We consider an analogue of Steffensen's method for solving nonlinear operator equations. The proposed method is a two-step iterative process. We study the convergence of the proposed method, prove the uniqueness of the solution and find the order of convergence. The proposed method uses no derivative operators. The convergence order is greater than that in Newton's method and some generalizations of the method of chords and Aitken-Steffensen's method. The method is applied to some test systems of nonlinear equations and the problem of curves intersection which are defined implicitly as solutions of differential equations. Numerical results are compared with the results obtained by Newton's method, the modified Newton method, and modificatio...
Based on Traub-Steffensen method, we present a derivative free three-step family of sixth-order meth...
AbstractWe study an iterative method with order (1+2) for solving nonlinear operator equations in Ba...
AbstractIn this work we introduce a technique for solving nonlinear systems that improves the order ...
AbstractIn the present paper, by approximating the derivatives in the well known fourth-order Ostrow...
This paper is devoted to the construction and analysis of a Moser–Steffensen iterative scheme. The m...
The present paper is concerned with the semilocal as well as the local convergence problems of Newto...
In this paper, a new family of higher order Steffensen-type methods for solving nonlinear equations ...
A class of iterative methods without restriction on the computation of Fréchet derivatives including...
This paper is devoted to the construction and analysis of a Moser–Steffensen iterative scheme. The m...
Steffensen type methods, nonlinear equations, Newton's method, Steffensen's metho
We present an original alternative to the majorant principle of Kantorovich to study the semilocal c...
AbstractWe revisit a fast iterative method studied by us in [I.K. Argyros, On a two-point Newton-lik...
In this paper, a family of Steffensen type methods of fourth-order convergence for solving nonlinear...
Solving equations of the form H(x)=0 is one of the most faced problem in mathematics and in other sc...
This article discusses a derivative free three-step iterative method to solve a nonlinear equation u...
Based on Traub-Steffensen method, we present a derivative free three-step family of sixth-order meth...
AbstractWe study an iterative method with order (1+2) for solving nonlinear operator equations in Ba...
AbstractIn this work we introduce a technique for solving nonlinear systems that improves the order ...
AbstractIn the present paper, by approximating the derivatives in the well known fourth-order Ostrow...
This paper is devoted to the construction and analysis of a Moser–Steffensen iterative scheme. The m...
The present paper is concerned with the semilocal as well as the local convergence problems of Newto...
In this paper, a new family of higher order Steffensen-type methods for solving nonlinear equations ...
A class of iterative methods without restriction on the computation of Fréchet derivatives including...
This paper is devoted to the construction and analysis of a Moser–Steffensen iterative scheme. The m...
Steffensen type methods, nonlinear equations, Newton's method, Steffensen's metho
We present an original alternative to the majorant principle of Kantorovich to study the semilocal c...
AbstractWe revisit a fast iterative method studied by us in [I.K. Argyros, On a two-point Newton-lik...
In this paper, a family of Steffensen type methods of fourth-order convergence for solving nonlinear...
Solving equations of the form H(x)=0 is one of the most faced problem in mathematics and in other sc...
This article discusses a derivative free three-step iterative method to solve a nonlinear equation u...
Based on Traub-Steffensen method, we present a derivative free three-step family of sixth-order meth...
AbstractWe study an iterative method with order (1+2) for solving nonlinear operator equations in Ba...
AbstractIn this work we introduce a technique for solving nonlinear systems that improves the order ...