A fast Euler solver for steady flows
Abstract
A numerical technique to solve the Euler equations for steady, two-dimensional flows is presented. The technique extends to two-dimensional problems a formulation which was found to be extremely efficient for one-dimensional flows. Generalized Riemann variables are defined along two families of orthogonal coordinates, and integrated separately, sweeping back and forth alternatively along coordinate lines. The technique is second-order accurate and converges very rapidly. In addition, each step requires a minimal number of operations. Preliminary results for subsonic and transonic shockless flows are presented and discussed.
- Publication:
-
6th Computational Fluid Dynamics Conference
- Pub Date:
- 1983
- Bibcode:
- 1983cfd..conf..357M
- Keywords:
-
- Computational Fluid Dynamics;
- Computational Grids;
- Euler Equations Of Motion;
- Inviscid Flow;
- Steady Flow;
- Two Dimensional Flow;
- Airfoils;
- Joukowski Transformation;
- Nozzle Flow;
- Subsonic Flow;
- Transonic Flow;
- Wall Flow;
- Fluid Mechanics and Heat Transfer