This work is devoted to presenting a new four-step iterative scheme for approximating fixed points under almost contraction mappings and Reich–Suzuki-type nonexpansive mappings (RSTN mappings, for short). Additionally, we demonstrate that for almost contraction mappings, the proposed algorithm converges faster than a variety of other current iterative schemes. Furthermore, the new iterative scheme’s ω2—stability result is established and a corroborating example is given to clarify the concept of ω2—stability. Moreover, weak as well as a number of strong convergence results are demonstrated for our new iterative approach for fixed points of RSTN mappings. Further, to demonstrate the effectiveness of our new iterative strategy, we also conduc...
AbstractThis paper, which is written within the framework of Bishop's constructive mathematics, deal...
AbstractWe consider a paper of Banaś and Sadarangani (2008) [11] which deals with monotonicity prope...
This study proposes a novel hybrid iterative scheme for approximating fixed points of contraction ma...
This paper presents a new iterative algorithm for approximating the fixed points of multivalued gene...
This paper presents a new iterative algorithm for approximating the fixed points of multivalued gene...
In this article, we develop a faster iteration method, called the A∗∗ iteration method, for approxim...
Fixed point theory is a branch of mathematics that studies solutions that remain unchanged under a g...
This paper surveys regarding solutions of linear and nonlinear integral equations through fixed poin...
AbstractWe discuss iterative methods of the form xn: = μ0Φ(xx − 1) + μ1xn − 1 + … + μkxn − k (n = k,...
We establish the existence and uniqueness of solutions for a class of nonlinear Volterra integral an...
Some fixed point theorems of Presić type for nonexpansive mappings\(f: X^k\rightarrow X\), where \(k...
The aim of this talk is to present highly stable collocation based numerical methods for Volterra In...
Our goal of this manuscript is to introduce a novel iterative scheme for approximate fixed point wit...
This paper deals with obtaining a numerical method in order to approximate the solution of the nonli...
The aim of this monograph is to give a unified introductory treatment of the most important iterativ...
AbstractThis paper, which is written within the framework of Bishop's constructive mathematics, deal...
AbstractWe consider a paper of Banaś and Sadarangani (2008) [11] which deals with monotonicity prope...
This study proposes a novel hybrid iterative scheme for approximating fixed points of contraction ma...
This paper presents a new iterative algorithm for approximating the fixed points of multivalued gene...
This paper presents a new iterative algorithm for approximating the fixed points of multivalued gene...
In this article, we develop a faster iteration method, called the A∗∗ iteration method, for approxim...
Fixed point theory is a branch of mathematics that studies solutions that remain unchanged under a g...
This paper surveys regarding solutions of linear and nonlinear integral equations through fixed poin...
AbstractWe discuss iterative methods of the form xn: = μ0Φ(xx − 1) + μ1xn − 1 + … + μkxn − k (n = k,...
We establish the existence and uniqueness of solutions for a class of nonlinear Volterra integral an...
Some fixed point theorems of Presić type for nonexpansive mappings\(f: X^k\rightarrow X\), where \(k...
The aim of this talk is to present highly stable collocation based numerical methods for Volterra In...
Our goal of this manuscript is to introduce a novel iterative scheme for approximate fixed point wit...
This paper deals with obtaining a numerical method in order to approximate the solution of the nonli...
The aim of this monograph is to give a unified introductory treatment of the most important iterativ...
AbstractThis paper, which is written within the framework of Bishop's constructive mathematics, deal...
AbstractWe consider a paper of Banaś and Sadarangani (2008) [11] which deals with monotonicity prope...
This study proposes a novel hybrid iterative scheme for approximating fixed points of contraction ma...