AbstractIn this paper an improved bi-parametric self-accelerating family of three-point derivative free methods for solving nonlinear equa- tions with memory is presented. Self-accelerating parameters are calculated by Newton's interpolatory polynomial of degree four and five. The importance of imposing two parameters is that they accelerated the R-order convergence of the existing method from 12 to 14 without any additional evaluations. Finally, numerical examples and comparisons are included to confirm the theoretical result and high computational efficiency
In this work, we extract some new and efficient two-point methods with memory from their correspondi...
A class of three-step eighth-order root solvers is constructed in this study. Our aim is fulfilled b...
A family of four-point iterative methods for solving nonlinear equations is constructed using a suit...
AbstractIn this paper an improved bi-parametric self-accelerating family of three-point derivative f...
The following paper focuses on two-point derivative free methods The following paper The following p...
In this paper, we construct an iterative method with memory based on the Newton–Secants method to so...
In this paper, a family of Steffensen-type methods of optimal order of convergence with two paramete...
It is attempted to present two derivative-free Steffensen-type methods with memory for solving nonli...
In this paper, a general family of n-point Newton type iterative methods for solving nonlinear equat...
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...
A derivative-free family of iterations without memory consisting of three steps for solving nonlinea...
Two families of derivative-free methods without memory for approximating a simple zero of a nonlinea...
This paper presents a new method for solving nonlinear equations. The method is derivative-free and ...
A new family of eighth-order derivative-free methods for solving nonlinear equations is presented. I...
In this work, we extract some new and efficient two-point methods with memory from their correspondi...
A class of three-step eighth-order root solvers is constructed in this study. Our aim is fulfilled b...
A family of four-point iterative methods for solving nonlinear equations is constructed using a suit...
AbstractIn this paper an improved bi-parametric self-accelerating family of three-point derivative f...
The following paper focuses on two-point derivative free methods The following paper The following p...
In this paper, we construct an iterative method with memory based on the Newton–Secants method to so...
In this paper, a family of Steffensen-type methods of optimal order of convergence with two paramete...
It is attempted to present two derivative-free Steffensen-type methods with memory for solving nonli...
In this paper, a general family of n-point Newton type iterative methods for solving nonlinear equat...
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...
A derivative-free family of iterations without memory consisting of three steps for solving nonlinea...
Two families of derivative-free methods without memory for approximating a simple zero of a nonlinea...
This paper presents a new method for solving nonlinear equations. The method is derivative-free and ...
A new family of eighth-order derivative-free methods for solving nonlinear equations is presented. I...
In this work, we extract some new and efficient two-point methods with memory from their correspondi...
A class of three-step eighth-order root solvers is constructed in this study. Our aim is fulfilled b...
A family of four-point iterative methods for solving nonlinear equations is constructed using a suit...