CMS-Flow:Subgrid Turbulence Model: Difference between revisions
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In CMS-Flow eddy viscosity is calculated as | In CMS-Flow eddy viscosity is calculated as | ||
<math> \nu_{t} = \nu_{t0} + \nu_c + \nu_w </math> | |||
where <math>\nu_{t0}</math> is a base value approximately equal to the dynamic viscosity, and <math>c_0</math> is an empirical coefficient approximately equal to 1/6, <math>c_{sm}</math> is an empirical coefficient (Smagorinsky coefficient) between 0.25-0.5, | |||
The wave component of the eddy viscosity is calculated as | |||
<math> \nu_w = k(D/\rho)^{1/3} </math> | |||
where <math>k</math> is an empirical coefficient, <math> \rho </math> is the water density, and <math>D</math> is the total wave dissipation. | |||
<math> \nu_{tc} = \nu_{t0} + \sqrt{ (c_0 u_* h)^2 + (c_{sm}^2 \Delta x \Delta y |S| )^2 } + k(D/\rho)^{1/3}</math> | <math> \nu_{tc} = \nu_{t0} + \sqrt{ (c_0 u_* h)^2 + (c_{sm}^2 \Delta x \Delta y |S| )^2 } + k(D/\rho)^{1/3}</math> | ||
---- | ---- | ||
---- | ---- | ||
</big> | </big> | ||
[[CMS-Flow]] | [[CMS-Flow]] | ||
Revision as of 23:13, 2 November 2009
Subgrid Turbulence Model
In CMS-Flow eddy viscosity is calculated as
where is a base value approximately equal to the dynamic viscosity, and is an empirical coefficient approximately equal to 1/6, is an empirical coefficient (Smagorinsky coefficient) between 0.25-0.5,
The wave component of the eddy viscosity is calculated as
where is an empirical coefficient, is the water density, and is the total wave dissipation.
