Sediment Transport: Difference between revisions

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Revision as of 21:45, 15 October 2010

Lund-CIRP Transport Equations

Camenen and Larson (2005, 2007, and 2008) developed a general sediment transport formula for bed and suspended load under combined waves and currents.

Bed load

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

{\frac {q_{b}}{\sqrt {(s-1)gd^{3}}}}=a_{c}{\sqrt {\theta _{c}}}\theta _{cw}\exp {{\biggl (}-b_{c}{\frac {\theta _{cr}}{\theta _{cw}}}}{\biggr )}

(1)

Suspended load

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

Failed to parse (unknown function "\w"): {\displaystyle \frac{q_s}{\sqrt{ (s-1) g d^3 }} = U c_R \frac{\epsilon}{\w_s} \biggl[ \biggr] }

(2)

$1-\exp {{\biggl (}-{\frac {w_{s}d}{\epsilon }}}{\biggr )}$

Symbol	Description	Units
$q_{bc}$	Bed load transport rate	m³/s
$s$	Relative density	m
$\theta _{c}$	Shields parameter due to currents	-
$\theta _{cw}$	Shields parameter due to waves and currents	-
$\theta _{cw}$	Critical shields parameter	-
$a_{c}$	Empirical coefficient	-
$b_{c}$	Empirical coefficient	-

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@@ Line 9: / Line 9: @@
 === Suspended load ===
 The current-related suspended load transport with wave stirring is given by
-{{Equation|<math> \frac{q_{s}}{\sqrt{(s-1)gd^3}} = U c_R \frac{\epsilon}{\w_s} \biggl[  \biggr] </math>|2=2}}
+{{Equation|<math> \frac{q_s}{\sqrt{ (s-1) g d^3 }} = U c_R \frac{\epsilon}{\w_s} \biggl[  \biggr] </math>|2=2}}
 <math> 1 - \exp{ \biggl( - \frac{w_s d}{\epsilon}} \biggr)</math>

Sediment Transport: Difference between revisions

Revision as of 21:45, 15 October 2010

Lund-CIRP Transport Equations

Bed load

Suspended load

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