Convergence of Thakur Iteration Scheme for Mean Nonexpansive Mappings in Hyperbolic Spaces

Sahu, Omprakash; Banerjee, Amitabh

doi:10.21608/ejmaa.2024.268222.1126

	Convergence of Thakur Iteration Scheme for Mean Nonexpansive Mappings in Hyperbolic Spaces
Electronic Journal of Mathematical Analysis and Applications
Volume 12, Issue 2, 2024, Page 1-12 PDF (455.65 K)
Document Type: Regular research papers
DOI: 10.21608/ejmaa.2024.268222.1126
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Authors
Omprakash Sahu ¹; Amitabh Banerjee²
¹Mathematics, Babu Pandhri Rao Kridatt Govt. College Silouti
²Principal, Govt. J. Y. Chhattisgarh College Raipur, India
Abstract
The purpose of this paper, we modify the Thakur iteration process into hyperbolic metric spaces where the symmetry condition is satisfied and establish strong and $\Delta$- convergence theorems for mean nonexpansive mappings in uniformly convex hyperbolic spaces. We provide an example of mean nonexpansive mapping which is not nonexpansive mapping. Using this example and some numerical texts, we infer empirically that the Thakur iteration process converges faster than the Abbas, Agarwal, Noor, Ishikawa, and Mann iteration processes. The purpose of this paper, we modify the Thakur iteration process into hyperbolic metric spaces where the symmetry condition is satisfied and establish strong and $\Delta$- convergence theorems for mean nonexpansive mappings in uniformly convex hyperbolic spaces. We provide an example of mean nonexpansive mapping which is not nonexpansive mapping. Using this example and some numerical texts, we infer empirically that the Thakur iteration process converges faster than the Abbas, Agarwal, Noor, Ishikawa and Mann iteration process.
Keywords
47H09; 47H10; 47H20


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