–Mather Theory in Suhr (Geom Dedicata 160:91–117, 2012;...
We study a multimarginal optimal transportation problem in one dimension. For a symmetric, repulsive...
The main scope of this paper is to give some explicit classes of examples of L1-optimal couplings. O...
This short contribution summarizes a talk given on May 5, 2010, in Cairo, describing some unexpected...
These notes constitute a sort of Crash Course in Optimal Transport Theory. The different features of...
AbstractThis short contribution summarizes a talk given on May 5, 2010, in Cairo, describing some un...
The goal of the talk is to present a recent work in collaboration with Cavalletti (SISSA) on optimal...
International audienceThe book provides an introduction to sub-Riemannian geometry and optimal trans...
The book provides an introduction to sub-Riemannian geometry and optimal transport and presents some...
This thesis studies the optimal transport problem with costs induced by Tonelli Lagrangians. The mai...
Abstract. In this series of lectures we introduce the Monge-Kantorovich problem of optimally transpo...
Abstract. In this series of lectures we introduce the Monge-Kantorovich problem of optimally transpo...
First version, comments welcome.Using the dual formulation only, we show that regularity of unbalanc...
We study a class of optimal transport planning problems where the reference cost involves a non line...
Cette thèse comporte deux parties distinctes, toutes les deux liées à la théorie du transport optima...
This article complements the Lorentzian Aubry–Mather Theory in Suhr (Geom Dedicata 160:91–117, 2012;...
We study a multimarginal optimal transportation problem in one dimension. For a symmetric, repulsive...
The main scope of this paper is to give some explicit classes of examples of L1-optimal couplings. O...
This short contribution summarizes a talk given on May 5, 2010, in Cairo, describing some unexpected...
These notes constitute a sort of Crash Course in Optimal Transport Theory. The different features of...
AbstractThis short contribution summarizes a talk given on May 5, 2010, in Cairo, describing some un...
The goal of the talk is to present a recent work in collaboration with Cavalletti (SISSA) on optimal...
International audienceThe book provides an introduction to sub-Riemannian geometry and optimal trans...
The book provides an introduction to sub-Riemannian geometry and optimal transport and presents some...
This thesis studies the optimal transport problem with costs induced by Tonelli Lagrangians. The mai...
Abstract. In this series of lectures we introduce the Monge-Kantorovich problem of optimally transpo...
Abstract. In this series of lectures we introduce the Monge-Kantorovich problem of optimally transpo...
First version, comments welcome.Using the dual formulation only, we show that regularity of unbalanc...
We study a class of optimal transport planning problems where the reference cost involves a non line...
Cette thèse comporte deux parties distinctes, toutes les deux liées à la théorie du transport optima...
This article complements the Lorentzian Aubry–Mather Theory in Suhr (Geom Dedicata 160:91–117, 2012;...
We study a multimarginal optimal transportation problem in one dimension. For a symmetric, repulsive...
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