Viscous diffusion of multiple vortex system

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(Difference between revisions)

Latest revision as of 07:40, 12 April 2007

The following analytical solution satisfies the viscous, incompressible continuity and momentum equations in dimension-less form in the domain $0 \le x, y \le 2\pi$ . The solution is periodic in both $x$ and $y$ coordinates.

$u(x,y,t) = -(\cos x \sin y) e^{-2t/Re}$

$v(x,y,t) = (\sin x \cos y) e^{-2t/Re}$

$p(x,y,t) = -0.25( \cos 2x + \cos 2y) e^{-4t/Re}$

where $u,v$ are the Cartesian velocity components, $p$ is the pressure and $Re$ is the Reynolds number.

@@ Line 13: / Line 13: @@
 :<math>
-p(x,y,t) = -0.25( \cos 2x   \cos 2y) e^{-4t/Re}
+p(x,y,t) = -0.25( \cos 2x + \cos 2y) e^{-4t/Re}
 </math>
 where <math>u,v</math> are the Cartesian velocity components, <math>p</math>
 is the pressure and <math>Re</math> is the [[Reynolds number]].

Viscous diffusion of multiple vortex system

From CFD-Wiki

Latest revision as of 07:40, 12 April 2007

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