Abstract In this paper, we prove that a three-step iteration process is stable for contractive-like mappings. It is also proved analytically and numerically that the considered process converges faster than some remarkable iterative processes for contractive-like mappings. Furthermore, some convergence results are proved for the mappings satisfying Suzuki’s condition (C) in uniformly convex Banach spaces. A couple of nontrivial numerical examples are presented to support the main results and the visualization is showed by Matlab. Finally, by utilizing our main result the solution of a nonlinear fractional differential equation is approximated
This paper is devoted to investigating the fractional order of con-vergence of operator iteration sc...
By means of monotone iterative technique, the existence and uniqueness of the positive solution for ...
The goal of this chapter is to present a semi-local convergence analysis for some iterative methods ...
We present local and semilocal convergence results for some iterative algorithms in order to approxi...
In this article, we develop a faster iteration method, called the A∗∗ iteration method, for approxim...
The aim of this paper is to propose a new faster iterative scheme (called AA-iteration) to approxima...
We present a local as well as a semilocal convergence analysis for some iterative algorithms in orde...
We present monotone convergence results for general iterative methods in order to approximate a solu...
Fixed point theory is a branch of mathematics that studies solutions that remain unchanged under a g...
In this study, a perturbation-iteration algorithm, namely PIA, is applied to solve some types of sys...
This paper establishes approximate solution for non-linear iterative fractional differential equatio...
The Reconstruction of Variational Iteration Method (RVIM) technique has been successfully applied to...
We propose and study a class of numerical schemes to approximate time-fractional differential equati...
Collocation methods for fractional differential equations have been introduced by Blank [1] and late...
In this work, we combined two techniques, the variational iteration technique and the Laplace transf...
This paper is devoted to investigating the fractional order of con-vergence of operator iteration sc...
By means of monotone iterative technique, the existence and uniqueness of the positive solution for ...
The goal of this chapter is to present a semi-local convergence analysis for some iterative methods ...
We present local and semilocal convergence results for some iterative algorithms in order to approxi...
In this article, we develop a faster iteration method, called the A∗∗ iteration method, for approxim...
The aim of this paper is to propose a new faster iterative scheme (called AA-iteration) to approxima...
We present a local as well as a semilocal convergence analysis for some iterative algorithms in orde...
We present monotone convergence results for general iterative methods in order to approximate a solu...
Fixed point theory is a branch of mathematics that studies solutions that remain unchanged under a g...
In this study, a perturbation-iteration algorithm, namely PIA, is applied to solve some types of sys...
This paper establishes approximate solution for non-linear iterative fractional differential equatio...
The Reconstruction of Variational Iteration Method (RVIM) technique has been successfully applied to...
We propose and study a class of numerical schemes to approximate time-fractional differential equati...
Collocation methods for fractional differential equations have been introduced by Blank [1] and late...
In this work, we combined two techniques, the variational iteration technique and the Laplace transf...
This paper is devoted to investigating the fractional order of con-vergence of operator iteration sc...
By means of monotone iterative technique, the existence and uniqueness of the positive solution for ...
The goal of this chapter is to present a semi-local convergence analysis for some iterative methods ...