"irrotational" - 1 õppematerjal

Hüdro- ja aeromehaanika

the body to stabilize the excessive intake, perhaps resulting in losing fat but actually gaining weight. 13. Show that the Navier-Stokes equations for a two-dimensional, incompressible viscous flow can be write in terms of the streamfunction . Viscosity and the Navier-Stokes equations a two-dimensional vorticity field = ( z , r , o )) = ( (r ),0,0) . The idea is to prevent the vorticity from diffusing by placing it in a steady irrotational flow field of the form (U z , U r , U o ) = (z,-r / 2,0) . Thus the full velocity field has the form (U z ,U r , U o ) = (z ,-r / 2,U 0 (r , t )) Now the z-component of the vortiity equation is, with r 1 1 ru - - = r , = t 2 r r r r r r First note that if = 0, so that there is no diffusion of , we my solve the equation to obtain = e t F ( r 2 e t ) ,