The study of the first order perturbation for Mises' equation from the boundary layer theory by finite-differences method
Abstract
An explicit method with finite differences for the perturbation of first order of Mises' equation from the theory of boundary layer of a viscous incompressible fluid has been studied in this paper. The paper is concluded with an application to the calculation of the speed and skin friction on a circular cylinder with slight deformation. The calculations were scheduled in FORTRAN IV language on the electronic computer FELIX-C 256 and the results are given in tables and graphics.
- Publication:
-
Revue Roumaine des Sciences Techniques Serie de Mecanique Appliquee
- Pub Date:
- September 1976
- Bibcode:
- 1976RvRST..21..321B
- Keywords:
-
- Boundary Value Problems;
- Circular Cylinders;
- Finite Difference Theory;
- Incompressible Boundary Layer;
- Perturbation Theory;
- Skin Friction;
- Fortran;
- Laminar Boundary Layer;
- Plastic Deformation;
- Stress Functions;
- Surface Geometry;
- Velocity Distribution;
- Viscous Fluids;
- Fluid Mechanics and Heat Transfer