Equivalence of Novel Ih-Implicit Fixed Point Algorithms for a General Class of Contractive Maps
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Date
2023
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Amer inst Mathematical Sciences-aims
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GOLD
Green Open Access
No
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Abstract
In this paper, a novel implicit IH-multistep fixed point algorithm and convergence result for a general class of contractive maps is introduced without any imposition of the "sum conditions" on the countably finite family of the iteration parameters. Furthermore, it is shown that the convergence of the proposed iteration scheme is equivalent to some other implicit IH-type iterative schemes (e.g., implicit IH-Noor, implicit IH-Ishikawa and implicit IH-Mann) for the same class of maps. Also, some numerical examples are given to illustrate that the equivalence is true. Our results complement, improve and unify several equivalent results recently announced in literature.
Description
Keywords
Strong Convergence, Implicit Multistep Ih-Iterative Scheme, Real Hilbert Space, General Contractive Operator, Normed Linear Space, Equivalence (formal languages), Artificial intelligence, Class (philosophy), Economics, Fixed-Point Problems, Mathematical analysis, Biochemistry, Gene, real hilbert space, Fixed Point Theorems in Metric Spaces, Interior-Point Methods, implicit multistep ih-iterative scheme, QA1-939, FOS: Mathematics, Complement (music), Iterative Algorithms, Economic growth, Numerical Analysis, Numerical Optimization Techniques, Complementation, Pure mathematics, Iterative Algorithms for Nonlinear Operators and Optimization, Fixed point, Discrete mathematics, Applied mathematics, Computer science, strong convergence, Algorithm, Chemistry, general contractive operator, normed linear space, Phenotype, Computational Theory and Mathematics, Contractive Mappings, Equivalence relation, Physical Sciences, Computer Science, Convergence (economics), Geometry and Topology, Mathematics, Mixed-Integer Nonlinear Programs
Fields of Science
01 natural sciences, 0101 mathematics
Citation
Agwu, Imo Kalu...et.al. (2023). "Equivalence of novel IH-implicit fixed point algorithms for a general class of contractive maps", AIMS Mathematics, Vol.8, No.1, pp.841-872.
WoS Q
Q1
Scopus Q
Q1
OpenCitations Citation Count
2
Source
AIMS Mathematics
Volume
8
Issue
1
Start Page
841
End Page
872
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Scopus : 2
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2
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2
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2
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