On the system of equations of the laminar boundary layer in the presence of injection of a non-Newtonian fluid
- 18 Downloads
KeywordsBoundary Layer Laminar Boundary Layer
These keywords were added by machine and not by the authors. This process is experimental and the keywords may be updated as the learning algorithm improves.
Unable to display preview. Download preview PDF.
- 1.G. G. Chërnyî, “Laminar fluid flows in a boundary layer with a discontinuous surface,” Izv. Akad. Nauk SSSR. Tekhn., No. 12, 38–67 (1954).Google Scholar
- 2.A. I. Suslov, “On the system of Prandtl's boundary layer equations with a discontinuous surface,” Trudy Sem. Petrovsk., No. 2, 243–259 (1976).Google Scholar
- 3.V. N. Samokhin, “On a mixing layer in the interface between the flows of two fluids with different properties,” Sibirsk. Mat. Zh.,30, No. 2, 161–166 (1989).Google Scholar
- 4.E. R. Thompson and T. W. Snyder, “Laminar boundary-layer flows of Newtonian fluids with non-Newtonian fluid injectants,” J. Hydrodyn.,4, No. 2, 86–91 (1970).Google Scholar
- 5.C. Gebel and H. Reitzer, “Etude de la couche limite hydrodynamique. Evolution de d'écoulement autor d'obstacles en présence d'injection de fluide non-newtonien dans la couche limite,” C. R. Acad. Sci. Sér. A.,271, No. 4, 286–288 (1970).Google Scholar
- 6.O. A. Oleînik, “On the system of equations of boundary layer theory,” Zh. Vychisl. Mat. i Mat. Fiz.,3, No. 3, 489–507 (1963).Google Scholar
- 7.V. N. Samokhin, “On the system of equations of the stationary boundary layer of a dilatant medium,” Trudy Sem. Petrovsk., No. 14, 89–108 (1989).Google Scholar
- 8.S. M. Nikol'skiî, Approximation to Functions of Several Variables and Embedding Theorems [in Russian], Nauka Moscow (1969).Google Scholar
© Plenum Publishing Corporation 1993