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Fast Solution Methods for Fractional Differential Equations in the Modeling of Viscoelastic Materials

Kai Diethelm

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Abstract

Fractiona1 order models have proven to be a very useful tool for the modeling of the mechanical behaviour of viscoelastic materials. Traditional numerical solution methods exhibit various undesired properties due to the non-locality of the fractional differential operators, in particular regarding the high computational complexity and the high memory requirements. The infinite state representation is an approach on which one can base numerical methods that overcome these obstacles. Such algorithms contain a number of parameters that influence the final result in nontrivial ways. Based on numerical experiments, we initiate a study leading to good choices of these parameters.

Topics & Concepts

ViscoelasticityRepresentation (politics)LocalityComputer scienceDifferential equationApplied mathematicsFractional calculusNumerical analysisBase (topology)Differential (mechanical device)MathematicsMathematical optimizationMathematical analysisEngineeringPhysicsLinguisticsLawThermodynamicsPhilosophyPoliticsPolitical scienceAerospace engineeringFractional Differential Equations SolutionsNumerical methods for differential equationsIterative Methods for Nonlinear Equations
Fast Solution Methods for Fractional Differential Equations in the Modeling of Viscoelastic Materials | Litcius