In this paper, we present and illustrate a frozen Jacobian multistep iterative method to solve systems of nonlinear equations associated with initial value problems (IVPs) and boundary value problems (BVPs). We have used Jacobi-Gauss-Lobatto collocation (J-GL-C) methods to discretize the IVPs and BVPs. Frozen Jacobian multistep iterative methods are computationally very efficient. They require only one inversion of the Jacobian in the form of LU-factorization. The LU factors can then be used repeatedly in the multistep part to solve other linear systems. The convergence order of the proposed iterative method is , where is the number of steps. The validity, accuracy, and efficiency of our proposed frozen Jacobian multistep iterative method i...
This paper proposes a multi-step iterative method for solving systems of nonlinear equations with a ...
A class of iterative methods without restriction on the computation of Fréchet derivatives including...
A generalization of the Newton multi-step iterative method is presented, in the form of distinct fam...
In this paper, we present and illustrate a frozen Jacobian multistep iterative method to solve syste...
Frozen Jacobian iterative methods are of practical interest to solve the system of nonlinear equatio...
A multi-step frozen Jacobian iterative scheme for solving system of nonlinear equations associated w...
A multi-step frozen Jacobian iterative scheme for solving system of nonlinear equations associa...
A homotopy method is presented for the construction of frozen Jacobian iterative methods. The frozen...
A homotopy method is presented for the construction of frozen Jacobian iterative methods. The frozen...
A homotopy method is presented for the construction of frozen Jacobian iterative methods. The frozen...
It is well-known that the solution of Hamilton-Jacobi equation may have singularity i.e., the soluti...
Construction of multi-step iterative method for solving system of nonlinear equations is considered,...
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 ...
A class of iterative methods without restriction on the computation of Fréchet derivatives including...
A generalization of the Newton multi-step iterative method is presented, in the form of distinct fam...
In this paper, we present and illustrate a frozen Jacobian multistep iterative method to solve syste...
Frozen Jacobian iterative methods are of practical interest to solve the system of nonlinear equatio...
A multi-step frozen Jacobian iterative scheme for solving system of nonlinear equations associated w...
A multi-step frozen Jacobian iterative scheme for solving system of nonlinear equations associa...
A homotopy method is presented for the construction of frozen Jacobian iterative methods. The frozen...
A homotopy method is presented for the construction of frozen Jacobian iterative methods. The frozen...
A homotopy method is presented for the construction of frozen Jacobian iterative methods. The frozen...
It is well-known that the solution of Hamilton-Jacobi equation may have singularity i.e., the soluti...
Construction of multi-step iterative method for solving system of nonlinear equations is considered,...
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 ...
A class of iterative methods without restriction on the computation of Fréchet derivatives including...
A generalization of the Newton multi-step iterative method is presented, in the form of distinct fam...