Partial Differential Equations 2001
DOI: 10.1016/b978-0-444-50616-0.50013-0
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Geometric multigrid with applications to computational fluid dynamics

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Cited by 32 publications
(40 citation statements)
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“…We also note that Trottenberg et al 30 suggested the specific augmentation of Vanka-style box relaxation in place of distributed relaxation near the domain boundaries. Comparing linear and bilinear interpolation, these results indicate that linear interpolation outperforms bilinear interpolation in this case, matching some existing studies 8,43,44 for other relaxation schemes. Table 4 shows that the measured multigrid convergence factors again match well with the LFA-predicted two-grid convergence factors for inexact Braess-Sarazin relaxation with Dirichlet boundary conditions and that the convergence is h-independent.…”
Section: Figure 11supporting
confidence: 89%
“…We also note that Trottenberg et al 30 suggested the specific augmentation of Vanka-style box relaxation in place of distributed relaxation near the domain boundaries. Comparing linear and bilinear interpolation, these results indicate that linear interpolation outperforms bilinear interpolation in this case, matching some existing studies 8,43,44 for other relaxation schemes. Table 4 shows that the measured multigrid convergence factors again match well with the LFA-predicted two-grid convergence factors for inexact Braess-Sarazin relaxation with Dirichlet boundary conditions and that the convergence is h-independent.…”
Section: Figure 11supporting
confidence: 89%
“…In 1986, Vanka proposed a coupled multigrid method for the solution of the Navier-Stokes equations on structured, staggered grids [4]. The method used a coupled smoother on all grid levels that has come to be known as Symmetric Coupled Gauss-Seidel (SCGS) [5][6][7]. The method was shown to scale optimally (linearly) in terms of both work and storage for the problems investigated.…”
Section: Introductionmentioning
confidence: 99%
“…Brandt 1984Brandt , 2001Trottenberg et al 2001;Thomas et al 2003). Present experience for steady problems indicates that good multigrid performance can nevertheless be obtained 2 , but at the expense of some complexity in the smoother, the spatial discretization scheme, and/or the coarse-grid correction algorithm (see the reviews of Wesseling & Oosterlee 2001;Thomas et al 2003).…”
Section: A47 Page 2 Of 30mentioning
confidence: 99%
“…If this were not the case, a decrease in the convergence speed due to inaccurate coarse-grid correction could result, as has been observed with finite volume discretizations in the original nonboundary-fitted (x, y) space (cf. Wesseling & Oosterlee 2001, and the references cited therein).…”
Section: Rationale For the Transformationmentioning
confidence: 99%
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