CMS-Flow:Bottom Friction: Difference between revisions

The bottom roughness is specified in CMS with either a Manning's n coefficient, roughness height (Nikradse bed roughness), or bed friction coefficient. It is important to note that the roughness value is held constant throughout the simulation and is not changed according to bed composition and bed forms. It is also independent of the bed roughness calculation used for various sediment transport formula, since different formulas use different methods for computing the bed shear stresses.

In the CMS, the mean (shot-wave averaged) bottom shear stress is calculated based on the general quadratic formula

${\displaystyle \tau _{m}=\lambda _{wc}m_{b}\rho c_{b}|u_{c}|u_{c}}$

(1)

where ${\displaystyle \lambda _{wc}}$ is the nonlinear wave enhancement factor, ${\displaystyle m_{b}}$ is a bed slope friction coefficient, ${\displaystyle c_{b}}$ is the bottom friction coefficient, and ${\displaystyle u}$ is the depth-averaged current velocity.

The bed slope friction coefficient ${\displaystyle m_{b}}$ is equal to

${\displaystyle m_{b}={\sqrt {1+{\biggl (}{\frac {\partial z_{b}}{\partial x}}{\biggr )}^{2}+{\biggl (}{\frac {\partial z_{b}}{\partial y}}{\biggr )}^{2}}}}$

(2)

The bed friction coefficient ${\displaystyle c_{b}}$ is related to the Manning's coefficient ${\displaystyle n}$ by

${\displaystyle c_{b}={\frac {gn^{2}}{h^{1/3}}}}$

(3)

where ${\displaystyle g}$ is the gravitational constant, and ${\displaystyle h}$ is the water depth.

Similarly, the bed friction coefficient ${\displaystyle c_{b}}$ is related to the roughness height ${\displaystyle k_{s}}$ by

${\displaystyle c_{b}={\biggl (}{\frac {\kappa }{\ln(30k_{s}/h)+1}}{\biggr )}^{2}}$

(4)

In the case of currents only the he nonlinear wave enhancement factor equal and ${\displaystyle \tau _{m}=\tau _{c}=m_{b}\rho c_{b}|u_{c}|u_{c}}$.

In the presence of waves, \lambda_{wc} is calculated based on one of five models:

1. Quadratic formula (named W09 in CMS)
2. Soulsby (1995) two coefficient data fit (named DATA2 in CMS)
3. Soulsby (1995) thirteen coefficient data fit (named DATA13 in CMS)
4. Fredsoe (1984) (named F84 in CMS)
5. Huynh-Thanh and Temperville (1991) (named HT91 in CMS)

For the quadratic formula, the wave enhancement factor is simply

${\displaystyle \lambda _{wc}={\frac {\sqrt {u_{c}^{2}+c_{w}u_{w}^{2}}}{u_{c}^{2}}}}$

(7)

where ${\displaystyle u_{w}}$ is the wave bottom orbital velocity based on the significant wave height, and ${\displaystyle c_{w}}$ is an empirical coefficient approximately equal to 0.5 (default). Therefore, the quadratic formula reduces to ${\displaystyle \tau _{m}=m_{b}\rho c_{b}u_{c}{\sqrt {u_{c}^{2}+c_{w}u_{w}^{2}}}}$. For all other models, the nonlinear wave enhancement factor ${\displaystyle \lambda _{wc}}$ is parameterized using the the generalized form proposed by Soulsby (1995)

${\displaystyle \lambda _{wc}=1+bX^{p}(1-X)^{q}}$

(7)

where ${\displaystyle b}$, ${\displaystyle p}$, and ${\displaystyle q}$ are coefficients that depend on the model selected and

${\displaystyle X={\frac {\tau _{w}}{\tau _{c}+\tau _{w}}}}$

(8)

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