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Article Dans Une Revue BIT Numerical Mathematics Année : 2015

Weak backward error analysis for Langevin process

Marie Kopec
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Invariant Preserving SOlvers
Institut de Recherche Mathématique de Rennes

Résumé

We consider numerical approximations of stochastic Langevin equations by implicit methods. We show a weak backward error analysis result in the sense that the generator associated with the numerical solution coincides with the solution of a modified Kolmogorov equation up to high order terms with respect to the stepsize. This implies that every measure of the numerical scheme is close to a modified invariant measure obtained by asymptotic expansion. Moreover, we prove that, up to negligible terms, the dynamic associated with the implicit scheme considered is exponentially mixing.

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Analyse numérique [math.NA] Probabilités [math.PR]

Marie-Annick Guillemer  : Connectez-vous pour contacter le contributeur

https://hal.science/hal-00905689

Soumis le : lundi 18 novembre 2013-15:33:20

Dernière modification le : lundi 22 avril 2024-15:41:57

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Dates et versions

hal-00905689 , version 1 (18-11-2013)

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Marie Kopec. Weak backward error analysis for Langevin process. BIT Numerical Mathematics, 2015, 55 (4), pp.1057-1103. ⟨10.1007/s10543-015-0546-0⟩. ⟨hal-00905689⟩

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