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On the convergence of von Neumann's alternating projection algorithm for two sets

Bauschke, Heinz H. and Borwein, Jonathan M. (1993) On the convergence of von Neumann's alternating projection algorithm for two sets. Set-Valued Analysis, 9 . pp. 185-212. ISSN 0927-6947

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Abstract

We give several unifying results, interpretations, and examples regarding the convergence of the von Neumann alternating projection algorithm for two arbitrary closed convex nonempty subsets of a Hilbert space. Our research is formulated within the framework of Fejér monotonicity, convex and set-valued analysis. We also discuss the case of finitely many sets.

Item Type: Article
Subjects: UNSPECIFIED
Faculty: UNSPECIFIED
Depositing User: Mrs Naghmana Tehseen
Date Deposited: 14 Jan 2015 15:27
Last Modified: 14 Jan 2015 15:27
URI: https://docserver.carma.newcastle.edu.au/id/eprint/1555

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