Construction and analysis of higher order finite difference schemes for the 1D wave equation

L. Anne; P. Joly; Q. H. Tran

doi:10.1023/A:1011520202197

Construction and analysis of higher order finite difference schemes for the 1D wave equation

L. Anne
, P. Joly
, Q. H. Tran

SIMULOG

Research output: Contribution to journal › Article › peer-review

Abstract

In this article, we propose to: 1. Establish most of the properties conjectured in [2] about the higher order finite difference approximation of the 1D Laplace operator. 2. Generalize to any order the fourth-order accurate scheme in space and time of Shubin and Bell [20] and Cohen [6]. For this new family of 2m-2m schemes, we establish, via elementary mathematics, various stability and dispersion results that are helpful to compare these schemes to the 2-2m schemes of Anne et al. [2].

Original language	English
Pages (from-to)	207-249
Number of pages	43
Journal	Computational Geosciences
Volume	4
Issue number	3
DOIs	https://doi.org/10.1023/A:1011520202197
Publication status	Published - 1 Jan 2000
Externally published	Yes

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abstract = "In this article, we propose to: 1. Establish most of the properties conjectured in [2] about the higher order finite difference approximation of the 1D Laplace operator. 2. Generalize to any order the fourth-order accurate scheme in space and time of Shubin and Bell [20] and Cohen [6]. For this new family of 2m-2m schemes, we establish, via elementary mathematics, various stability and dispersion results that are helpful to compare these schemes to the 2-2m schemes of Anne et al. [2].",

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AU - Joly, P.

AU - Tran, Q. H.

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Y1 - 2000/1/1

N2 - In this article, we propose to: 1. Establish most of the properties conjectured in [2] about the higher order finite difference approximation of the 1D Laplace operator. 2. Generalize to any order the fourth-order accurate scheme in space and time of Shubin and Bell [20] and Cohen [6]. For this new family of 2m-2m schemes, we establish, via elementary mathematics, various stability and dispersion results that are helpful to compare these schemes to the 2-2m schemes of Anne et al. [2].

AB - In this article, we propose to: 1. Establish most of the properties conjectured in [2] about the higher order finite difference approximation of the 1D Laplace operator. 2. Generalize to any order the fourth-order accurate scheme in space and time of Shubin and Bell [20] and Cohen [6]. For this new family of 2m-2m schemes, we establish, via elementary mathematics, various stability and dispersion results that are helpful to compare these schemes to the 2-2m schemes of Anne et al. [2].

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DO - 10.1023/A:1011520202197

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EP - 249

JO - Computational Geosciences

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ER -

Construction and analysis of higher order finite difference schemes for the 1D wave equation

Abstract

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