A qualitatively new approach to the transformation of boundary layer equations into ordinary differential equations is suggested. In this case the set of differential equations is reformulated thus allowing one to include arbitrary functions of the longitudinal coordinate into solutions. The idea of the method is demonstrated using an example of the stationary nongradient plane boundary layer. The solutions obtained described flows induced by motions of a solid surface.
|Number of pages||6|
|Journal||Heat Transfer Research|
|State||Published - 1 Dec 1991|