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Exponential integrators for linear inhomogeneous problems

Marina A. Medvedeva, Theodore E. Simos, Ch. Tsitouras

2020Mathematical Methods in the Applied Sciences18 citationsDOI

Abstract

We consider the mildly stiff and stiff inhomogeneous linear initial value Problems sharing constant coefficients. Exponential Runge–Kutta methods are considered to tackle this problem. For this type of problem, we were able to save a function evaluation (stage) per step compared to the best available methods. This is important, as seen in various computational experiments where our current approach outperforms older ones.

Topics & Concepts

MathematicsRunge–Kutta methodsExponential functionConstant (computer programming)IntegratorExponential integratorApplied mathematicsInitial value problemExponential growthFunction (biology)Mathematical optimizationMathematical analysisNumerical analysisDifferential equationComputer scienceOrdinary differential equationBiologyEvolutionary biologyBandwidth (computing)Programming languageDifferential algebraic equationComputer networkNumerical methods for differential equationsMatrix Theory and AlgorithmsAdvanced Numerical Methods in Computational Mathematics