Title of article
Block iterative solvers for higher order finite volume methods
Author/Authors
Kwak، نويسنده , , Do Y. and Lee، نويسنده , , Hijin، نويسنده ,
Issue Information
روزنامه با شماره پیاپی سال 2009
Pages
10
From page
378
To page
387
Abstract
Recently, new higher order finite volume methods (FVM) were introduced in [Z. Cai, J. Douglas, M. Park, Development and analysis of higher order finite volume methods over rectangles for elliptic equations, Adv. Comput. Math. 19 (2003) 3–33], where the linear system derived by the hybridization with Lagrange multiplier satisfying the flux consistency condition is reduced to a linear system for a pressure variable by an appropriate quadrature rule. We study the convergence of an iterative solver for this linear system. The conjugate gradient (CG) method is a natural choice to solve the system, but it seems slow, possibly due to the non-diagonal dominance of the system. In this paper, we propose block iterative methods with a reordering scheme to solve the linear system derived by the higher order FVM and prove their convergence. With a proper ordering, each block subproblem can be solved by fast methods such as the multigrid (MG) method. The numerical experiments show that these block iterative methods are much faster than CG.
Keywords
Mixed finite element method , Finite volume method , Block iterative method , Rectangular grid , Cell-centered multigrid
Journal title
Journal of Computational and Applied Mathematics
Serial Year
2009
Journal title
Journal of Computational and Applied Mathematics
Record number
1555275
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