Kolmogorov length scale: Difference between revisions
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<math>\eta=\left(\frac{\nu^3}{\varepsilon}\right)^{1/4}</math> | <math>\eta=\left(\frac{\nu^3}{\varepsilon}\right)^{1/4}</math> | ||
where <math>\nu</math> is the kinematic viscosity of the fluid and <math>\varepsilon</math> is the rate of dissipation of turbulence kinetic energy by viscous friction. It is the smallest length scale before viscous effects smoothen the velocity fluctuations. | |||
Revision as of 20:07, 13 July 2021
{{#default_form:}}
| Short name | Symbol | Standard name | Description | Units | CF compliant |
|---|---|---|---|---|---|
| Kolmogorov length scale | <math>\eta</math> | Kolmogorov_length_scale | Kolmogorov length scale | m | No |
This is a mathematical definition for Kolmogorov length scale, along with the NetCDF attributes.
Additional Information
{{#default_form:NetcdfGlossary}} {{#arraymap:|,|x||}} {{#arraymap:Length and time scales|,|x||}}
<math>\eta=\left(\frac{\nu^3}{\varepsilon}\right)^{1/4}</math>
where <math>\nu</math> is the kinematic viscosity of the fluid and <math>\varepsilon</math> is the rate of dissipation of turbulence kinetic energy by viscous friction. It is the smallest length scale before viscous effects smoothen the velocity fluctuations.
