Limited‐memory polynomial methods for large‐scale matrix functions
Stefan Güttel, Daniel Kreßner, Kathryn Lund
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