Diapycnal eddy diffusivity: Difference between revisions
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Osborn 1980<ref>Osborn, T. R. (1980). Estimates of the Local Rate of Vertical Diffusion from Dissipation Measurements, Journal of Physical Oceanography, 10(1), 83-89</ref> showed that the buoyancy eddy diffusivity <math>K_\rho =\frac{\bar{w'\rho'}}{\partial \rho/\partial z}</math> could be reduced to <math>K_\rho=\Gamma \epsilon N^{-2}</math> via the "mixing efficiency" <math>\Gamma</math> and the background stratification <math>N=\sqrt\frac{-g}{\ | Osborn 1980<ref>Osborn, T. R. (1980). Estimates of the Local Rate of Vertical Diffusion from Dissipation Measurements, Journal of Physical Oceanography, 10(1), 83-89</ref> showed that the buoyancy eddy diffusivity <math>K_\rho =\frac{\bar{w'\rho'}}{\partial \rho/\partial z}</math> could be reduced to <math>K_\rho=\Gamma \epsilon N^{-2}</math> via the "mixing efficiency" <math>\Gamma</math> and the background stratification <math>N=\sqrt{\frac{-g}{\rho_o}\frac{\partial\rho}{\partial z}}</math>. | ||
Latest revision as of 14:59, 22 April 2022
| Short definition of Diapycnal eddy diffusivity (Diapycnal eddy diffusivity [math]\displaystyle{ K_\rho }[/math]) |
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| Diapycnal eddy diffusivity (for buoyancy) is defined from the buoyancy flux [math]\displaystyle{ \overline{w'\rho'} }[/math] and the background density gradient [math]\displaystyle{ \frac{\partial\rho}{\partial z} }[/math] |
This is the common definition for Diapycnal eddy diffusivity, but other definitions maybe discussed within the wiki.
Osborn 1980[1] showed that the buoyancy eddy diffusivity [math]\displaystyle{ K_\rho =\frac{\bar{w'\rho'}}{\partial \rho/\partial z} }[/math] could be reduced to [math]\displaystyle{ K_\rho=\Gamma \epsilon N^{-2} }[/math] via the "mixing efficiency" [math]\displaystyle{ \Gamma }[/math] and the background stratification [math]\displaystyle{ N=\sqrt{\frac{-g}{\rho_o}\frac{\partial\rho}{\partial z}} }[/math].
- ↑ Osborn, T. R. (1980). Estimates of the Local Rate of Vertical Diffusion from Dissipation Measurements, Journal of Physical Oceanography, 10(1), 83-89
