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Pré-Publication, Document De Travail Année : 2020

Uniformly accurate numerical schemes for a class of dissipative systems

Résumé

We consider a class of relaxation problems mixing slow and fast variations which can describe population dynamics models or hyperbolic systems, with varying stiffness (from non-stiff to strongly dissipative), and develop a multi-scale method by decomposing this problem into a micro-macro system where the original stiffness is broken. We show that this new problem can therefore be simulated with a uniform order of accuracy using standard explicit numerical schemes. In other words, it is possible to solve the micro-macro problem with a cost independent of the stiffness (a.k.a. uniform cost), such that the error is also uniform. This method is successfully applied to two hyperbolic systems with and without non-linearities, and is shown to circumvent the phenomenon of order reduction.
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Dates et versions

hal-02619512 , version 1 (25-05-2020)
hal-02619512 , version 2 (01-04-2021)

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Philippe Chartier, Mohammed Lemou, Léopold Trémant. Uniformly accurate numerical schemes for a class of dissipative systems. 2020. ⟨hal-02619512v1⟩
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