This paper presents a fifth-order iterative method as a new modification of Newton's method for finding multiple roots of nonlinear equations with unknown multiplicity m. Its convergence order is analyzed and proved. Moreover, several numerical examples demonstrate that the proposed iterative method is superior to the existing methods
We present a new third order convergence iterative method for m multiple roots of nonlinear equation...
AbstractIn this paper, we present six new fourth-order methods with closed formulae for finding mult...
We present a new third order convergence iterative method for solving multiple roots of nonlinear eq...
This paper presents a fifth-order iterative method as a new modification of Newton's method for...
NSF of China 10771226;NSF 2010BB9218;Innovative Talent Training Project;Third Stage ofThis paper p...
A three-step iterative method with fifth-order convergence as a new modification of Newton’s method ...
In this work, two iterative methods, based on Newton’s method, to obtain the numerical solutions of ...
AbstractThis paper concentrates on iterative methods for obtaining the multiple roots of nonlinear e...
In this paper, we derive a new modified third order convergence iterative methods for computing mult...
In this paper, a new fifth-order family of methods free from second derivative is obtained. The new ...
In this paper, we suggest and analyze two new algorithm of fourth and fifth order convergence. We re...
AbstractIn this paper, we present some new modifications of Newton's method for solving non-linear e...
In the literature, recently, some three-step schemes involving four function evaluations for the sol...
AbstractA method of order four for finding multiple zeros of nonlinear functions is developed. The m...
Two families of third-order iterative methods for finding multiple roots of nonlinear equations are ...
We present a new third order convergence iterative method for m multiple roots of nonlinear equation...
AbstractIn this paper, we present six new fourth-order methods with closed formulae for finding mult...
We present a new third order convergence iterative method for solving multiple roots of nonlinear eq...
This paper presents a fifth-order iterative method as a new modification of Newton's method for...
NSF of China 10771226;NSF 2010BB9218;Innovative Talent Training Project;Third Stage ofThis paper p...
A three-step iterative method with fifth-order convergence as a new modification of Newton’s method ...
In this work, two iterative methods, based on Newton’s method, to obtain the numerical solutions of ...
AbstractThis paper concentrates on iterative methods for obtaining the multiple roots of nonlinear e...
In this paper, we derive a new modified third order convergence iterative methods for computing mult...
In this paper, a new fifth-order family of methods free from second derivative is obtained. The new ...
In this paper, we suggest and analyze two new algorithm of fourth and fifth order convergence. We re...
AbstractIn this paper, we present some new modifications of Newton's method for solving non-linear e...
In the literature, recently, some three-step schemes involving four function evaluations for the sol...
AbstractA method of order four for finding multiple zeros of nonlinear functions is developed. The m...
Two families of third-order iterative methods for finding multiple roots of nonlinear equations are ...
We present a new third order convergence iterative method for m multiple roots of nonlinear equation...
AbstractIn this paper, we present six new fourth-order methods with closed formulae for finding mult...
We present a new third order convergence iterative method for solving multiple roots of nonlinear eq...