Order of accuracy & Stability

Version 1.0.0 (11,4 ko) par Manuel A. Diaz

This snippet shows how I examine the order of accuracy (OOA) and the numerical stability for a given numerical scheme.

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In this snippet I examine the OOA and the stability for Lele's 6th-order numerical scheme [1] using a challeging stationary-wave problem proposed by Brady & Livescu (2019) [2] using the one-dimensional system of the wave equation.

Refs:

[1] Lele, Sanjiva K. "Compact finite difference schemes with spectral-like resolution." Journal of computational physics103.1 (1992): 16-42.

[2] Brady, Peter T., and Daniel Livescu. "High-order, stable, and conservative boundary schemes for central and compact finite differences." Computers & Fluids 183 (2019): 84-101.

Citation pour cette source

Manuel A. Diaz (2025). Order of accuracy & Stability (https://fr.mathworks.com/matlabcentral/fileexchange/118140-order-of-accuracy-stability), MATLAB Central File Exchange. Extrait(e) le décembre 9, 2025.

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Créé avec R2022b

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Inspiré par : Easy build compact schemes, Easy build finite-difference operators, compact schemes

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Version	Publié le	Notes de version
1.0.0	26 sept. 2022		Télécharger