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Equivalence and convergence analysis of fixed point iterative schemes using higher order averaged mappings
- Authors
- Zhou, Mi; Anjum, Rizwan; Guo, Liang; Din, Muhammad; Cho, Yeol Je
- Issue Date
- May-2025
- Publisher
- Baltzer Science Publishers B.V.
- Keywords
- k-fold averaged mapping; Weak enriched F/F '-contraction; Iterative scheme; Fixed point
- Citation
- Numerical Algorithms
- Indexed
- SCIE
SCOPUS
- Journal Title
- Numerical Algorithms
- ISSN
- 1017-1398
1572-9265
- Abstract
- This study establishes the convergence equivalence of Picard, Mann, Ishikawa, and Picard-Mann hybrid schemes when addressing weak enriched F-contraction and weak enriched F '-contraction, as defined by Zhou et al. (2024) [Journal of Inequalities and Applications (2024) 2024:23]. Our findings consolidate and expand upon existing contraction mapping methodologies within normed spaces. Numerical experiments validate our theoretical results. Moreover, we present stability analyses and dependence results for the iterative schemes. Finally, we apply general convergence principles for Krasnoselskii-type algorithms to variational inequality and split feasibility problems.
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