CMS-Flow:Roller: Difference between revisions

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== Surface Roller ==
== Surface Roller ==
As the wave transitions from nonbreaking to fully breaking, part of the wave energy is transformed into momentum which goes an aerated region of water known as the surface roller. The surface roller has the effect of storing energy from the breaker and releasing it closer to shore and helps account for the shift towards the shore in peak alongshore current with respect to the breaker line.  
As the wave transitions from nonbreaking to fully breaking, part of the wave energy is transformed into momentum which goes an aerated region of water known as the surface roller. The surface roller has the effect of storing energy from the breaker and releasing it closer to shore and helps account for the shift towards the shore in peak alongshore current with respect to the breaker line.  


Under the assumption that the surface moves in the mean wave direction <math>  \theta  </math>, the evolution and dissipation of the surface roller energy is given by an energy balance equation (Stive and De Vriend 1994, Ruessink 2001)
Under the assumption that the surface moves in the mean wave direction <math>  \theta  </math>, the evolution and dissipation of the surface roller energy is given by an energy balance equation (Stive and De Vriend 1994, Ruessink 2001)
{{Equation|<math> \frac{\partial ( 2 E_{sr} c_j )}{\partial x_j } = -D_{sr} + f_e D_{br} </math>|2=1}}
{{Equation|<math>\frac{\partial ( 2 E_{sr} c_j )}{\partial x_j } = -D_{sr} + f_e D_{br} </math>|1}}


where <math>E_{sr}</math> is the roller energy density, <math>c</math> is the roller propogation speed, <math>D_{sr}</math> is the roller dissipation, <math>D_{br}</math> is the wave breaking dissipation (from wave model), and <math>f_{e}</math> is an efficiency factor. The roller dissipation is approximated as
where <math>E_{sr}</math> is the roller energy density, <math>c</math> is the roller propogation speed, <math>D_{sr}</math> is the roller dissipation, <math>D_{br}</math> is the wave breaking dissipation (from wave model), and <math>f_{e}</math> is an efficiency factor. The roller dissipation is approximated as
{{Equation|<math> D_{sr} = \frac{2 g E_{sr} \beta_D }{c} </math>|2=2}}
{{Equation|<math>D_{sr} = \frac{2 g E_{sr} \beta_D }{c} </math>|2}}
 
==References==
* Ruessink, B.G., Miles, J.R., Feddersen, F., Guza, R.T. and Elgar, S., 2001. Modeling the alongshore current on barred beaches. Journal of Geophysical Research, 106(C10): 22451-22464. 
* Stive, M.J.F. and De Vriend, H.J., 1994. Shear stresses and mean flow in shoaling and breaking waves. ASCE, New York, pp. 594-608.


The roller contribution to the wave radiation stresses is given by
== Related links ==
{{Equation|<math>  R_{ij} = 2 E_{sr} a_i a_j  </math>|2=3}}
* [[CMS_Surface_Roller | User Guide for the CMS Surface Roller ]]
where <math>a = (\cos{\theta}, \sin{\theta} )</math>.


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[[CMS#Documentation_Portal  | Documentation Portal]]
[[CMS#Documentation_Portal  | Documentation Portal]]

Latest revision as of 19:06, 1 October 2014

Surface Roller

As the wave transitions from nonbreaking to fully breaking, part of the wave energy is transformed into momentum which goes an aerated region of water known as the surface roller. The surface roller has the effect of storing energy from the breaker and releasing it closer to shore and helps account for the shift towards the shore in peak alongshore current with respect to the breaker line.

Under the assumption that the surface moves in the mean wave direction , the evolution and dissipation of the surface roller energy is given by an energy balance equation (Stive and De Vriend 1994, Ruessink 2001)

  (1)

where is the roller energy density, is the roller propogation speed, is the roller dissipation, is the wave breaking dissipation (from wave model), and is an efficiency factor. The roller dissipation is approximated as

  (2)

References

  • Ruessink, B.G., Miles, J.R., Feddersen, F., Guza, R.T. and Elgar, S., 2001. Modeling the alongshore current on barred beaches. Journal of Geophysical Research, 106(C10): 22451-22464.
  • Stive, M.J.F. and De Vriend, H.J., 1994. Shear stresses and mean flow in shoaling and breaking waves. ASCE, New York, pp. 594-608.

Related links


Documentation Portal