Approximate factorization for incompressible flow
Abstract
For computational solution of the incompressible Navier-Stokes equations, the approximate factorization (AF) algorithm is used to solve the vectorized momentum equation in delta form based on the pressure calculated in the previous time step. The newly calculated velocities are substituted into the pressure equation (obtained from a linear combination of the continuity and momentum equation), which is then solved by means of line SOR. Computational results are presented for the NACA 66 sub 3 018 airfoil at Reynolds numbers of 1000 and 40,000 and attack angles of 0 and 6 degrees. Comparison with wind tunnel data for Re = 40,000 indicates good qualitative agreement between measured and calculated pressure distributions. Quantitative agreement is only fair, however, with the calculations somewhat displaced from the measurements. Furthermore, the computed velocity profiles are unrealistically thick around the airfoil, due to the excessive amount of artificial viscosity needed for stability. Based on the performance of the algorithm with regard to stability, it is concluded that AF/SOR is suitable for calculations at Reynolds numbers less than 10,000. Speedwise, the method is faster than point SOR by at least a factor of two.
- Publication:
-
Ph.D. Thesis
- Pub Date:
- August 1981
- Bibcode:
- 1981PhDT........60B
- Keywords:
-
- Approximation;
- Equations Of Motion;
- Factorization;
- Incompressible Flow;
- Navier-Stokes Equation;
- Coordinates;
- Momentum;
- Pressure Distribution;
- Relaxation Method (Mathematics);
- Reynolds Number;
- Fluid Mechanics and Heat Transfer