Penalty function finite element analysis of steady viscous incompressible flow in rotating coordinates
Abstract
Finite element methods for incompressible viscous flow in turbomachines have not been presented in the literature previously. This paper develops a penalty function primitive variable method including Coriolis and centrifugal force terms for steady flow in a rotating coordinate system. Simplex elements are used with the result of solution times comparable to equivalent finite different solutions. Example cases considered are Couette flow, Poiseuile flow, flow over a step and flow in a rotating channel. Both laminar and turbulent flows are discussed. The accuracy of computed solutions compares well with theoretical solutions and experimenal measurements.
- Publication:
-
29th International Gas Turbine Conference and Exhibit
- Pub Date:
- June 1984
- Bibcode:
- 1984gatu.confQ....R
- Keywords:
-
- Finite Element Method;
- Incompressible Flow;
- Penalty Function;
- Rotating Fluids;
- Steady Flow;
- Viscous Flow;
- Couette Flow;
- Galerkin Method;
- Iterative Solution;
- Laminar Flow;
- Turbulent Flow;
- Fluid Mechanics and Heat Transfer