Batchelor scale: Difference between revisions
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Similar to the [[Kolmogorov microscales]], which describe the smallest scales of turbulence before viscosity dominates; the Batchelor scale describes the smallest length scales of fluctuations in scalar concentration that can exist before being dominated by [[molecular diffusion]]. It is important to note that for Sc>1, which is common in many liquid flows, the Batchelor scale is small when compared to the [[Kolmogorov microscales]]. This means that scalar transport occurs at scales smaller than the smallest eddy size. |
Similar to the [[Kolmogorov microscales]], which describe the smallest scales of turbulence before viscosity dominates; the Batchelor scale describes the smallest length scales of fluctuations in scalar concentration that can exist before being dominated by [[molecular diffusion]]. It is important to note that for Sc>1, which is common in many liquid flows, the Batchelor scale is small when compared to the [[Kolmogorov microscales]]. This means that scalar transport occurs at scales smaller than the smallest eddy size. |
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==See also== |
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*[[molecular diffusion]] |
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==References== |
==References== |
Revision as of 18:04, 6 February 2020
The Batchelor scale, determined by George Batchelor (1954),[1] describes the size of a droplet of scalar that will diffuse in the same time it takes the energy in an eddy of size η to dissipate. The Batchelor scale can be determined by:[2]
where:
- Sc is the Schmidt number.
- ν is the kinematic viscosity.
- D is the mass diffusivity.
- ε is the rate of dissipation of turbulent kinetic energy per unit mass.
Similar to the Kolmogorov microscales, which describe the smallest scales of turbulence before viscosity dominates; the Batchelor scale describes the smallest length scales of fluctuations in scalar concentration that can exist before being dominated by molecular diffusion. It is important to note that for Sc>1, which is common in many liquid flows, the Batchelor scale is small when compared to the Kolmogorov microscales. This means that scalar transport occurs at scales smaller than the smallest eddy size.
References
- ^ G.K., Batchelor. (1959), "Small-scale variation of convected quantities like temperature in turbulent fluid. Part 1. General discussion and the case of small conductivity", Journal of Fluid Mechanics, 5: 113–133, Bibcode:1959JFM.....5..113B, doi:10.1017/s002211205900009x
- ^ Paul, Edward L.; Atiemo-Obeng, Victor A.; Kresta, Suzanne M. (2004), Handbook of industrial mixing: science and practice (1st ed.), Wiley-IEEE, pp. 49–52, ISBN 0-471-26919-0