$\Gamma$-convergence for a class of action functionals induced by gradients of convex functions

Luigi Ambrosio; Aymeric Baradat; Yann Brenier

doi:10.4171/rlm/928

JournalsrlmVol. 32, No. 1pp. 97–108

$Γ$ -convergence for a class of action functionals induced by gradients of convex functions

Luigi Ambrosio
Scuola Normale Superiore, Pisa, Italy
Aymeric Baradat
Université Lyon 1, Villeurbanne, France
Yann Brenier
École Normale Supérieure, Paris, France

$$\Gamma$-convergence for a class of action functionals induced by gradients of convex functions cover$

Download PDF

A subscription is required to access this article.

Abstract

Given a real function $f$ , the rate function for the large deviations of the diffusion process of drift $\nabla f$ given by the Freidlin–Wentzell theorem coincides with the time integral of the energy dissipation for the gradient flow associated with $f$ . This paper is concerned with the stability in the hilbertian framework of this common action functional when $f$ varies. More precisely, we show that if $(f_{h})_{h}$ is uniformly $λ$ -convex for some $λ \in R$ and converges towards $f$ in the sense of Mosco convergence, then the related functionals $Γ$ -converge in the strong topology of curves.

Cite this article

Luigi Ambrosio, Aymeric Baradat, Yann Brenier, $Γ$ -convergence for a class of action functionals induced by gradients of convex functions. Atti Accad. Naz. Lincei Cl. Sci. Fis. Mat. Natur. 32 (2021), no. 1, pp. 97–108

DOI 10.4171/RLM/928