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Polynomial Preconditioned Arnoldi with Stability Control

Mark Embree, Jennifer Loe, Ronald B. Morgan

2021SIAM Journal on Scientific Computing14 citationsDOIOpen Access PDF

Abstract

Polynomial preconditioning can improve the convergence of the Arnoldi method for computing eigenvalues. Such preconditioning significantly reduces the cost of orthogonalization; for difficult problems, it can also reduce the number of matrix-vector products. Parallel computations can particularly benefit from the reduction of communication-intensive operations. The GMRES algorithm provides a simple and effective way of generating the preconditioning polynomial. For some problems high degree polynomials are especially effective, but they can lead to stability problems that must be mitigated. A two-level “double polynomial preconditioning” strategy provides an effective way to generate high-degree preconditioners.

Topics & Concepts

MathematicsOrthogonalizationGeneralized minimal residual methodPolynomialKrylov subspaceEigenvalues and eigenvectorsMatrix polynomialArnoldi iterationConvergence (economics)Degree of a polynomialApplied mathematicsCondition numberKharitonov's theoremMathematical optimizationIterative methodAlgorithmSquare-free polynomialMathematical analysisPhysicsQuantum mechanicsEconomicsEconomic growthMatrix Theory and AlgorithmsElectromagnetic Scattering and AnalysisNumerical methods for differential equations