Sharp uniform-in-diffusivity mixing rates for passive scalars in parallel shear flows
Abstract
We consider the advection-diffusion equation describing the evolution of a passive scalar in a background shear flow. We prove the optimal uniform-in-diffusivity mixing rate \| f \|H-1 t -1/(N+1), t ≥ 0, where N is the maximal order of vanishing of the derivative b'(y) of the shear profile, e.g., N=1 for plane Pouseille flow. Our proof is based on the description of the solution in terms of resolvents and involves pointwise estimates on the resolvent kernel. In the non-degenerate case, we further give a rigorous asymptotic description of generic solutions in terms of shear layers localized around the critical points. This verifies formal asymptotics in [McLaughlin-Camassa-Viotti, Physics of Fluids, 22(11), 2010].
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