Stability of solutions of a system of boundary layer equations for a nonsteady flow of incompressible fluid

We study the behavior of solutions of model equations of inviscid incompressible fluid flow proposed by Constantin, Lax and Majda together with a viscous version studied by Schochet. A condition is found on initial data to guarantee that solution of viscous equation remains smooth when the inviscid

Equations describing the flow within a boundary layer for elastic fluids are solved for several cases of physical significance. It is found that the question of increased or decreased wall stresses due to the presence of elasticity depends not only on the fluid, but on the particular geometry in que

The GGrtler series method for the solution of the two-dimensional boundary-layer flow equations is extended to include Ostwald-deWaele (power-law) fluids. The resulting differential equations are solved numerically for the first two to four terms of the series solution over a wide range of dilatant