Faculty of Sciences | Researches | Convergence theorems for mappings which are asymptotically nonexpansive in the intermediate sense

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Document Details

Document Type	:	Article In Journal
Document Title	:	Convergence theorems for mappings which are asymptotically nonexpansive in the intermediate sense Convergence theorems for mappings which are asymptotically nonexpansive in the intermediate sense
Subject	:	Mthematics
Document Language	:	English
Abstract	:	Suppose K is a nonempty closed convex nonexpansive retract of a real uniformly convex Banach space E with P as a nonexpansive retraction. Let T : K → E be a non-self mapping which is asymptotically nonexpansive in the intermediate sense with F(T) := {x ∈ K : Tx = x} ≠ Ø. A demiclosed principle for T is proved. Moreover, if T is completely continuous, an iterative sequence {xn} is constructed which converges strongly to some x* ∈ F(T). If T is not assumed to be completely continuous but the dual E* of E is assumed to have the Kadec-Klee property, then {xn} converges weakly to some x* ∈ F(T). The operator P which plays a central role in our proofs is, in this case, the Banach space analogue of the proximity map in Hilbert spaces.
ISSN	:	01630563
Journal Name	:	Numerical Functional Analysis and Optimization
Volume	:	25
Issue Number	:	3
Publishing Year	:	2004 AH 2004 AD
Number Of Pages	:	18
Article Type	:	Article
Added Date	:	Wednesday, October 21, 2009

Researchers

Researcher Name (Arabic)	Researcher Name (English)	Researcher Type	Dr Grade	Email
Chidume, C.E.	Chidume, C.E.	Researcher	Doctorate
نصير شهزاد محمد ايوب	Naseer Shahzad	Researcher	Doctorate	nshahzad@kaau.edu.sa
Zegeye, H.	Zegeye, H.	Researcher	Doctorate

Files

File Name	Type	Description
23268.pdf	pdf	Abstract

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