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Limited‐memory polynomial methods for large‐scale matrix functions

Stefan Güttel, Daniel Kreßner, Kathryn Lund

2020GAMM-Mitteilungen15 citationsDOIOpen Access PDF

Abstract

Abstract Matrix functions are a central topic of linear algebra, and problems requiring their numerical approximation appear increasingly often in scientific computing. We review various limited‐memory methods for the approximation of the action of a large‐scale matrix function on a vector. Emphasis is put on polynomial methods, whose memory requirements are known or prescribed a priori. Methods based on explicit polynomial approximation or interpolation, as well as restarted Arnoldi methods, are treated in detail. An overview of existing software is also given, as well as a discussion of challenging open problems.

Topics & Concepts

PolynomialInterpolation (computer graphics)Algebra over a fieldComputer scienceMatrix (chemical analysis)Applied mathematicsA priori and a posterioriMatrix polynomialScale (ratio)Function (biology)Polynomial matrixMathematicsMathematical optimizationPure mathematicsArtificial intelligenceMathematical analysisEpistemologyEvolutionary biologyMotion (physics)Composite materialPhilosophyMaterials scienceBiologyPhysicsQuantum mechanicsMatrix Theory and AlgorithmsNumerical methods for differential equationsElectromagnetic Scattering and Analysis
Limited‐memory polynomial methods for large‐scale matrix functions | Litcius