A New Jacobi Rational-Gauss Collocation Method for Numerical Solution of Generalized Pantograph Equations
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Date
2014
Journal Title
Journal ISSN
Volume Title
Publisher
Elsevier
Open Access Color
Green Open Access
No
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Top 1%
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Top 10%
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Top 10%
Abstract
This paper is concerned with a generalization of a functional differential equation known as the pantograph equation which contains a linear functional argument. In this article, a new spectral collocation method is applied to solve the generalized pantograph equation with variable coefficients on a semi-infinite domain. This method is based on Jacobi rational functions and Gauss quadrature integration. The Jacobi rational-Gauss method reduces solving the generalized pantograph equation to a system of algebraic equations. Reasonable numerical results are obtained by selecting few Jacobi rational-Gauss collocation points. The proposed Jacobi rational-Gauss method is favorably compared with other methods. Numerical results demonstrate its accuracy, efficiency, and versatility on the half-line. (C) 2013 IMACS. Published by Elsevier B.V. All rights reserved.
Description
Doha, Eid/0000-0002-7781-6871; Hafez, Ramy/0000-0001-9533-3171
Keywords
Functional Differential Equations, Pantograph Equation, Collocation Method, Jacobi Rational-Gauss Quadrature, Jacobi Rational Function, functional differential equations, pantograph equation, collocation method, Finite element, Rayleigh-Ritz, Galerkin and collocation methods for ordinary differential equations, Jacobi rational-Gauss quadrature, Jacobi rational function
Fields of Science
0101 mathematics, 01 natural sciences
Citation
WoS Q
Q1
Scopus Q
Q1
OpenCitations Citation Count
84
Source
Applied Numerical Mathematics
Volume
77
Issue
Start Page
43
End Page
54
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CrossRef : 57
Scopus : 109
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110
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99
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