A one-parameter 4-point sixteenth-order King-type family of iterative methods which satisfy the famous Kung-Traub conjecture is proposed. The convergence of the family is proved, and numerical experiments are carried out to find the best member of the family. In most experiments, the best member was found to be a sixteenth-order Ostrowski-type method
AbstractIn this paper, a new fourth-order family of methods free from second derivative is obtained....
AbstractWe provide an iterative method which is of S-order 5, but N-order 4. We also give a numerica...
In this paper, a family of new fourth-order optimal iterative methods for solving nonlinear equation...
A family of four-point iterative methods for solving nonlinear equations is constructed using a suit...
The principle aim of this manuscript is to propose a general scheme that can be applied to any optim...
A new family of two-steps fourth-order iterative methods for solving nonlinear equations is introduc...
In this study, a three-point iterative method for solving nonlinear equations is presented. The purp...
ABSTRACT. In this paper, two new three-point eighth-order iterative methods for solving nonlinear eq...
We have given a four-step, multipoint iterative method without memory for solving nonlinear equation...
Two new three-step classes of optimal iterative methods to approximate simple roots of nonlinear equ...
Kung-Traub’s conjecture states that an optimal iterative method based on d function evaluations for ...
We propose a new family of iterative methods for finding the simple roots of nonlinear equation. The...
[[abstract]]In this paper, we have presented a family of fourth order iterative method and another f...
AbstractA family of eighth-order iterative methods for the solution of nonlinear equations is presen...
AbstractIn this paper, we propose a simple modification over Chun’s method for constructing iterativ...
AbstractIn this paper, a new fourth-order family of methods free from second derivative is obtained....
AbstractWe provide an iterative method which is of S-order 5, but N-order 4. We also give a numerica...
In this paper, a family of new fourth-order optimal iterative methods for solving nonlinear equation...
A family of four-point iterative methods for solving nonlinear equations is constructed using a suit...
The principle aim of this manuscript is to propose a general scheme that can be applied to any optim...
A new family of two-steps fourth-order iterative methods for solving nonlinear equations is introduc...
In this study, a three-point iterative method for solving nonlinear equations is presented. The purp...
ABSTRACT. In this paper, two new three-point eighth-order iterative methods for solving nonlinear eq...
We have given a four-step, multipoint iterative method without memory for solving nonlinear equation...
Two new three-step classes of optimal iterative methods to approximate simple roots of nonlinear equ...
Kung-Traub’s conjecture states that an optimal iterative method based on d function evaluations for ...
We propose a new family of iterative methods for finding the simple roots of nonlinear equation. The...
[[abstract]]In this paper, we have presented a family of fourth order iterative method and another f...
AbstractA family of eighth-order iterative methods for the solution of nonlinear equations is presen...
AbstractIn this paper, we propose a simple modification over Chun’s method for constructing iterativ...
AbstractIn this paper, a new fourth-order family of methods free from second derivative is obtained....
AbstractWe provide an iterative method which is of S-order 5, but N-order 4. We also give a numerica...
In this paper, a family of new fourth-order optimal iterative methods for solving nonlinear equation...