Optimal enhanced dissipation and mixing for a time-periodic, Lipschitz velocity field on $\mathbb{T}^2$
Publication
, Journal Article
Elgindi, TM; Liss, K; Mattingly, JC
April 11, 2023
We consider the advection-diffusion equation on $\mathbb{T}^2$ with a Lipschitz and time-periodic velocity field that alternates between two piecewise linear shear flows. We prove enhanced dissipation on the timescale $|\log \nu|$, where $\nu$ is the diffusivity parameter. This is the optimal decay rate as $\nu \to 0$ for uniformly-in-time Lipschitz velocity fields. We also establish exponential mixing for the $\nu = 0$ problem.
Duke Scholars
Publication Date
April 11, 2023
Citation
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Elgindi, T. M., Liss, K., & Mattingly, J. C. (2023). Optimal enhanced dissipation and mixing for a time-periodic, Lipschitz
velocity field on $\mathbb{T}^2$.
Elgindi, Tarek M., Kyle Liss, and Jonathan C. Mattingly. “Optimal enhanced dissipation and mixing for a time-periodic, Lipschitz
velocity field on $\mathbb{T}^2$,” April 11, 2023.
Elgindi TM, Liss K, Mattingly JC. Optimal enhanced dissipation and mixing for a time-periodic, Lipschitz
velocity field on $\mathbb{T}^2$. 2023 Apr 11;
Elgindi, Tarek M., et al. Optimal enhanced dissipation and mixing for a time-periodic, Lipschitz
velocity field on $\mathbb{T}^2$. Apr. 2023.
Elgindi TM, Liss K, Mattingly JC. Optimal enhanced dissipation and mixing for a time-periodic, Lipschitz
velocity field on $\mathbb{T}^2$. 2023 Apr 11;
Publication Date
April 11, 2023