Add to ORKGIn this paper, a new approximate method for solving higher-order linear ordinary differential equations with variable coefficients under the mixed conditions is presented. The method is based on the rational Chebyshev (RC) Tau, Chebyshev and Taylor collocation methods. The solution is obtained in terms of rational Chebyshev (RC) functions. Also, illustrative examples are given to demonstrate the validity and applicability of the method
In this article, a collocation method is developed to find an approximate solution of higher order l...
In this paper, we have developed a new method called Generalized Taylor collocation method (GTCM), w...
In this study, a new collocation method based on Bernstein polynomials defined on the interval [a, b...
In this paper, a new approximate method for solving higher-order linear ordinary differential equati...
In this article, a new method is presented for the solution of high-order linear partial differentia...
In this article, a new method is presented for the solution of high-order linear partial differentia...
A Chebyshev collocation method has been presented for numerically solving systems of high-order line...
A Chebyshev collocation method has been presented for numerically solving systems of high-order line...
A Chebyshev collocation method has been presented for numerically solving systems of high-order line...
A Chebyshev collocation method has been presented for numerically solving systems of high-order line...
A Chebyshev collocation method has been presented for numerically solving systems of high-order line...
In this article, a new method is presented for the solution of high-order linear partial differentia...
In this paper, a Taylor method is developed to find an approximate solution of high-order linear dif...
Abstract In this work, a numerical technique for solving general nonlinear ordinary differential equ...
By the use of the Chebyshev series, a direct computational method for solving the higher order nonli...
In this article, a collocation method is developed to find an approximate solution of higher order l...
In this paper, we have developed a new method called Generalized Taylor collocation method (GTCM), w...
In this study, a new collocation method based on Bernstein polynomials defined on the interval [a, b...
In this paper, a new approximate method for solving higher-order linear ordinary differential equati...
In this article, a new method is presented for the solution of high-order linear partial differentia...
In this article, a new method is presented for the solution of high-order linear partial differentia...
A Chebyshev collocation method has been presented for numerically solving systems of high-order line...
A Chebyshev collocation method has been presented for numerically solving systems of high-order line...
A Chebyshev collocation method has been presented for numerically solving systems of high-order line...
A Chebyshev collocation method has been presented for numerically solving systems of high-order line...
A Chebyshev collocation method has been presented for numerically solving systems of high-order line...
In this article, a new method is presented for the solution of high-order linear partial differentia...
In this paper, a Taylor method is developed to find an approximate solution of high-order linear dif...
Abstract In this work, a numerical technique for solving general nonlinear ordinary differential equ...
By the use of the Chebyshev series, a direct computational method for solving the higher order nonli...
In this article, a collocation method is developed to find an approximate solution of higher order l...
In this paper, we have developed a new method called Generalized Taylor collocation method (GTCM), w...
In this study, a new collocation method based on Bernstein polynomials defined on the interval [a, b...