DJL equations: Difference between revisions

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

Boussinesq with constant background current ${\displaystyle U_{0}}$

${\displaystyle \nabla ^{2}\eta +{\frac {N^{2}(z-\eta )}{U_{0}^{2}}}\eta =0}$

where ${\displaystyle N^{2}(z)=-{\frac {g}{\rho _{0}}}{\frac {d{\bar {\rho }}'(z)}{dz}}}$. ${\displaystyle {\bar {\rho }}(z)}$ is the far upstream density profile, ${\displaystyle \rho _{0}}$ is a constant reference density ,and ${\displaystyle g}$ is the acceleration due to gravity.

Boussinesq with non-constant background current ${\displaystyle U(z)}$

${\displaystyle \nabla ^{2}\eta +{\frac {N^{2}(z-\eta )}{U(z-\eta )^{2}}}\eta +{\frac {U'(z-\eta )}{U(z-\eta )}}\left[1-\left(\eta _{x}^{2}+(1-\eta _{z})^{2}\right)\right]=0}$

Non-Boussinesq constant background current ${\displaystyle U_{0}}$

${\displaystyle \nabla ^{2}\eta +{\frac {N^{2}(z-\eta )}{U_{0}^{2}}}\eta +{\frac {N^{2}(z-\eta )}{2g}}\left[\eta _{x}^{2}+\eta _{z}(\eta _{z}-2)\right]=0}$

where ${\displaystyle N^{2}(z)=-g{\frac {{\bar {\rho }}'(z)}{{\bar {\rho }}(z)}}}$