A priori error analysis of linear and nonlinear periodic Schrödinger equations with analytic potentials

This paper is concerned with the numerical analysis of linear and nonlinear Schrödinger equations with analytic potentials. While the regularity of the potential (and the source term when there is one) automatically conveys to the solution in the linear cases, this is no longer true in general in the nonlinear case. We also study the rate of convergence of the planewave (Fourier) discretization method for computing numerical approximations of the solution.

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Analyse numérique [math.NA]

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Gaspard Kemlin : Connectez-vous pour contacter le contributeur

https://inria.hal.science/hal-03692851

Soumis le : lundi 13 novembre 2023-14:48:35

Dernière modification le : jeudi 28 mars 2024-03:29:03

Dates et versions

hal-03692851 , version 1 (10-06-2022)

hal-03692851 , version 2 (30-03-2023)

hal-03692851 , version 3 (13-11-2023)

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Paternité

Identifiants

HAL Id : hal-03692851 , version 3
ARXIV : 2206.04954
DOI : 10.1007/s10915-023-02421-0

Citer

Eric Cancès, Gaspard Kemlin, Antoine Levitt. A priori error analysis of linear and nonlinear periodic Schrödinger equations with analytic potentials. Journal of Scientific Computing, 2023, 98 (1), pp.25. ⟨10.1007/s10915-023-02421-0⟩. ⟨hal-03692851v3⟩

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