Title of article
Solving high-order partial differential equations in unbounded domains by means of double exponential second kind Chebyshev approximation
Author/Authors
Ramadan ، Mohamed Abdel-Latif - Menoufia University , Raslan ، Kamal Mohamed - Al-Azhar University , El-Danaf ، Talaat El-Sayed - Taibah University Madinah Munawwarah , Abd El Salam ، Mohamed Ahmed - Al-Azhar University
Pages
16
From page
147
To page
162
Abstract
In this paper, a collocation method for solving highorder linear partial differential equations (PDEs) with variable coefficients under more general form of conditions is presented. This method is based on the approximation of the truncated double exponential second kind Chebyshev (ESC) series. The definition of the partial derivative is presented and derived as new operational matrices of derivatives. All principles and properties of the ESC functions are derived and introduced by us as a new basis defined in the whole range. The method transforms the PDEs and conditions into block matrix equations, which correspond to system of linear algebraic equations with unknown ESC coefficients, by using ESC collocation points. Combining these matrix equations and then solving the system yield the ESC coefficients of the solution function. Numerical examples are included to test the validity and applicability of the method.
Keywords
Exponential second kind Chebyshev functions , High , order partial differential equations , Collocation method.
Journal title
Computational Methods for Differential Equations
Serial Year
2015
Journal title
Computational Methods for Differential Equations
Record number
2456789
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