Steffensen-type methods with memory were originally designed to solve nonlinear equations without the use of additional functional evaluations per computing step. In this paper, a variant of Steffensen’s method is proposed which is derivative-free and with memory. In fact, using an acceleration technique via interpolation polynomials of appropriate degrees, the computational efficiency index of this scheme is improved. It is discussed that the new scheme is quite fast and has a high efficiency index. Finally, numerical investigations are brought forward to uphold the theoretical discussions
AbstractIn this paper an improved bi-parametric self-accelerating family of three-point derivative f...
In this paper, a new family of higher order Steffensen-type methods for solving nonlinear equations ...
A derivative-free family of iterations without memory consisting of three steps for solving nonlinea...
[EN] Some methods with memory for solving nonlinear equations are designed from known methods withou...
It is attempted to present two derivative-free Steffensen-type methods with memory for solving nonli...
Two families of derivative-free methods without memory for approximating a simple zero of a nonlinea...
License, which permits unrestricted use, distribution, and reproduction in any medium, provided the ...
It is attempted to present an efficient and free derivative class of Steffensen-like methods for sol...
Two families of derivative-free methods without memory for approximating a simple zero of a nonlinea...
In this paper, we construct an iterative method with memory based on the Newton–Secants method to so...
The aim of this paper is to construct a method with memory according to King’s family of methods wit...
AbstractA derivative free method for solving nonlinear equations of Steffensen’s type is presented. ...
The following paper focuses on two-point derivative free methods The following paper The following p...
First, it is attempted to derive an optimal derivative-free Steffensen-King's type family without me...
An extension of the Steffensen iteration method for solving a single nonlinear equation is considere...
AbstractIn this paper an improved bi-parametric self-accelerating family of three-point derivative f...
In this paper, a new family of higher order Steffensen-type methods for solving nonlinear equations ...
A derivative-free family of iterations without memory consisting of three steps for solving nonlinea...
[EN] Some methods with memory for solving nonlinear equations are designed from known methods withou...
It is attempted to present two derivative-free Steffensen-type methods with memory for solving nonli...
Two families of derivative-free methods without memory for approximating a simple zero of a nonlinea...
License, which permits unrestricted use, distribution, and reproduction in any medium, provided the ...
It is attempted to present an efficient and free derivative class of Steffensen-like methods for sol...
Two families of derivative-free methods without memory for approximating a simple zero of a nonlinea...
In this paper, we construct an iterative method with memory based on the Newton–Secants method to so...
The aim of this paper is to construct a method with memory according to King’s family of methods wit...
AbstractA derivative free method for solving nonlinear equations of Steffensen’s type is presented. ...
The following paper focuses on two-point derivative free methods The following paper The following p...
First, it is attempted to derive an optimal derivative-free Steffensen-King's type family without me...
An extension of the Steffensen iteration method for solving a single nonlinear equation is considere...
AbstractIn this paper an improved bi-parametric self-accelerating family of three-point derivative f...
In this paper, a new family of higher order Steffensen-type methods for solving nonlinear equations ...
A derivative-free family of iterations without memory consisting of three steps for solving nonlinea...