A roughness-dependent model

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Two-equation $k$ - $\epsilon$ eddy viscosity model

$\nu _t = C_{\mu} {{k^2 } \over \epsilon }$

(1)

where: $C_{\mu} = 0.09$

$k$ - $\epsilon$ model

One-equation eddy viscosity model

$\nu _t = k^{{1 \over 2}} l$

(2)

One-equation model

Algebraic eddy viscosity model

$\nu _t(y) = {C_{\mu}}^{{1 \over 4}} l_m(y) k^{{1 \over 2}}(y)$

(3)

$l_m$ is the mixing length.

Algebraic model for the turbulent kinetic energy

$k^{{1 \over 2}}(y) = {1 \over {C_{\mu}}^{{1 \over 4}}} u_\tau e^{\frac{-y}{A}}$

(4)

$u_\tau$ is the shear velocity and $A$ a model parameter.

For steady open channel flows in local equilibrium, where the energy production is balanced by the dissipation, from the modeled $k$ -equation [Nezu and Nakagawa (1993)] obtained a similar semi-theoretical equation.

Algebraic model for the mixing length

For local equilibrium, an extension of von Kármán’s similarity hypothesis allows to write, with equation (4) [Absi (2006)]:

$l_m(y) = \kappa \left( A - \left(A - y_0\right) e^{\frac{-(y-y_0)}{A}} \right)$

(5)

$\kappa = 0.4$ , $y_0$ is the hydrodynamic roughness. For a smooth wall ( $y_0 = 0$ ):

$l_m(y) = \kappa A \left( 1 - e^{\frac{-y}{A}} \right)$

(6)

the algebraic eddy viscosity model is therefore

$\nu _t(y) = \kappa \left( A - \left(A - y_0\right) e^{\frac{-(y-y_0)}{A}} \right) u_\tau e^{\frac{-y}{A}}$

(7)

The mean velocity profile

In local equilibrium region, we are able to find the mean velocity $u$ profile from the mixing length $l_m$ and the turbulent kinetic energy $k$ by:

${{d u} \over {d y}} = C_{\mu}^{1 \over 4} {{k^{1 \over 2}} \over {l_m}}$

(8)

With equations (4) and (5), we obtain [Absi (2006)]:

Fig. Vertical distribution of mean flow velocity. $A = {{h} \over {c_1}}$ ; $c_1 = 1$ ; Dash-dotted line: logarithmic profile; solid line: obtained from equation (8); symbols: experimental data (Sukhodolov et al). a) profile 2: $y_0 = 0.062 cm$ ; $h = 145 cm$ ; $u_\tau = 3.82 cm/s$ . b) profile 4: $y_0 = 0.113 cm$ ; $h = 164.5 cm$ ; $u_\tau = 3.97 cm/s$ ; values of $y_0 , h, u_\tau$ are from [Sukhodolov et al. (1998)].

References

Absi, R. (2006), "A roughness and time dependent mixing length equation", Journal of Hydraulic, Coastal and Environmental Engineering, (Doboku Gakkai Ronbunshuu B), Japan Society of Civil Engineers, Vol. 62, No. 4, pp.437-446.

Nezu, I. and Nakagawa, H. (1993), "Turbulence in open-channel flows", A.A. Balkema, Ed. Rotterdam, The Netherlands.

Sukhodolov A., Thiele M. and Bungartz H. (1998), "Turbulence structure in a river reach with sand bed", Water Resour. Res., 34, pp. 1317-1334.

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@@ Line 6: / Line 6: @@
 where:
 <math> C_{\mu} = 0.09 </math>
+[http://www.cfd-online.com/Wiki/Standard_k-epsilon_model <math>k</math>-<math>\epsilon</math> model]
 ==One-equation eddy viscosity model==

A roughness-dependent model

From CFD-Wiki

Revision as of 15:19, 21 June 2007

Contents

Two-equation $k$ - $\epsilon$ eddy viscosity model

One-equation eddy viscosity model

Algebraic eddy viscosity model

Algebraic model for the turbulent kinetic energy

Algebraic model for the mixing length

the algebraic eddy viscosity model is therefore

The mean velocity profile

References

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A roughness-dependent model

From CFD-Wiki

Revision as of 15:19, 21 June 2007

Contents

Two-equation - eddy viscosity model

One-equation eddy viscosity model

Algebraic eddy viscosity model

Algebraic model for the turbulent kinetic energy

Algebraic model for the mixing length

the algebraic eddy viscosity model is therefore

The mean velocity profile

References

Views

My wiki

wiki navigation

wiki search

wiki toolbox

Two-equation $k$ - $\epsilon$ eddy viscosity model