A flux-difference splitting type algorithm is formulated for the steady Euler equations on unstructured grids. The polynomial flux-difference splitting technique is used. A vertex-centered finite volume method is employed on a triangular mesh. The multigrid method is in defect-correction form. A relaxation procedure with a first order accurate inner iteration and a second-order correction performed only on the finest grid, is used. A multi-stage Jacobi relaxation method is employed as a smoother. Since the grid is unstructured a Jacobi type is chosen. The multi-staging is necessary to provide sufficient smoothing properties. The domain is discretized using a Delaunay triangular mesh generator. Three grids with more or less uniform distribut...
The steady Navier-Stokes equations in primitive variables are discretized in conservative form by a ...
Plus minus flux vector split schemes are combined with the multigrid relaxation method to obtain fas...
This paper consists of two parts. In the first part we give a review of a good multigrid method for ...
AbstractThe multigrid method based on multi-stage Jacobi relaxation, earlier developed by the author...
AbstractA flux-difference splitting based on the polynomial character of the flux-vectors is introdu...
A multigrid algorithm has been developed for solving the steady-state Euler equations in two dimensi...
AbstractA multigrid method for steady Euler equations based on polynomial flux-difference splitting ...
AbstractFlux-vector splitting and flux-difference splitting techniques are applied to the Cauchy-Rie...
A fast multigrid solver for the steady incompressible Euler equations is presented. Unlike timemarch...
The Full Approximation Scheme (FAS) multigrid method is applied to several implicit flux-split algor...
AbstractMulti-stage versions of Jacobi relaxation are studied for use in multigrid methods for stead...
In the present study, a scheme capable of solving very fast and robust complex nonlinear systems of ...
A method of adaptive grid refinement for the solution of the steady Euler equations for transonic fl...
A coarse-grid correction algorithm has been implemented into an implicit upwind Euler solver and tes...
A numerical algorithm is presented for solving the 2-D flux-split Euler equations using a multigrid ...
The steady Navier-Stokes equations in primitive variables are discretized in conservative form by a ...
Plus minus flux vector split schemes are combined with the multigrid relaxation method to obtain fas...
This paper consists of two parts. In the first part we give a review of a good multigrid method for ...
AbstractThe multigrid method based on multi-stage Jacobi relaxation, earlier developed by the author...
AbstractA flux-difference splitting based on the polynomial character of the flux-vectors is introdu...
A multigrid algorithm has been developed for solving the steady-state Euler equations in two dimensi...
AbstractA multigrid method for steady Euler equations based on polynomial flux-difference splitting ...
AbstractFlux-vector splitting and flux-difference splitting techniques are applied to the Cauchy-Rie...
A fast multigrid solver for the steady incompressible Euler equations is presented. Unlike timemarch...
The Full Approximation Scheme (FAS) multigrid method is applied to several implicit flux-split algor...
AbstractMulti-stage versions of Jacobi relaxation are studied for use in multigrid methods for stead...
In the present study, a scheme capable of solving very fast and robust complex nonlinear systems of ...
A method of adaptive grid refinement for the solution of the steady Euler equations for transonic fl...
A coarse-grid correction algorithm has been implemented into an implicit upwind Euler solver and tes...
A numerical algorithm is presented for solving the 2-D flux-split Euler equations using a multigrid ...
The steady Navier-Stokes equations in primitive variables are discretized in conservative form by a ...
Plus minus flux vector split schemes are combined with the multigrid relaxation method to obtain fas...
This paper consists of two parts. In the first part we give a review of a good multigrid method for ...