Abstract
Finding the ideal circumstances for a mapping to have a fixed point is the fundamental goal of fixed point theory. These criteria can also be used for the structure under investigation. One of this theory’s most well-known theorems, Banach’s fixed point theorem, has been expanded adopting various methods, making it possible to conduct numerous research studies. Thanks to the Jungck-Contraction Theorem, which has been proven through commutative mappings, many fixed point theorems have been obtained using classical fixed point iteration methods and newly defined methods. This study aims to investigate the convergence, stability, convergence rate, and data dependency of the new four-step fixed-point iteration method. Nontrivial examples are also included to support some of the results herein.
Reference36 articles.
1. A. Amini-Harandi, H. Emami, A Fixed Point Theorem for Contraction Type Maps in Partially Ordered Metric Spaces and Application to Ordinary Differential Equations, Nonlinear Analysis: Theory, Methods and Applications 72 (5) (2010) 2238--2242.
2. A. Wieczorek, Applications of Fixed-Point Theorems in Game Theory and Mathematical Economics, Wisdom Mathematics (28) (1988) 25--34.
3. L. C. Ceng, Q. Ansari, J. C. Yao, Some Iterative Methods for Finding Fixed Points and for Solving Constrained Convex Minimization Problems, Nonlinear Analysis: Theory, Methods and Applications (74) (2011) 5286--5302.
4. J. Borwein, B. Sims, Fixed-Point Algorithms for Inverse Problems in Science and Engineering, Vol. 49 of The Douglas–Rachford Algorithm in the Absence of Convexity, Springer, New York, 2011, Ch. 6, pp. 93-109.
5. K. C. Border, Fixed Point Theorems with Applications to Economics and Game Theory, Cambridge University Press, Cambridge, 1989.