Physics:Craik–Leibovich vortex force

From HandWiki
Short description: Forcing of the mean flow through wave–current interaction

In fluid dynamics, the Craik–Leibovich (CL) vortex force describes a forcing of the mean flow through wave–current interaction, specifically between the Stokes drift velocity and the mean-flow vorticity. The CL vortex force is used to explain the generation of Langmuir circulations by an instability mechanism. The CL vortex-force mechanism was derived and studied by Sidney Leibovich and Alex D. D. Craik in the 1970s and 80s, in their studies of Langmuir circulations (discovered by Irving Langmuir in the 1930s).

Description

The CL vortex force is

[math]\displaystyle{ \rho\, \boldsymbol{u}_S \times \boldsymbol{\omega}, }[/math]

with [math]\displaystyle{ \boldsymbol{u}_S }[/math] the (Lagrangian) Stokes drift velocity and vorticity [math]\displaystyle{ \boldsymbol{\omega}=\nabla\times\boldsymbol{u} }[/math] (i.e. the curl of the Eulerian mean-flow velocity [math]\displaystyle{ \boldsymbol{u} }[/math]). Further [math]\displaystyle{ \rho }[/math] is the fluid density and [math]\displaystyle{ \nabla\times }[/math] is the curl operator.

The CL vortex force finds its origins in the appearance of the Stokes drift in the convective acceleration terms in the mean momentum equation of the Euler equations or Navier–Stokes equations. For constant density, the momentum equation (divided by the density [math]\displaystyle{ \rho }[/math]) is:[1]

[math]\displaystyle{ \underbrace{ \partial_t \boldsymbol{u} }_\text{(a)} + \underbrace{ \boldsymbol{u}\cdot\nabla\boldsymbol{u} }_\text{(b)} + \underbrace{ 2\boldsymbol{\Omega}\times\boldsymbol{u} }_\text{(c)} + \underbrace{ 2\boldsymbol{\Omega}\times\boldsymbol{u}_S }_\text{(d)} + \underbrace{ \nabla ( \pi +\boldsymbol{u}\cdot\boldsymbol{u}_S ) }_\text{(e)} = \underbrace{ \boldsymbol{u}_S \times ( \nabla\times\boldsymbol{u} ) }_\text{(f)} + \underbrace{ \nu\, \nabla\cdot\nabla \boldsymbol{u} }_\text{(g)}, }[/math]

with

The CL vortex force can be obtained by several means. Originally, Craik and Leibovich used perturbation theory. An easy way to derive it is through the generalized Lagrangian mean theory.[1] It can also be derived through a Hamiltonian mechanics description.[2]

Notes

  1. 1.0 1.1 (Leibovich 1980)
  2. (Holm 1996)

References