Convergence rate analysis for averaged fixed point iterations in common fixed point problems

Borwein, Jonathan M.; Li, Guoyin; Tam, Matthew K.

Title: Convergence rate analysis for averaged fixed point iterations in common fixed point problems
Creator: Borwein, Jonathan M.; Li, Guoyin; Tam, Matthew K.
Relation: Funding BodyARCGrant NumberDP160101537 http://purl.org/au-research/grants/arc/DP160101537
Relation: SIAM Journal on Optimization Vol. 27, Issue 1, p. 1-33
Publisher Link: http://dx.doi.org/10.1137/15M1045223
Publisher: Society for Industrial and Applied Mathematics
Resource Type: journal article
Date: 2017
Description: In this paper, we establish sublinear and linear convergence of fixed point iterations generated by averaged operators in a Hilbert space. Our results are achieved under a bounded Hölder regularity assumption which generalizes the well-known notion of bounded linear regularity. As an application of our results, we provide a convergence rate analysis for many important iterative methods in solving broad mathematical problems such as convex feasibility problems and variational inequality problems. These include Krasnoselskii-Mann iterations, the cyclic projection algorithm, forward-backward splitting and the Douglas-Rachford feasibility algorithm along with some variants. In the important case in which the underlying sets are convex sets described by convex polynomials in a finite dimensional space, we show that the Hölder regularity properties are automatically satisfied, from which sublinear convergence follows.
Subject: averaged operator; fixed point iteration; convergence rate; Hölder regularity; semi-algebraic; Douglas-Rachford algorithm
Identifier: http://hdl.handle.net/1959.13/1387455
Identifier: uon:32608
Identifier: ISSN:1052-6234
Language: eng
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