Strong Convergence of Monotone Hybrid Algorithm for Hemi-Relatively Nonexpansive Mappings

Authors :: Meijuan Shang
Yongfu Su
Dongxing Wang
Source :: Fixed Point Theory and Applications, Vol 2008, Iss 1, p 284613 (2008), Fixed Point Theory and Applications, Vol 2008 (2008)
Publication Year :: 2008
Publisher :: Springer Science and Business Media LLC, 2008.
Abstract: The purpose of this article is to prove strong convergence theorems for fixed points of closed hemi-relatively nonexpansive mappings. In order to get these convergence theorems, the monotone hybrid iteration method is presented and is used to approximate those fixed points. Note that the hybrid iteration method presented by S. Matsushita and W. Takahashi can be used for relatively nonexpansive mapping, but it cannot be used for hemi-relatively nonexpansive mapping. The results of this paper modify and improve the results of S. Matsushita and W. Takahashi (2005), and some others.

Subjects :: Discrete mathematics
T57-57.97
QA299.6-433
Applied mathematics. Quantitative methods
Iterative method
Applied Mathematics
Banach space
Fixed point
Hybrid algorithm
Monotone polygon
Differential geometry
Convergence (routing)
Order (group theory)
Applied mathematics
Geometry and Topology
Analysis
Mathematics

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