This paper deals with a new numerical iterative method for finding the approximate solutions associated with both scalar and vector nonlinear equations. The iterative method proposed here is an extended version of the numerical procedure originally developed in previous works. The present study proposes to show that this new root-finding algorithm combined with a stationary-type iterative method (e.g., Gauss-Seidel or Jacobi) is able to provide a longer accurate solution than classical Newton-Raphson method. A numerical analysis of the developed iterative method is addressed and discussed on some specific equations and systems
AbstractIn this paper, we develop some new iterative methods for solving nonlinear equations by usin...
AbstractIn this paper two new iterative methods are built up and analyzed. A generalization of the e...
AbstractIterative methods for the solution of nonlinear systems of equations such as Newton's method...
In this study, a new root-finding method for solving nonlinear equations is proposed. This method re...
The primary focus of research in this thesis is to address the construction of iterative methods for...
A new iterative method for the approximation of the root of a nonlinear function f in one variable i...
In this paper we present the geometrical interpretation of several iterative methods to solve a nonl...
A new iterative method to find the root of a nonlinear scalar function f is proposed. The method is ...
We present another simple way of deriving several iterative methods for solving nonlinear equations ...
The e ciency of algorithms for solving nonlinear equations is a measure of comparison between di ere...
AbstractIn this work, we develop a new two-parameter family of iterative methods for solving nonline...
Abstract: Iterative algorithms for solving a system of nonlinear algebraic equa-tions (NAEs): Fi(x j...
AbstractIn this paper, we suggest and analyze two new two-step iterative methods for solving the sys...
The aim of this paper is to construct a new iterative method to solve nonlinear equations. The new m...
This study concerns the development of a straightforward numerical technique associated with Classic...
AbstractIn this paper, we develop some new iterative methods for solving nonlinear equations by usin...
AbstractIn this paper two new iterative methods are built up and analyzed. A generalization of the e...
AbstractIterative methods for the solution of nonlinear systems of equations such as Newton's method...
In this study, a new root-finding method for solving nonlinear equations is proposed. This method re...
The primary focus of research in this thesis is to address the construction of iterative methods for...
A new iterative method for the approximation of the root of a nonlinear function f in one variable i...
In this paper we present the geometrical interpretation of several iterative methods to solve a nonl...
A new iterative method to find the root of a nonlinear scalar function f is proposed. The method is ...
We present another simple way of deriving several iterative methods for solving nonlinear equations ...
The e ciency of algorithms for solving nonlinear equations is a measure of comparison between di ere...
AbstractIn this work, we develop a new two-parameter family of iterative methods for solving nonline...
Abstract: Iterative algorithms for solving a system of nonlinear algebraic equa-tions (NAEs): Fi(x j...
AbstractIn this paper, we suggest and analyze two new two-step iterative methods for solving the sys...
The aim of this paper is to construct a new iterative method to solve nonlinear equations. The new m...
This study concerns the development of a straightforward numerical technique associated with Classic...
AbstractIn this paper, we develop some new iterative methods for solving nonlinear equations by usin...
AbstractIn this paper two new iterative methods are built up and analyzed. A generalization of the e...
AbstractIterative methods for the solution of nonlinear systems of equations such as Newton's method...