Journal
NUMERICAL ALGORITHMS
Volume -, Issue -, Pages -Publisher
SPRINGER
DOI: 10.1007/s11075-023-01587-w
Keywords
Block system of linear equations; Dimensional split preconditioner; Optimal parameter; Spectral property; Navier-Stokes equations
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For a class of three-by-three block systems of linear equations, a multi-parameter dimensional split (MPDS) preconditioner is developed to accelerate the convergence of the Krylov subspace methods. An effective method for computing the optimal parameters is proposed. Numerical examples demonstrate the robustness and efficiency of the MPDS preconditioner for Navier-Stokes equations and PDE constraint optimization problems.
For a class of three-by-three block systems of linear equations arising from many practical problems, we develop a multi-parameter dimensional split (MPDS) preconditioner to accelerate the convergence of the Krylov subspace methods. Inasmuch as the preconditioning effect of the MPDS preconditioner depends on the values of its parameters, an effective method for computing the optimal parameters is also proposed. Moreover, the eigenvalue distribution of the preconditioned matrix is carefully analyzed. Numerical examples arising from the discretizations of the Navier-Stokes equations and the partial differential equation (PDE) constraint optimization problems are employed to illustrate the robustness and the efficiency of the MPDS preconditioner.
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