Title of article
Smoothed aggregation multigrid solvers for high-order discontinuous Galerkin methods for elliptic problems
Author/Authors
Olson، نويسنده , , Luke N. and Schroder، نويسنده , , Jacob B.، نويسنده ,
Issue Information
روزنامه با شماره پیاپی سال 2011
Pages
18
From page
6959
To page
6976
Abstract
We develop a smoothed aggregation-based algebraic multigrid solver for high-order discontinuous Galerkin discretizations of the Poisson problem. Algebraic multigrid is a popular and effective method for solving the sparse linear systems that arise from discretizing partial differential equations. However, high-order discontinuous Galerkin discretizations have proved challenging for algebraic multigrid. The increasing condition number of the matrix and loss of locality in the matrix stencil as p increases, in addition to the effect of weakly enforced Dirichlet boundary conditions all contribute to the challenging algebraic setting.
pose a smoothed aggregation approach that addresses these difficulties. In particular, the approach effectively coarsens degrees-of-freedom centered at the same spatial location as well as degrees-of-freedom at the domain boundary. Moreover, the character of the near null-space, particularly at the domain boundary, is captured by interpolation. One classic prolongation smoothing step of weighted-Jacobi is also shown to be ineffective at high-order, and a more robust energy-minimization approach is used, along with block relaxation that more directly utilizes the block diagonal structure of the discontinuous Galerkin discretization. Finally, we conclude by examining numerical results in support our proposed method.
Keywords
discontinuous Galerkin , algebraic multigrid , AMG , Smoothed aggregation , High-order
Journal title
Journal of Computational Physics
Serial Year
2011
Journal title
Journal of Computational Physics
Record number
1483643
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