Exponential mixing by random cellular flows [Exponential mixing by random cellular flows]
Navarro-Fernández, Víctor; Seis, Christian
Research article in digital collection | Preprint | Peer reviewedAbstract
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.
Details about the publication
Name of the repository: arxiv.org
Article number: 2502.17273
Status: submitted / under review
Release year: 2025
Language in which the publication is written: English
Link to the full text: https://arxiv.org/abs/2502.17273
Authors from the University of Münster
| Seis, Christian | Professorship for applied mathematics (Prof. Seis) |