A new family of eighth-order derivative-free methods for solving nonlinear equations is presented. It is proved that these methods have the convergence order of eight. These new methods are derivative-free and only use four evaluations of the function per iteration. In fact, we have obtained the optimal order of convergence which supports the Kung and Traub conjecture. Kung and Traub conjectured that the multipoint iteration methods, without memory based on n evaluations could achieve optimal convergence order of . Thus, we present new derivative-free methods which agree with Kung and Traub conjecture for . Numerical comparisons are made to demonstrate the performance of the methods presented
The aims of this paper are, firstly, to define a new family of the Thukral and Petkovic type methods...
AbstractIn this paper, based on Ostrowski’s method, a new family of eighth-order methods for solving...
In this paper, a new family of optimal eighth-order iterative methods are presented. The new family ...
ABSTRACT. In this note, we present an eighth-order derivative-free family of itera-tive methods for ...
AbstractA family of eighth-order iterative methods for the solution of nonlinear equations is presen...
A class of three-step eighth-order root solvers is constructed in this study. Our aim is fulfilled b...
In this paper we have constructed an optimal eighth-order method with four function evaluations to s...
ABSTRACT. In this paper, two new three-point eighth-order iterative methods for solving nonlinear eq...
In this paper, we present a new three-step derivative-free family based on Potra-Pták’s method for s...
Abstract. In this paper, modification of Steffensen’s method with eight-order convergence is present...
Copyright 2015 c ⃝ Neha Choubey and J. P. Jaiswal. This is an open access article distributed under ...
the Creative Commons Attribution License, which permits unrestricted use, distribution, and reproduc...
The purpose of this paper is to derive and discuss a three-step iterative expression for solving non...
We propose a family of eighth-order iterative methods without memory for solving nonlinear equations...
A family of derivative-free methods of seventh-order convergence for solving nonlinear equations is ...
The aims of this paper are, firstly, to define a new family of the Thukral and Petkovic type methods...
AbstractIn this paper, based on Ostrowski’s method, a new family of eighth-order methods for solving...
In this paper, a new family of optimal eighth-order iterative methods are presented. The new family ...
ABSTRACT. In this note, we present an eighth-order derivative-free family of itera-tive methods for ...
AbstractA family of eighth-order iterative methods for the solution of nonlinear equations is presen...
A class of three-step eighth-order root solvers is constructed in this study. Our aim is fulfilled b...
In this paper we have constructed an optimal eighth-order method with four function evaluations to s...
ABSTRACT. In this paper, two new three-point eighth-order iterative methods for solving nonlinear eq...
In this paper, we present a new three-step derivative-free family based on Potra-Pták’s method for s...
Abstract. In this paper, modification of Steffensen’s method with eight-order convergence is present...
Copyright 2015 c ⃝ Neha Choubey and J. P. Jaiswal. This is an open access article distributed under ...
the Creative Commons Attribution License, which permits unrestricted use, distribution, and reproduc...
The purpose of this paper is to derive and discuss a three-step iterative expression for solving non...
We propose a family of eighth-order iterative methods without memory for solving nonlinear equations...
A family of derivative-free methods of seventh-order convergence for solving nonlinear equations is ...
The aims of this paper are, firstly, to define a new family of the Thukral and Petkovic type methods...
AbstractIn this paper, based on Ostrowski’s method, a new family of eighth-order methods for solving...
In this paper, a new family of optimal eighth-order iterative methods are presented. The new family ...