DJL equations: Difference between revisions

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<math>\nabla^2 \eta + \frac{N^2(z-\eta)}{U_0^2}\eta = 0</math>
<math>\nabla^2 \eta + \frac{N^2(z-\eta)}{U_0^2}\eta = 0</math>


where <math> N^2(z) = -\frac{g}{\rho_0}\frac{d\bar{\rho(z)}'}{dz}</math>.  <math>\bar{\rho}(z)</math> is the far upstream density profile, <math>\rho_0</math> is a constant reference density ,and <math>g</math> is the acceleration due to gravity.   
where <math> N^2(z) = -\frac{g}{\rho_0}\frac{d\bar{\rho}'(z)}{dz}</math>.  <math>\bar{\rho}(z)</math> is the far upstream density profile, <math>\rho_0</math> is a constant reference density ,and <math>g</math> is the acceleration due to gravity.   


== Boussinesq with non-constant background current <math>U(z)</math> ==
== Boussinesq with non-constant background current <math>U(z)</math> ==
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<math>\nabla^2\eta +  \frac{N^2(z-\eta)}{U_0^2}\eta +\frac{N^2(z-\eta)}{2g}\left[\eta_x^2 +\eta_z(\eta_z-2)\right] =0</math>
<math>\nabla^2\eta +  \frac{N^2(z-\eta)}{U_0^2}\eta +\frac{N^2(z-\eta)}{2g}\left[\eta_x^2 +\eta_z(\eta_z-2)\right] =0</math>


where <math> N^2(z) = \frac{-g\bar{\rho}'(z)}{\bar{\rho}(z)}</math>
where <math> N^2(z) = -g\frac{\bar{\rho}'(z)}{\bar{\rho}(z)}</math>

Revision as of 10:41, 7 July 2011

The Dubreil-Jacotin-Long (DJL) equation is derived from the steady Euler equations. The result is a single equation for the isopycnal displacement . Here are a few cases:

Boussinesq with constant background current

where . is the far upstream density profile, is a constant reference density ,and is the acceleration due to gravity.

Boussinesq with non-constant background current

Non-Boussinesq constant background current

where