The Full Discrete Discontinuous Finite Element Analysis for First-Order Linear Hyperbolic Equation

Che Sun; Shu-Jie Qin

doi:1999-JCM-9085

The Full Discrete Discontinuous Finite Element Analysis for First-Order Linear Hyperbolic Equation

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Year: 1999

Author: Che Sun, Shu-Jie Qin

Journal of Computational Mathematics, Vol. 17 (1999), Iss. 1 : pp. 97–112

Abstract

In this paper, the full discrete discontinuous Galerkin finite element method to solve 2-dimensional first-order linear hyperbolic problem is considered. Two practical schemes, Euler scheme and Crank-Nicolson scheme, are constructed. For each of them, the stability and error estimation with optimal order approximation is established in the norm stronger than $L^2$-norm.

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Journal Article Details

Publisher Name: Global Science Press

Language: English

DOI: https://doi.org/1999-JCM-9085

Journal of Computational Mathematics, Vol. 17 (1999), Iss. 1 : pp. 97–112

Published online: 1999-01

AMS Subject Headings:

Pages: 16

Keywords: Hyperbolic equation Discontinuous F.E.M. Euler scheme.

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Che Sun

Shu-Jie Qin

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The Full Discrete Discontinuous Finite Element Analysis for First-Order Linear Hyperbolic Equation

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The Full Discrete Discontinuous Finite Element Analysis for First-Order Linear Hyperbolic Equation

Abstract

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