CMS-Flow:Subgrid Turbulence Model: Difference between revisions

Subgrid Turbulence Model

In CMS-Flow eddy viscosity is calculated as

     ${\displaystyle {\nu }_t=(1-{\theta }_m){\nu }_c+{\theta }_m{\nu }_w}$  

where ${\displaystyle {\theta }_m}$ is weighting factor equal to ${\displaystyle {\theta }_m=(H_s/h{)}^3}$ in which ${\displaystyle H_s}$ is the significant wave height and ${\displaystyle {\nu }_c}$ and ${\displaystyle {\nu }_w}$ are the current- and wave-related eddy viscosity components respectively. The wave contribution is included using the equation of Kraus and Larson (1991)

     ${\displaystyle {\nu }_w=\mathrm{\Lambda }{u}_{w}h}$

where ${\displaystyle \mathrm{\Lambda }}$ is an empirical coefficient (default is 0.5), and ${\displaystyle u_w}$ is the wave bottom orbital velocity and ${\displaystyle h}$ is the water depth. The current-related eddy viscosity is calculated as a function of the flow gradients, and the bottom shear stress

     ${\displaystyle {\nu }_c={\nu }_0+\sqrt{(c_0{u}_{*}h{)}^2+(c_{sm}\mathrm{\Delta }|S|{)}^2}}$

where ${\displaystyle {\nu }_0}$ is a base value approximately equal to the kinematic viscosity, ${\displaystyle c_0}$ is an empirical coefficient, ${\displaystyle c_{sm}}$ is an empirical coefficient (Smagorinsky coefficient), ${\displaystyle \mathrm{\Delta }}$ is the local cell area, and ${\displaystyle |S|}$ is equal to

     ${\displaystyle |S|=\sqrt{2(\frac{\partial U}{\partial x}{)}^2+2(\frac{\partial V}{\partial y}{)}^2+(\frac{\partial U}{\partial y}+\frac{\partial V}{\partial x}{)}^2}}$

References

LARSON, M.; HANSON, H., and KRAUS, N. C., 2003. Numerical modeling of beach topography change. Advances in Coastal Modeling, V.C. Lakhan (eds.), Elsevier Oceanography Series, 67, Amsterdam, The Netherlands, 337-365.