On the convergence rate of the Halpern-iteration

Felix Lieder

Journal ArticleOPEN ACCESS

On the convergence rate of the Halpern-iteration

Lieder F

Optimization Letters (2021) 15(2) 405-418

DOI: 10.1007/s11590-020-01617-9

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Abstract

In this work, we give a tight estimate of the rate of convergence for the Halpern-iteration for approximating a fixed point of a nonexpansive mapping in a Hilbert space. Specifically, using semidefinite programming and duality we prove that the norm of the residuals is upper bounded by the distance of the initial iterate to the closest fixed point divided by the number of iterations plus one.

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APA

Lieder, F. (2021). On the convergence rate of the Halpern-iteration. Optimization Letters, 15(2), 405–418. https://doi.org/10.1007/s11590-020-01617-9

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On the convergence rate of the Halpern-iteration

Abstract

Author supplied keywords

References Powered by Scopus

Iterative algorithms for nonlinear operators

Fixed points of nonexpanding maps

Approximation of fixed points of nonexpansive mappings

Cited by Powered by Scopus

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