论文信息 - Cell centered and cell vertex multigrid schemes for the Navier-Stokes equations

Cell centered and cell vertex multigrid schemes for the Navier-Stokes equations

Two efficient and robust finite-volume multigrid schemes for solving the Navier-Stokes equations are investigated. These schemes employ either a cell centred or a cell vertex discretisation technique. An explicit Runge-Kutta algorithm is used to advance the solution in time. Acceleration techniques are applied to obtain faster steady-state convergence. Accuracy and convergence of the schemes are examined. Computational results for transonic airfoil flows are essentially the same, even for a coarse mesh. Both schemes exhibit very good convergence rates for a broad range of artificial dissipation coefficients.

R. Radespiel | R. C. Swanson | R. Radespiel | R. Swanson

[1] Luigi Martinelli,et al. Calculations of viscous flows with a multigrid method , 1987 .

[2] T. Coakley,et al. Numerical simulation of viscous transonic airfoil flows , 1987 .

[3] R. Gallagher,et al. Compatibility conditions of structural mechanics for finite element analysis , 1991 .

[4] Eli Turkel,et al. On Central-Difference and Upwind Schemes , 1992 .

[5] Comment on "New Eddy Viscosity Model for Computation of Swirling Turbulent Flows" , 1989 .

[6] Terry L. Holst,et al. Viscous transonic airfoil workshop compendium of results , 1987 .

[7] Eli Turkel,et al. Artificial dissipation and central difference schemes for the Euler and Navier-Stokes equations , 1987 .

[8] F. Grasso,et al. Viscous High Speed Flow Computations by Adaptive Mesh Embedding Techniques , 1991 .

[9] Comment on 'New eddy viscosity model for computation of swirling turbulent flows' , 1989 .