Arrêt de service programmé du vendredi 10 juin 16h jusqu’au lundi 13 juin 9h. Pour en savoir plus
Accéder directement au contenu Accéder directement à la navigation

A multitype sticky particle construction of Wasserstein stable semigroups solving one-dimensional diagonal hyperbolic systems with large monotonic data

1 MATHRISK - Mathematical Risk handling
Inria Paris-Rocquencourt, UPEM - Université Paris-Est Marne-la-Vallée, ENPC - École des Ponts ParisTech
Abstract : This article is dedicated to the study of diagonal hyperbolic systems in one space dimension, with cumulative distribution functions, or more generally nonconstant monotonic bounded functions, as initial data. Under a uniform strict hyperbolicity assumption on the characteristic fields, we construct a multitype version of the sticky particle dynamics and obtain existence of global weak solutions by compactness. We then derive a $L^p$ stability estimate on the particle system uniform in the number of particles. This allows to construct nonlinear semigroups solving the system in the sense of Bianchini and Bressan [Ann. of Math. (2), 2005]. We also obtain that these semigroup solutions satisfy a stability estimate in Wasserstein distances of all orders, which encompasses the classical $L^1$ estimate and generalises to diagonal systems the results by Bolley, Brenier and Loeper [J. Hyperbolic Differ. Equ., 2005] in the scalar case. Our results are obtained without any smallness assumption on the variation of the data, and only require the characteristic fields to be Lipschitz continuous and the system to be uniformly strictly hyperbolic.
Keywords :
Type de document :
Pré-publication, Document de travail
Domaine :

https://hal-enpc.archives-ouvertes.fr/hal-01100604
Contributeur : Julien Reygner Connectez-vous pour contacter le contributeur
Soumis le : mardi 6 janvier 2015 - 16:46:16
Dernière modification le : mardi 11 janvier 2022 - 11:16:26
Archivage à long terme le : : mardi 7 avril 2015 - 11:40:42

Fichiers

jourdain-reygner-systems.pdf
Fichiers produits par l'(les) auteur(s)

Identifiants

• HAL Id : hal-01100604, version 1

Citation

Benjamin Jourdain, Julien Reygner. A multitype sticky particle construction of Wasserstein stable semigroups solving one-dimensional diagonal hyperbolic systems with large monotonic data. 2015. ⟨hal-01100604v1⟩

Métriques

Consultations de la notice

584

Téléchargements de fichiers