Search results for "Equacions diferencials"

showing 2 items of 2 documents

A Unifying Framework for Perturbative Exponential Factorizations

2021

We propose a framework where Fer and Wilcox expansions for the solution of differential equations are derived from two particular choices for the initial transformation that seeds the product expansion. In this scheme, intermediate expansions can also be envisaged. Recurrence formulas are developed. A new lower bound for the convergence of theWilcox expansion is provided, as well as some applications of the results. In particular, two examples are worked out up to a high order of approximation to illustrate the behavior of the Wilcox expansion.

Differential equationGeneral MathematicsEquacions diferencials01 natural sciencesUpper and lower bounds010305 fluids & plasmas0103 physical sciencesConvergence (routing)Fer expansionComputer Science (miscellaneous)Applied mathematicsZassenhaus formula010306 general physicsEngineering (miscellaneous)Mathematicslcsh:MathematicsBellman problemWilcox expansionOrder (ring theory)lcsh:QA1-939Exponential functionTransformation (function)sequences of linear transformationsProduct (mathematics)Scheme (mathematics)MatemàticaMathematics
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Scheduled Relaxation Jacobi method: improvements and applications

2016

Elliptic partial differential equations (ePDEs) appear in a wide variety of areas of mathematics, physics and engineering. Typically, ePDEs must be solved numerically, which sets an ever growing demand for efficient and highly parallel algorithms to tackle their computational solution. The Scheduled Relaxation Jacobi (SRJ) is a promising class of methods, atypical for combining simplicity and efficiency, that has been recently introduced for solving linear Poisson-like ePDEs. The SRJ methodology relies on computing the appropriate parameters of a multilevel approach with the goal of minimizing the number of iterations needed to cut down the residuals below specified tolerances. The efficien…

Physics and Astronomy (miscellaneous)Iterative methodParallel algorithmJacobi methodFinite differences methodFOS: Physical sciencesAlgorismesSystem of linear equations01 natural sciencesReduction (complexity)symbols.namesake0103 physical sciencesFOS: MathematicsMathematics - Numerical Analysis0101 mathematicsJacobi method010303 astronomy & astrophysicsMathematicsHigh Energy Astrophysical Phenomena (astro-ph.HE)Numerical AnalysisApplied MathematicsLinear systemRelaxation (iterative method)Numerical Analysis (math.NA)Equacions diferencials parcialsElliptic equationsComputational Physics (physics.comp-ph)Iterative methodComputer Science Applications010101 applied mathematicsComputational MathematicsElliptic partial differential equationModeling and SimulationsymbolsAstrophysics - High Energy Astrophysical PhenomenaPhysics - Computational PhysicsAlgorithm
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