New algorithms for approximating zeros of inverse strongly monotone maps and J-fixed points

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New algorithms for approximating zeros of inverse strongly monotone maps and J-fixed points

Abstract Let E be a real Banach space with dual space E∗ $E^{*}$. A new class of relatively weak J-nonexpansive maps, T:E→E∗ $T:E\rightarrow E^{*}$, is introduced and studied. An algorithm to approximate a common element of J-fixed points for a countable family of relatively weak J-nonexpansive maps...

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Bibliographic Details
Main Authors:	Charles E. Chidume, Chinedu G. Ezea
Format:	article
Language:	EN
Published:	SpringerOpen 2020
Subjects:	Strictly J-pseudocontractive J-Fixed point Zeros of inverse strongly monotone map Relatively weak J-nonexpansive map 2-Uniformly convex and uniformly smooth real Banach space Applied mathematics. Quantitative methods T57-57.97 Analysis QA299.6-433
Online Access:	https://doaj.org/article/9ac7be11ce6747b6bc5e2947e13935ca
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