In this paper, we present a new sixth-order iterative method for solving nonlinear systems and prove a local convergence result. The new method requires solving five linear systems per iteration. An important feature of the new method is that the LU (lower upper, also called LU factorization) decomposition of the Jacobian matrix is computed only once in each iteration. The computational efficiency index of the new method is compared to that of some known methods. Numerical results are given to show that the convergence behavior of the new method is similar to the existing methods. The new method can be applied to small- and medium-sized nonlinear systems
We study the local convergence of a Newton-like method of convergence order six to approximate a loc...
AbstractThe Adomian decomposition is used in order to obtain a family of methods to solve systems of...
A generalization of the Newton multi-step iterative method is presented, in the form of distinct fam...
AbstractIn this paper, we present and analyze a sixth-order convergent iterative method for solving ...
Abstract. In this paper, we present a new iterative method with order of convergence sixth for solvi...
AbstractIn this work we introduce a technique for solving nonlinear systems that improves the order ...
[EN] In this paper, a three-step iterative method with sixth-order local convergence for approximati...
AbstractIn this paper, we present a sequence of iterative methods improving Newton's method for solv...
In this paper, we present an efficient Newton-like method with fifth-order convergence for nonlinear...
In this paper, we want to construct a new high-order and efficient iterative technique for solving a...
In the present study, we consider multi-step iterative method to solve systems of nonlinear equation...
In this work we introduce a technique for solving nonlinear systems that improves the order of conve...
Based on Traub-Steffensen method, we present a derivative free three-step family of sixth-order meth...
Construction of multi-step iterative method for solving system of nonlinear equations is considered,...
In this study, we present a new highly efficient sixth-order family of iterative methods for solving...
We study the local convergence of a Newton-like method of convergence order six to approximate a loc...
AbstractThe Adomian decomposition is used in order to obtain a family of methods to solve systems of...
A generalization of the Newton multi-step iterative method is presented, in the form of distinct fam...
AbstractIn this paper, we present and analyze a sixth-order convergent iterative method for solving ...
Abstract. In this paper, we present a new iterative method with order of convergence sixth for solvi...
AbstractIn this work we introduce a technique for solving nonlinear systems that improves the order ...
[EN] In this paper, a three-step iterative method with sixth-order local convergence for approximati...
AbstractIn this paper, we present a sequence of iterative methods improving Newton's method for solv...
In this paper, we present an efficient Newton-like method with fifth-order convergence for nonlinear...
In this paper, we want to construct a new high-order and efficient iterative technique for solving a...
In the present study, we consider multi-step iterative method to solve systems of nonlinear equation...
In this work we introduce a technique for solving nonlinear systems that improves the order of conve...
Based on Traub-Steffensen method, we present a derivative free three-step family of sixth-order meth...
Construction of multi-step iterative method for solving system of nonlinear equations is considered,...
In this study, we present a new highly efficient sixth-order family of iterative methods for solving...
We study the local convergence of a Newton-like method of convergence order six to approximate a loc...
AbstractThe Adomian decomposition is used in order to obtain a family of methods to solve systems of...
A generalization of the Newton multi-step iterative method is presented, in the form of distinct fam...