... | ... | @@ -4,8 +4,8 @@ We write in this page the continuity and Navier-Stokes equations in the form tha |
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$`{\partial \rho \over \partial t}+ \nabla \cdot (\rho \vec v)= 0 `$
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where $`\rho`$ is the volume density and $`\vec v=(v_R,v_{\varphi},v_{\theta},)`$ is the fluid velocity vector with $v_\varphi=r\sin (\theta)(\omega+\Omega)$
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where $\omega$ is the azimuthal angular velocity in the rotating frame.
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where $`\rho`$ is the volume density and $`\vec v=(v_R,v_{\varphi},v_{\theta},)`$ is the fluid velocity vector with $`v_\varphi=r\sin (\theta)(\omega+\Omega)`$
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where $`\omega`$ is the azimuthal angular velocity in the rotating frame.
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