Shrinking Projection Methods for Maximal Monotone Operators and Quasi-nonexpansive Mappings

In this paper, we consider a new shrinking projection method for finding common elements of the set of fixed points of a quasi-φ-nonexpansive mapping and the set of zero points of a maximal monotone operator. We establish a strong convergence theorem of common elements by using new analysis techniqu...

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Bibliographic Details
Published in	2010 International Conference on Computational Aspects of Social Networks pp. 247 - 250
Main Authors	Xinghui Gao, Lerong Ma
Format	Conference Proceeding
Language	English
Published	IEEE 01.09.2010
Subjects	Artificial neural networks Convergence Convex functions Mathematical model maximal monotone operator Optical wavelength conversion quasi-f-nonexpansive mapping shrinking projection methods Social network services System-on-a-chip the property(K)
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Summary:	In this paper, we consider a new shrinking projection method for finding common elements of the set of fixed points of a quasi-φ-nonexpansive mapping and the set of zero points of a maximal monotone operator. We establish a strong convergence theorem of common elements by using new analysis techniques in the setting of reflexive, strictly convex, smooth Banach spaces with the property (K). As an application, the problem of finding a minimizer of a convex function is considered.
ISBN:	1424487854 9781424487851
DOI:	10.1109/CASoN.2010.63