Block-implicit multigrid solution of Navier-Stokes equations in primitive variables
Journal of Computational Physics
A second-order accurate pressure correction scheme for viscous incompressible flow
SIAM Journal on Scientific and Statistical Computing
Analysis of a multigrid Stokes solver
Applied Mathematics and Computation
On error estimates of the projection methods for the Navier-Stokes equations: second-order schemes
Mathematics of Computation
A numerical method for solving incompressible viscous flow problems
Journal of Computational Physics - Special issue: commenoration of the 30th anniversary
Journal of Computational Physics
Geometric multigrid with applications to computational fluid dynamics
Journal of Computational and Applied Mathematics - Special issue on numerical analysis 2000 Vol. VII: partial differential equations
Multigrid
Principles of Computational Fluid Dynamics
Principles of Computational Fluid Dynamics
An immersed interface method for Stokes flows with fixed/moving interfaces and rigid boundaries
Journal of Computational Physics
Journal of Scientific Computing
International Journal of High Performance Computing Applications
Hi-index | 0.00 |
The choice of multigrid method depends strongly on the type of discretization used and the problem formulation employed. This article gives an overview of multigrid methods for the Stokes equations, focusing on the saddle-point problem and on stable discretizations for staggered and vertex-centered grids.