Ali, Syed Anwer (2002) ON EXACT SOLUTIONS OF NAVIER-STOKES EQUATIONS. PhD thesis, University of Karachi, Karachi.
The steady-state plane, incompressible, variable viscosity, Navier-Stokes equations are transformed into a new system of equations using von-Mises variables (x,w) for constant and variable thermal conductivity. Some new exact solutions to the transformed equations are determined for a class of flow problems characterized by the streamlines (y-g(x)) = constant, where g(x), I(x) are continuously I(x) Differentiable functions and I(x) # 0. Boundary value problems are also treated to indicate the applicability of some of the solutions to physically possible situations.
|Item Type:||Thesis (PhD)|
|Uncontrolled Keywords:||Navier-stokes equations, Variable viscosity, Thermal conductivity, Von-Mises variables (x,w),|
|Subjects:||Physical Sciences (f) > Mathematics(f5)|
|Deposited By:||Mr Ghulam Murtaza|
|Deposited On:||16 Jun 2006|
|Last Modified:||04 Oct 2007 21:00|
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