Generalized Laguerre-Gauss Scheme for First Order Hyperbolic Equations on Semi-Infinite Domains
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Date
2015
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Editura Acad Romane
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Abstract
In this article, we develop a numerical approximation for first-order hyperbolic equations on semi-infinite domains by using a spectral collocation scheme. First, we propose the generalized Laguerre-Gauss-Radau collocation scheme for both spatial and temporal discretizations. This in turn reduces the problem to the obtaining of a system of algebraic equations. Second, we use a Newton iteration technique to solve it. Finally, the obtained results are compared with the exact solutions, highlighting the performance of the proposed numerical method.
Description
Alzahrani, Ebraheem/0000-0003-2413-0355; Hafez, Ramy/0000-0001-9533-3171
Keywords
First-Order Hyperbolic Equations, Two-Dimensional Hyperbolic Equations, Collocation Method, Generalized Laguerre-Gauss-Radau Quadrature
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Citation
Bhrawy, A.H...et al. (2015). Generalized Laguerre-Gauss-Radau scheme for first order hyperbolic equations on semi-infinite domains. Romanian Journal of Physics, 60(7-8), 918-934.
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Q2
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Volume
60
Issue
7-8
Start Page
918
End Page
934
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