Mixing with random cellular flows

Apparaît dans la collection : 2026 - T2 - WS1 - Vortices and vorticity in geophysical flows

We study a passive scalar equation on the two-dimensional torus, where the advecting velocity field is given by a cellular flow with a randomly moving center. We prove that the passive scalar undergoes mixing at a deterministic exponential rate, independent of any underlying diffusivity. Furthermore, we show that the velocity field enhances dissipation and we establish sharp decay rates that, for large times, are deterministic and remain uniform in the diffusivity constant. Our approach is purely Eulerian and relies on a suitable modification of Villani's hypocoercivity method, which incorporates a larger set of Hörmander commutators than Villani's original method.

Informations sur la vidéo

Date de captation 22/04/2026
Date de publication 19/05/2026
Institut IHP
Licence CC BY NC ND
Langue Anglais
Audience Chercheurs, Doctorants
Réalisateur(s) Service audiovisuel de l'IHP
Format MP4
Lieu IHP - Hermite Amphitheater

Données de citation

DOI 10.57987/IHP.2026.T2.WS1.011
Citer cette vidéo Navarro-Fernandez, Victor (22/04/2026). Mixing with random cellular flows. IHP. Audiovisual resource. DOI: 10.57987/IHP.2026.T2.WS1.011
URL https://dx.doi.org/10.57987/IHP.2026.T2.WS1.011

Domaine(s)

Equations aux dérivées partielles

Bibliographie

V. Navarro-Fernández and C. Seis. Exponential mixing with random cellular flows, Journal of Functional Analysis, vol. 290, no. 2, Paper No. 111227, 2026.