This study proposes a novel hybrid iterative scheme for approximating fixed points of contraction mappings called Picard-P iterative scheme, which is a combination of Picard and P iterative schemes. The efficiency of present iterative scheme is to provide faster convergence in contrast to several well-known iterative schemes. It is efficiently illustrated with the help of a numerical example followed by a graph. Some convergence and stability results for contraction mappings in the context of Banach spaces are established using the proposed scheme. Additionally, to support our claim, MATLAB programme is used to approximate fixed points for contraction mappings
AbstractWe discuss iterative methods of the form xn: = μ0Φ(xx − 1) + μ1xn − 1 + … + μkxn − k (n = k,...
The aim of this paper is to approximate fixed points of nonexpansive type mappings in Banach spaces ...
Não disponívelThe purpose of this work is to show that many existing iterative processes of the Nume...
A novel iteration scheme called Picard-CR hybrid iteration scheme is introduced to approximate fixed...
We approximate the fixed points of contraction mappings using the Picard–Krasnoselskii hybrid iterat...
The aim of this monograph is to give a unified introductory treatment of the most important iterativ...
Our goal of this manuscript is to introduce a novel iterative scheme for approximate fixed point wit...
In this paper, we prove some stability results for sequences of nonself mappings using a modified J...
Abstract Some relaxed hybrid iterative schemes for approximating a common element of the sets of zer...
In this paper, we establish weak and strong convergence theorems for mean nonexpansive maps in Banac...
Banach's fixed point theorem for contraction maps has been widely used to analyze the convergence of...
We prove that recent results of Wang (2007) concerning the iterative approximation of fixed points o...
In this research, we prove strong and weak convergence results for a class of mappings which is much...
We prove that recent results of Wang (2007) concerning the iterative approximation of fixed points o...
A hybrid iterative algorithm with Meir-Keeler contraction is presented for solving the fixed point p...
AbstractWe discuss iterative methods of the form xn: = μ0Φ(xx − 1) + μ1xn − 1 + … + μkxn − k (n = k,...
The aim of this paper is to approximate fixed points of nonexpansive type mappings in Banach spaces ...
Não disponívelThe purpose of this work is to show that many existing iterative processes of the Nume...
A novel iteration scheme called Picard-CR hybrid iteration scheme is introduced to approximate fixed...
We approximate the fixed points of contraction mappings using the Picard–Krasnoselskii hybrid iterat...
The aim of this monograph is to give a unified introductory treatment of the most important iterativ...
Our goal of this manuscript is to introduce a novel iterative scheme for approximate fixed point wit...
In this paper, we prove some stability results for sequences of nonself mappings using a modified J...
Abstract Some relaxed hybrid iterative schemes for approximating a common element of the sets of zer...
In this paper, we establish weak and strong convergence theorems for mean nonexpansive maps in Banac...
Banach's fixed point theorem for contraction maps has been widely used to analyze the convergence of...
We prove that recent results of Wang (2007) concerning the iterative approximation of fixed points o...
In this research, we prove strong and weak convergence results for a class of mappings which is much...
We prove that recent results of Wang (2007) concerning the iterative approximation of fixed points o...
A hybrid iterative algorithm with Meir-Keeler contraction is presented for solving the fixed point p...
AbstractWe discuss iterative methods of the form xn: = μ0Φ(xx − 1) + μ1xn − 1 + … + μkxn − k (n = k,...
The aim of this paper is to approximate fixed points of nonexpansive type mappings in Banach spaces ...
Não disponívelThe purpose of this work is to show that many existing iterative processes of the Nume...