Application of p-Multigrid to Discontinuous Galerkin Formulations of the Poisson Equation

We investigate p-multigrid as a solution method for several different discontinuous Galerkin (DG) formulations of the Poisson equation. Different combinations of relaxation schemes and basis sets have been combined with the DG formulations to find the best performing combination. The damping factors of the schemes have been determined using Fourier analysis for both one and two-dimensional problems. One important finding is that when using DG formulations, the standard approach of forming the coarse p matrices separately for each level of multigrid is often unstable. To ensure stability the coarse p matrices must be constructed from the fine grid matrices using algebraic multigrid techniques. Of the relaxation schemes, we find that the combination of Jacobi relaxation with the spectral element basis is fairly effective. The results using this combination are p sensitive in both one and two dimensions, but reasonable convergence rates can still be achieved for moderate values of p and isotropic meshes. A competitive alternative is a block Gauss-Seidel relaxation. This actually out performs a more expensive line relaxation when the mesh is isotropic. When the mesh becomes highly anisotropic, the implicit line method and the Gauss-Seidel implicit line method are the only effective schemes. Adding the Gauss-Seidel terms to the implicit line method gives a significant improvement over the line relaxation method.

[1]  Chi-Wang Shu,et al.  Runge–Kutta Discontinuous Galerkin Methods for Convection-Dominated Problems , 2001, J. Sci. Comput..

[2]  Chi-Wang Shu,et al.  The Local Discontinuous Galerkin Method for Time-Dependent Convection-Diffusion Systems , 1998 .

[3]  Douglas N. Arnold,et al.  Unified Analysis of Discontinuous Galerkin Methods for Elliptic Problems , 2001, SIAM J. Numer. Anal..

[4]  Dimitri J. Mavriplis,et al.  Directional Agglomeration Multigrid Techniques for High-Reynolds Number Viscous Flows , 1998 .

[5]  Antony Jameson,et al.  Fast preconditioned multigrid solution of the Euler and Navier–Stokes equations for steady, compressible flows , 2003 .

[6]  Anthony T. Patera,et al.  Spectral element multigrid. I. Formulation and numerical results , 1987 .

[7]  J. Douglas,et al.  Interior Penalty Procedures for Elliptic and Parabolic Galerkin Methods , 1976 .

[8]  Rainald Löhner,et al.  A p-multigrid discontinuous Galerkin method for the Euler equations on unstructured grids , 2006 .

[9]  Chi-Wang Shu,et al.  Analysis of Preconditioning and Relaxation Operators for the Discontinuous Galerkin Method Applied to Diffusion , 2001 .

[10]  Brian T. Helenbrook,et al.  A two-fluid spectral-element method , 2001 .

[11]  Y. Maday,et al.  Spectral element multigrid. Part 2: Theoretical justification , 1988 .

[12]  Brian T. Helenbrook,et al.  Analysis of ``p''-Multigrid for Continuous and Discontinuous Finite Element Discretizations , 2003 .

[13]  D. Mavriplis UNSTRUCTURED GRID TECHNIQUES , 1997 .

[14]  Antony Jameson,et al.  How Many Steps are Required to Solve the Euler Equations of Steady, Compressible Flow: In Search of a Fast Solution Algorithm , 2001 .

[15]  S. Rebay,et al.  A High-Order Accurate Discontinuous Finite Element Method for the Numerical Solution of the Compressible Navier-Stokes Equations , 1997 .

[16]  Paul F. Fischer,et al.  Hybrid Multigrid/Schwarz Algorithms for the Spectral Element Method , 2005, J. Sci. Comput..

[17]  David L. Darmofal,et al.  p-Multigrid solution of high-order discontinuous Galerkin discretizations of the compressible Navier-Stokes equations , 2005 .

[18]  Harold L. Atkins,et al.  QUADRATURE-FREE IMPLEMENTATION OF DISCONTINUOUS GALERKIN METHOD FOR HYPERBOLIC EQUATIONS , 1996 .

[19]  T. Hughes,et al.  Streamline upwind/Petrov-Galerkin formulations for convection dominated flows with particular emphasis on the incompressible Navier-Stokes equations , 1990 .

[20]  Krzysztof J. Fidkowski,et al.  A high-order discontinuous Galerkin multigrid solver for aerodynamic applications , 2004 .

[21]  W. H. Reed,et al.  Triangular mesh methods for the neutron transport equation , 1973 .

[22]  Pieter W. Hemker,et al.  Two-Level Fourier Analysis of a Multigrid Approach for Discontinuous Galerkin Discretization , 2003, SIAM J. Sci. Comput..

[23]  V. Venkatakrishnan,et al.  A 3D AGGLOMERATION MULTIGRID SOLVER FOR THE REYNOLDS-AVERAGED NAVIER-STOKES EQUATIONS ON UNSTRUCTURED MESHES , 1995 .