A block preconditioner for high-order mixed finite element approximations to the Navier-Stokes equations
An iterative solver for the linear system arising from a discretization by high-order mixed finite elements for the linearized steady state Navier-Stokes problem is presented. Two mixed finite elements are considered: P k+1Pk and Pk+2Pk. The iterative solver is based on the GMRES method with right p...
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| 格式: | Journal article |
| 语言: | English |
| 出版: |
2006
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| 总结: | An iterative solver for the linear system arising from a discretization by high-order mixed finite elements for the linearized steady state Navier-Stokes problem is presented. Two mixed finite elements are considered: P k+1Pk and Pk+2Pk. The iterative solver is based on the GMRES method with right preconditioning where the preconditioner has a block upper triangular form. Computational results show that the convergence rate seems to be independent of the grid size parameter h and the polynomial degree k but is slightly affected by the increasing of the Reynolds number. © 2006 Society for Industrial and Applied Mathematics. |
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