A two-layer multiple-time-scale turbulence model and grid independence study
Abstract
A two-layer multiple-time-scale turbulence model is presented. The near-wall model is based on the classical Kolmogorov-Prandtl turbulence hypothesis and the semi-empirical logarithmic law of the wall. In the two-layer model presented, the computational domain of the conservation of mass equation and the mean momentum equation penetrated up to the wall, where no slip boundary condition has been prescribed; and the near wall boundary of the turbulence equations has been located at the fully turbulent region, yet very close to the wall, where the standard wall function method has been applied. Thus, the conservation of mass constraint can be satisfied more rigorously in the two-layer model than in the standard wall function method. In most of the two-layer turbulence models, the number of grid points to be used inside the near-wall layer posed the issue of computational efficiency. The present finite element computational results showed that the grid independent solutions were obtained with as small as two grid points, i.e., one quadratic element, inside the near wall layer. Comparison of the computational results obtained by using the two-layer model and those obtained by using the wall function method is also presented.
- Publication:
-
NASA STI/Recon Technical Report N
- Pub Date:
- March 1989
- Bibcode:
- 1989STIN...8926183K
- Keywords:
-
- Computational Fluid Dynamics;
- Computational Grids;
- Conservation Equations;
- Finite Element Method;
- Turbulence Models;
- Turbulent Boundary Layer;
- Boundary Conditions;
- Boundary Layer Flow;
- Conservation Laws;
- Eddy Viscosity;
- High Reynolds Number;
- Kinetic Energy;
- Reynolds Stress;
- Fluid Mechanics and Heat Transfer