In this paper, the approximate solutions for systems of nonlinear algebraic equations by the power series method (PSM) are presented. Illustrative examples have been presented to demonstrate the efficiency of the proposed method. In addition, the obtained results are compared with those obtained from the standard Adomian decomposition method. It turns out that the convergence of the proposed algorithm is rapid
Various ordinary differential equations of the first order have recently been used by the author for...
Abstract: Iterative algorithms for solving a system of nonlinear algebraic equa-tions (NAEs): Fi(x j...
AbstractSystems of nonlinear algebraic equations (SNAE) are ubiquitous in the many applications requ...
Nonlinear algebraic equations (NAEs) occur in many areas of science and engineering. The process of ...
AbstractIn this article, we implement a relatively new numerical technique, the Adomian decompositio...
In this article, Adomian’s decomposition method is used to give an analytical solution to homogeneou...
International audienceWe propose new algorithms for the computation of the first N terms of a vector...
This paper proposes power series method (PSM) in order to find solutions for singular partial differ...
In this paper, we used modified power series method to solve nonlinear systems. Some examples were p...
We implement a relatively new analytic iterative technique to get approximate solutions of different...
A new method for finding approximate solutions of nonlinear algebraic equations is proposed. Here we...
Abstract: We propose algorithms that allow for nonlinear equations to obtain asymptotic ex...
AbstractThe author's decomposition method [1] provides a new, efficient computational procedure for ...
AbstractThe Adomian’s decomposition method and the homotopy perturbation method are two powerful met...
In the present paper, we have presented a recursive method namely the Power Series Method (PSM)to so...
Various ordinary differential equations of the first order have recently been used by the author for...
Abstract: Iterative algorithms for solving a system of nonlinear algebraic equa-tions (NAEs): Fi(x j...
AbstractSystems of nonlinear algebraic equations (SNAE) are ubiquitous in the many applications requ...
Nonlinear algebraic equations (NAEs) occur in many areas of science and engineering. The process of ...
AbstractIn this article, we implement a relatively new numerical technique, the Adomian decompositio...
In this article, Adomian’s decomposition method is used to give an analytical solution to homogeneou...
International audienceWe propose new algorithms for the computation of the first N terms of a vector...
This paper proposes power series method (PSM) in order to find solutions for singular partial differ...
In this paper, we used modified power series method to solve nonlinear systems. Some examples were p...
We implement a relatively new analytic iterative technique to get approximate solutions of different...
A new method for finding approximate solutions of nonlinear algebraic equations is proposed. Here we...
Abstract: We propose algorithms that allow for nonlinear equations to obtain asymptotic ex...
AbstractThe author's decomposition method [1] provides a new, efficient computational procedure for ...
AbstractThe Adomian’s decomposition method and the homotopy perturbation method are two powerful met...
In the present paper, we have presented a recursive method namely the Power Series Method (PSM)to so...
Various ordinary differential equations of the first order have recently been used by the author for...
Abstract: Iterative algorithms for solving a system of nonlinear algebraic equa-tions (NAEs): Fi(x j...
AbstractSystems of nonlinear algebraic equations (SNAE) are ubiquitous in the many applications requ...