Multigrid methods for the symmetric interior penalty method on graded meshes

V -cycle, F -cycle and W -cycle multigrid algorithms for interior penalty methods for second order elliptic boundary value problems are studied in this paper. It is shown that these algorithms converge uniformly with respect to all grid levels if the number of smoothing steps is sufficiently large,

The continuous interior penalty (CIP) method for elliptic convection-diffusion problems with characteristic layers on a Shishkin mesh is analysed. The method penalises jumps of the normal derivative across interior edges. We show that it is of the same order of convergence as the streamline diffusio

whelming. On the other hand, the development of efficient numerical methods for solution of the Navier-Stokes equa-Efficient preconditioned multigrid methods are developed for both inviscid and viscous flow applications. The work is motivated tions remains one of the ongoing challenges in the field

We propose stabilized interior penalty discontinuous Galerkin methods for the indefinite time-harmonic Maxwell system. The methods are based on a mixed formulation of the boundary value problem chosen to provide control on the divergence of the electric field. We prove optimal error estimates for th