Mixing as a correlated aggregation process

Mixing describes the process by which solutes evolve from an initial heterogeneous state to uniformity under the stirring action of a fluid flow. Fluid stretching forms thin scalar lamellae that coalesce due to molecular diffusion. Owing to the linearity of the advection–diffusion equation, coalesce...

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Bibliographic Details
Published in:Journal of fluid mechanics 2024-08, Vol.992
Main Authors: Heyman, J., Villermaux, E., Davy, P., Le Borgne, T.
Format: Article
Language:English
Subjects:
Advection-diffusion equation
Aggregates
Aggregation
Coalescence
Correlation
Fluid flow
JFM Papers
Lamellae
Molecular diffusion
Random variables
Solutes
Spatial distribution
Two dimensional flow
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Summary:Mixing describes the process by which solutes evolve from an initial heterogeneous state to uniformity under the stirring action of a fluid flow. Fluid stretching forms thin scalar lamellae that coalesce due to molecular diffusion. Owing to the linearity of the advection–diffusion equation, coalescence can be envisioned as an aggregation process. Here, we demonstrate that in smooth two-dimensional chaotic flows, mixing obeys a correlated aggregation process, where the spatial distribution of the number of lamellae in aggregates is highly correlated with their elongation, and is set by the fractal properties of the advected material lines. We show that the presence of correlations makes mixing less efficient than a completely random aggregation process because lamellae with similar elongations and scalar levels tend to remain isolated from each other. We show that correlated aggregation is uniquely determined by a single exponent that quantifies the effective number of random aggregation events. These findings expand aggregation theories to a larger class of systems, which have relevance to various fundamental and applied mixing problems.
ISSN:0022-1120
1469-7645
DOI:10.1017/jfm.2024.537