Strong convergence for the alternating Halpern-Mann iteration in CATp0q spaces
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SIAM
Abstract
In this paper we consider, in the general context of CAT(0) spaces, an iterative schema which alternates
between Halpern and Krasnoselskii-Mann style iterations. We prove, under suitable conditions, the strong
convergence of this algorithm, benefi ting from ideas from the proof mining program. We give quantitative information in the form of effective rates of asymptotic regularity and of metastability (in the sense of Tao).
Motivated by these results we are also able to obtain strongly convergent versions of the forward-backward
and the Douglas-Rachford algorithms. Our results generalize recent work by Bot, Csetnek and Meier, and
Cheval and Leustean.
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Bruno Dinis, Pedro Pinto, (2023). Strong Convergence for the Alternating Halpern–Mann Iteration in CAT(0) Spaces. SIAM Journal on Optimization, 33, 785-815. ISSN 1052-6234. eISSN . http://dx.doi.org/10.1137/22M1511199