Lund-CIRP

Camenen and Larson (2005, 2007, and 2008) developed a general sediment transport formula for bed and suspended load under combined waves and currents. These are refered to as the Lund-CIRP transport formulas. The general transport formulas can be used for both symmetric and asymmetric waves but for simplicity the waves are assumed to be symmetric in CMS. The bed load transport rate including the stirring effect of waves is given by

The current-related bed load transport with wave stirring is given by

${\displaystyle \frac{q_b}{\sqrt{(s-1)g{d}_{50}^3}}=a_c\sqrt{{\theta }_c}{\theta }_{cw,m}\exp (-b_c\frac{{\theta }_{cr}}{{\theta }_{cw}})}$

(1)

where ${\displaystyle q_b}$ is in m^2/s, ${\displaystyle d_{50}}$ is the median grain size, ${\displaystyle s}$ is the sediment specific gravity or relative density, ${\displaystyle g}$ is gravitational constant, ${\displaystyle {\theta }_{cw,m}}$ and ${\displaystyle {\theta }_{cw}}$ are the mean and maximum Shields parameters due to waves and currents respectively, ${\displaystyle {\theta }_c}$, ${\displaystyle {\theta }_{cr}}$ is the critical Shields parameter due to currents, ${\displaystyle a_c}$ and ${\displaystyle b_c}$ are empirical coefficients.

The current-related suspended load transport with wave stirring is given by

${\displaystyle \frac{q_s}{\sqrt{(s-1)g{d}_{50}^3}}=U{c}_R\frac{\epsilon }{{\omega }_s}[1-\exp (-\frac{w_{s}h}{\epsilon })]}$

(2)

where ${\displaystyle U}$ is the depth-averaged current velocity, ${\displaystyle h}$ is the total water depth, ${\displaystyle {\omega }_s}$ is the sediment fall velocity, ${\displaystyle \epsilon }$ is the sediment diffusivity, and ${\displaystyle c_R}$ is the reference bed concentration. The reference bed concentration is calculated from

${\displaystyle c_R=A_{cR}\exp (-4.5\frac{{\theta }_{cr}}{{\theta }_{cw}})}$

(3)

where the coefficient ${\displaystyle A_{cR}}$ is given by

${\displaystyle A_{cR}=3.5\times 10^3\exp (-0.3d_{*})}$

(4)

where ${\displaystyle \nu }$ the kinematic viscosity of water, and ${\displaystyle D_{*}}$the dimensionless grain size

${\displaystyle D_{*}=d\sqrt{(s-1)g{\nu }^{-2}}}$

(5)

The sediment fall velocity is calculated using the formula by Soulsby (1997)

${\displaystyle {\omega }_s=\frac{\nu }{d}\left[\right(10.36^2+1.049D_{*}^3{)}^{1/2}-10.36\left)\right]}$

(6)

The sediment mixing coefficient is calculated as

${\displaystyle ϵ=h(\frac{k_b^3{D}_b+k_c^3{D}_c+k_w^3{D}_w}{\rho }{)}^{1/3}}$

(7)

where ${\displaystyle k_b,k_c,and{k}_w}$ are coefficients, ${\displaystyle D_b}$ is the wave breaking dissipation, and ${\displaystyle D_c}$ and ${\displaystyle D_w}$ are the bottom friction dissipation due to currents and waves respectively. For more details see Camenen and Larson (2008).

van Rijn

The van Rijn (1984ab) transport equations are used with the recalibrated coefficients of van Rijn (2007ab) are given by

${\displaystyle q_b=0.015{\rho }_{s}Uh\left(\frac{U_e-U_{cr}}{\sqrt{(s-1)g{d}_{50}}}{)}^{1.5}\right(\frac{d_{50}}{h}{)}^{1.2}}$

(8)

${\displaystyle q_s=0.012{\rho }_{s}U{d}_{50}(\frac{U_e-U_{cr}}{\sqrt{(s-1)g{d}_{50}}}{)}^{2.4}{D}_{*}^{-0.6}}$

(9)

where ${\displaystyle U_{cr}}$ is the critical depth-averaged velocity for initiation of motion, ${\displaystyle U_e}$ is the effective depth averaged velocity calculated as ${\displaystyle U_e=U+0.4U_w}$ in which ${\displaystyle U_w}$ is the peak orbital velocity based on the significant wave height

The critical velocity is estimated as

${\displaystyle U_{cr}=\beta U_{crc}+(1-\beta )U_{crw}}$

(10)

where ${\displaystyle U_{crc}}$ and ${\displaystyle U_{crw}}$ are the critical velocity for currents and waves respectively. As in van Rijn (2007), the critical velocity for currents and waves are calculated based on Komar and Miller (1975):

${\displaystyle U_{crc}=\{\begin{array}{ll}0.19(d_{50}{)}^{0.1}\log {}_{10}\left(\frac{4h}{d_{90}}\right),& \text{for }0.1\le d_{50}\le 0.5mm\\ 8.5(d_{50}{)}^{0.6}\log {}_{10}\left(\frac{4h}{d_{90}}\right),& \text{for }0.5\le d_{50}\le 2.0mm\end{array}}$

(11)

${\displaystyle U_{crw}=\{\begin{array}{ll}0.24[(s-1)g{]}^{0.66}(d_{50}{)}^{0.33}{T}_p^{0.33},& \text{for }0.1\le d_{50}\le 0.5mm\\ 0.95[(s-1)g{]}^{0.57}(d_{50}{)}^{0.43}{T}_p^{0.14},& \text{for }0.5\le d_{50}\le 2.0mm\end{array}}$

(12)

According to van Rijn (2007) bed load transport formula predicts transport rates with a factor of 2 for velocities higher than 0.6 m/s, but underpredicts transports by a factor of 2-3 for velocities close to initiation of motion.

Watanabe

The equilibrium total load sediment transport rate of Watanabe (1987) is given by

${\displaystyle q_t=A_w\left[\frac{({\tau }_{b,max}-{\tau }_{cr})U}{\rho g}\right]}$

(13)

where ${\displaystyle {\tau }_{b,max}}$ is the maximum shear stress, ${\displaystyle {\tau }_{cr}}$ is the critical shear stress of incipient motion, and ${\displaystyle A}$ is an empirical coefficient typically ranging from 0.1 to 2.

The critical shear stress is determined using

${\displaystyle {\tau }_{cr}=({\rho }_s-\rho )gd{\varphi }_{cr}}$

(14)

In the case of currents only the bed shear stress is determined as ${\displaystyle {\tau }_c=\frac{1}{8}\rho g{f}_c{U}_c^2}$ where ${\displaystyle f_c}$ is the current friction factor. The friction factor is calculated as ${\displaystyle f_c=0.24lo{g}^{-2}(12h/k_{sd})}$ where ${\displaystyle k_{sd}}$ is the Nikuradse equivalent sand roughness obtained from ${\displaystyle k_{sd}=2.5d_{50}}$.

If waves are present, the maximum bed shear stress ${\displaystyle {\tau }_{b,max}}$ is calculated based on Soulsby (1997)

${\displaystyle {\tau }_{max}=\sqrt{({\tau }_m+{\tau }_w\cos \varphi {)}^2+({\tau }_w\sin \varphi {)}^2}}$

(6)

where ${\displaystyle {\tau }_m}$ is the mean shear stress by waves and current over a wave cycle, math> \tau_w </math> is the mean wave bed shear stress, and ${\displaystyle \varphi }$ is the angle between the waves and the current. The mean wave and current bed shear stress is

${\displaystyle {\tau }_m={\tau }_c[1+1.2(\frac{{\tau }_w}{{\tau }_c+{\tau }_c}{)}^{3.2}]}$

(15)

The wave bed shear stress is given by ${\displaystyle {\tau }_w=\frac{1}{2}\rho g{f}_w{U}_w^2}$ where ${\displaystyle f_w}$ is the wave friction factor, and ${\displaystyle U_w}$ is the wave orbital velocity amplitude based on the significant wave height.

The wave friction factor is calculated as (Nielsen 1992) ${\displaystyle f_w=\exp 5.5R^{-0.2}-6.3}$ where

where ${\displaystyle R}$ is the relative roughness defined as ${\displaystyle R=A_w/k_{sd}}$ and ${\displaystyle A_w}$ is semi-orbital excursion ${\displaystyle A_w=U_{w}T/(2\pi )}$.

Soulsby-van Rijn

Soulsby (1997) proposed the following equation for the total load sediment transport rate under currents and waves

${\displaystyle q_t=A_{s}U\left[\right(U^2+0.018\frac{U_{rms}^2}{C_d}{)}^{0.5}-U_{cr}{]}^{2.4}}$

(7)

where ${\displaystyle U_{rms}}$ is the root-mean-squared wave orbital velocity, and ${\displaystyle C_d}$ is the drag coefficient due to currents alone and the coefficient ${\displaystyle A_s=A_{sb}+A_{ss}}$. The coefficients ${\displaystyle A_{sb}}$ and ${\displaystyle A_{ss}}$ are related to the bed and suspended transport loads respectively and are given by

${\displaystyle A_{sb}=\frac{0.005h(d_{50}/h{)}^{1.2}}{[(s-1)g{d}_{50}{]}^{1.2}}}$

(7)

${\displaystyle A_s=\frac{0.012d_{50}{D}_{*}^{-0.6}}{[(s-1)g{d}_{50}{]}^{1.2}}}$

(7)

The current drag coefficient is calcualted as

${\displaystyle C_d=[\frac{0.4}{\ln (h/z_0)-1}{]}^2}$

(7)

with a constant bed roughness length ${\displaystyle z_0}$ set to 0.006 m.

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Symbol	Description	Units
${\displaystyle q_{bc}}$	Bed load transport rate	m3/s
${\displaystyle s}$	Relative density	-
${\displaystyle {\theta }_c}$	Shields parameter due to currents	-
${\displaystyle {\theta }_{cw}}$	Shields parameter due to waves and currents	-
${\displaystyle {\theta }_{cw}}$	Critical shields parameter	-
${\displaystyle a_c}$	Empirical coefficient	-
${\displaystyle b_c}$	Empirical coefficient	-
${\displaystyle U_c}$	Current magnitude	m/s

References

• Camenen, B., and Larson, M. (2005). "A bed load sediment transport formula for the nearshore," Estuarine, Coastal and Shelf Science, 63, 249-260.
• Camenen, B., and Larson, M. (2007). "A unified sediment transport formulation for coastal inlet applications", ERDC/CHL-TR-06-7, US Army Engineer Research and Development Center, Coastal and Hydraulics Laboratory, Vicksburg, MS.
• Camenen, B., and Larson, M., (2008). "A General Formula for Non-Cohesive Suspended Sediment Transport," Journal of Coastal Research, 24(3), 615-627.
• Soulsby, D.H. (1997). "Dynamics of marine sands. A manual for practical applications," Thomas Telford Publications, London, England, 249 p.
• van Rijn, L. C. (1984a). "Sediment transport. Part I: Bed load transport", Journal of Hydraulic Engineering, 110(10), 1431–1456.
• van Rijn, L. C. (1984b). "Sediment transport. Part II: Suspended loadtransport", Journal of Hydraulic Engineering, 110(11), 1613–1641.
• van Rijn, L.C., (2007a). "Unified View of Sediment Transport by Currents and Waves. I: Initiation of Motion, Bed Roughness, and Bed-load Transport", Journal of Hydraulic Engineering, 133(6), 649-667.
• van Rijn, L.C., (2007b). "Unified View of Sediment Transport by Currents and Waves. II: Suspended Transport", Journal of Hydraulic Engineering, 133(6), 668-689.
• Watanabe, A. (1987). "3-dimensional numerical model of beach evolution," Proceedings Coastal Sediments '87, ASCE, 802-817.

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