CMS-Flow:Subgrid Turbulence Model: Difference between revisions

Subgrid Turbulence Model

The eddy viscosity is calculated as ${\displaystyle \nu _{t}=(1-\theta _{m})\nu _{tc}+\theta _{m}\nu _{m}}$ 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 ${\displaystyle \nu _{tc}}$ and ${\displaystyle \nu _{tw}}$ are the current- and wave-related eddy viscosity components respectively. The wave contribution is included using the equation of KRAUS and LARSON (1991) ${\displaystyle \nu _{t}w=\Lambda u_{w}h}$, where ${\displaystyle del}$ is an empirical coefficient (set to 0.5 here), and ${\displaystyle u_{w}}$ is the wave bottom orbital velocity. The current-related eddy viscosity is calculated using a subgrid turbulence in which the turbulent eddy viscosity is a function of the flow gradients and the grid size model of the form

     ${\displaystyle \nu _{tc}=\nu _{t0}+{\sqrt {(c_{0}u_{*}h)^{2}+(l_{h}^{2}|S|)^{2}}}}$

where ${\displaystyle \nu _{t0}}$ is a base value approximately equal to the dynamic viscosity, and ${\displaystyle c_{0}}$ is an empirical coefficient and ${\displaystyle l_{h}}$ is the subgrid mixing length. The mixing length is calculated here as ${\displaystyle l_{h}=\kappa min({\sqrt {\delta x\delta y}},c_{sm}h)}$ where ${\displaystyle c_{sm}}$ is an empirical coefficient (Smagorinsky coefficient).