Weak universality for a class of 3d stochastic reaction-diffusion models.

Furlan, Marco; Gubinelli, Massimiliano

Furlan, Marco; Gubinelli, Massimiliano (2018), Weak universality for a class of 3d stochastic reaction-diffusion models., Probability Theory and Related Fields. 10.1007/s00440-018-0849-6

Type

Article accepté pour publication ou publié

Lien vers un document non conservé dans cette base

https://hal.archives-ouvertes.fr/hal-01615822

Date

2018

Nom de la revue

Probability Theory and Related Fields

Éditeur

Springer

Identifiant publication

10.1007/s00440-018-0849-6

Métadonnées

Afficher la notice complète

Auteur(s)

Furlan, Marco
CEntre de REcherches en MAthématiques de la DEcision [CEREMADE]
Gubinelli, Massimiliano
Hausdorff Center for Mathematics and Institute for Numerical Simulation - University of Bonn

Résumé (EN)

We establish the large scale convergence of a class of stochastic weakly nonlinear reaction-diffusion models on a three dimensional periodic domain to the dynamic Phi^3_4 model within the framework of paracontrolled distributions. Our work extends previous results of Hairer and Xu to nonlinearities with a finite amount of smoothness (in particular C^9 is enough). We use the Malliavin calculus to perform a partial chaos expansion of the stochastic terms and control their L^p norms in terms of the graphs of the standard Phi^3_4 stochastic terms.

Mots-clés

weak universality; paracontrolled distributions; stochastic quantisation equation; Malliavin calculus; partial chaos expansion