Add to ORKGIn this study, a collocation method based on Bernstein polynomials is developed for solution of the nonlinear ordinary differential equations with variable coefficients, under the mixed conditions. These equations are expressed as linear ordinary differential equations via quasilinearization method iteratively. By using the Bernstein collocation method, solutions of these linear equations are approximated. Combining the quasilinearization and the Bernstein collocation methods, the approximation solution of nonlinear differential equations is obtained. Moreover, some numerical solutions are given to illustrate the accuracy and implementation of the method
Nonlinear differential equations have many applications in different science and engineering discipl...
Abstract In this work, a numerical technique for solving general nonlinear ordinary differential equ...
In this paper, a new numerical method based on the Bernstein polynomials is introduced for the appro...
In this study, we present the Bernstein matrix method to solve the first order nonlinear ordinary di...
In this study, a new collocation method based on Bernstein polynomials defined on the interval [a, b...
In this study, an approximate method based on Bernstein polynomials has been presented to obtain the...
A collocation method based on the Bernstein polynomials defined on the interval [a,b] is developed f...
AbstractAn algorithm for approximating solutions to differential equations in a modified new Bernste...
In this article, we apply Chebyshev collocation method to obtain the numerical solutions of nonlinea...
We extend a collocation method for solving a nonlinear ordinar...
AbstractAn algorithm for approximating solutions to differential equations in a modified new Bernste...
Nonlinear differential equations have many applications in different science and engineering discipl...
Nonlinear differential equations have many applications in different science and engineering discipl...
In this paper, we used Bernstein polynomials to modify the Adomian decomposition method which can be...
A collocation method based on the Bernstein polynomials defined on the interval [a,b] is developed f...
Nonlinear differential equations have many applications in different science and engineering discipl...
Abstract In this work, a numerical technique for solving general nonlinear ordinary differential equ...
In this paper, a new numerical method based on the Bernstein polynomials is introduced for the appro...
In this study, we present the Bernstein matrix method to solve the first order nonlinear ordinary di...
In this study, a new collocation method based on Bernstein polynomials defined on the interval [a, b...
In this study, an approximate method based on Bernstein polynomials has been presented to obtain the...
A collocation method based on the Bernstein polynomials defined on the interval [a,b] is developed f...
AbstractAn algorithm for approximating solutions to differential equations in a modified new Bernste...
In this article, we apply Chebyshev collocation method to obtain the numerical solutions of nonlinea...
We extend a collocation method for solving a nonlinear ordinar...
AbstractAn algorithm for approximating solutions to differential equations in a modified new Bernste...
Nonlinear differential equations have many applications in different science and engineering discipl...
Nonlinear differential equations have many applications in different science and engineering discipl...
In this paper, we used Bernstein polynomials to modify the Adomian decomposition method which can be...
A collocation method based on the Bernstein polynomials defined on the interval [a,b] is developed f...
Nonlinear differential equations have many applications in different science and engineering discipl...
Abstract In this work, a numerical technique for solving general nonlinear ordinary differential equ...
In this paper, a new numerical method based on the Bernstein polynomials is introduced for the appro...