We developed multi-step iterative method for computing the numerical solution of nonlinear systems, associated with ordinary differential equations (ODEs) of the form L(x(t))+f(x(t))=g(t): here L(·) is a linear differential operator and f(·) is a nonlinear smooth function. The proposed iterative scheme only requires one inversion of Jacobian which is computationally very efficient if either LU-decomposition or GMRES-type methods are employed. The higher-order Frechet derivatives of the nonlinear system stemming from the considered ODEs are diagonal matrices. We used the higher-order Frechet derivatives to enhance the convergence-order of the iterative schemes proposed in this note and indeed the use of a multi-step method dramatically incre...
A multi-step frozen Jacobian iterative scheme for solving system of nonlinear equations associated w...
A generalization of the Newton multi-step iterative method is presented, in the form of distinct fam...
A multi-step frozen Jacobian iterative scheme for solving system of nonlinear equations associa...
We developed multi-step iterative method for computing the numerical solution of nonlinear systems, ...
We developed multi-step iterative method for computing the numerical solution of nonlinear systems, ...
The main focus of research in the current article is to address the construction of an efficient hig...
In the present study, we consider multi-step iterative method to solve systems of nonlinear equation...
This paper proposes a multi-step iterative method for solving systems of nonlinear equations with a ...
Construction of multi-step iterative method for solving system of nonlinear equations is considered,...
The primary focus of research in this thesis is to address the construction of iterative methods for...
Frozen Jacobian iterative methods are of practical interest to solve the system of nonlinear equatio...
Although there are many numerical solution approaches to ordinary differential equations (ODEs) in t...
In this paper, we suggest and analyze two new algorithm of fourth and fifth order convergence. We re...
A multi-step frozen Jacobian iterative scheme for solving system of nonlinear equations associated w...
A generalization of the Newton multi-step iterative method is presented, in the form of distinct fam...
A multi-step frozen Jacobian iterative scheme for solving system of nonlinear equations associa...
We developed multi-step iterative method for computing the numerical solution of nonlinear systems, ...
We developed multi-step iterative method for computing the numerical solution of nonlinear systems, ...
The main focus of research in the current article is to address the construction of an efficient hig...
In the present study, we consider multi-step iterative method to solve systems of nonlinear equation...
This paper proposes a multi-step iterative method for solving systems of nonlinear equations with a ...
Construction of multi-step iterative method for solving system of nonlinear equations is considered,...
The primary focus of research in this thesis is to address the construction of iterative methods for...
Frozen Jacobian iterative methods are of practical interest to solve the system of nonlinear equatio...
Although there are many numerical solution approaches to ordinary differential equations (ODEs) in t...
In this paper, we suggest and analyze two new algorithm of fourth and fifth order convergence. We re...
A multi-step frozen Jacobian iterative scheme for solving system of nonlinear equations associated w...
A generalization of the Newton multi-step iterative method is presented, in the form of distinct fam...
A multi-step frozen Jacobian iterative scheme for solving system of nonlinear equations associa...