AD Galerkin Analysis for Nonlinear Pseudo-Hyperbolic Equations

doi:2003-JCM-8875

AD Galerkin Analysis for Nonlinear Pseudo-Hyperbolic Equations

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Year: 2003

Journal of Computational Mathematics, Vol. 21 (2003), Iss. 2 : pp. 125–134

Abstract

AD (Alternating direction) Galerkin schemes for $d$-dimensional nonlinear pseudo-hyperbolic equations are studied. By using patch approximation technique, AD procedure is realized, and calculation work is simplified. By using Galerkin approach, highly computational accuracy is kept. By using various priori estimate techniques for differential equations, difficulty coming from non-linearity is treated, and optimal $H^1$ and $L^2$ convergence properties are demonstrated. Moreover, although all the existed AD Galerkin schemes using patch approximation are limited to have only one order accuracy in time increment, yet the schemes formulated in this paper have second order accuracy in it. This implies an essential advancement in AD Galerkin analysis.

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Journal Article Details

Publisher Name: Global Science Press

Language: English

DOI: https://doi.org/2003-JCM-8875

Journal of Computational Mathematics, Vol. 21 (2003), Iss. 2 : pp. 125–134

Published online: 2003-01

AMS Subject Headings:

Pages: 10

Keywords: nonlinear pseudo-hyperbolic equation alternating direction numerical analysis.

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