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2016 | OriginalPaper | Buchkapitel

4. Convergence Rate Analysis of Several Splitting Schemes

verfasst von : Damek Davis, Wotao Yin

Erschienen in: Splitting Methods in Communication, Imaging, Science, and Engineering

Verlag: Springer International Publishing

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Abstract

Operator-splitting schemes are iterative algorithms for solving many types of numerical problems. A lot is known about these methods: they converge, and in many cases we know how quickly they converge. But when they are applied to optimization problems, there is a gap in our understanding: The theoretical speed of operator-splitting schemes is nearly always measured in the ergodic sense, but ergodic operator-splitting schemes are rarely used in practice. In this chapter, we tackle the discrepancy between theory and practice and uncover fundamental limits of a class of operator-splitting schemes. Our surprising conclusion is that the relaxed Peaceman-Rachford splitting algorithm, a version of the Alternating Direction Method of Multipliers (ADMM), is nearly as fast as the proximal point algorithm in the ergodic sense and nearly as slow as the subgradient method in the nonergodic sense. A large class of operator-splitting schemes extend from the relaxed Peaceman-Rachford splitting algorithm. Our results show that this class of operator-splitting schemes is also nearly as slow as the subgradient method. The tools we create in this chapter can also be used to prove nonergodic convergence rates of more general splitting schemes, so they are interesting in their own right.

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Vorheriges Kapitel Operator Splitting

Nächstes Kapitel Self Equivalence of the Alternating Direction Method of Multipliers

Nur mit Berechtigung zugänglich

E.g., with gigabytes to terabytes of data.

By ergodic, we mean the final approximate solution returned by the algorithm is an average over the history of all approximate solutions formed throughout the algorithm.

After the initial release of this chapter, we used these tools to study several more general algorithms [25, 26, 27]

This list is not exhaustive. See the comments after Theorem 8 for more details.

\(x^{{\ast}}\in \mathcal{H}\) is a minimizer of (4.0).

A recent result reported in Chapter 5 [55] of this volume shows the direct (non-duality) equivalence between ADMM and DRS when they are both applied to Problem (4.2).

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Titel: Convergence Rate Analysis of Several Splitting Schemes
verfasst von: Damek Davis
Wotao Yin
Verlag: Springer International Publishing
Buch: Splitting Methods in Communication, Imaging, Science, and Engineering
Print ISBN: 978-3-319-41587-1

Electronic ISBN: 978-3-319-41589-5

Copyright-Jahr: 2016
DOI: https://doi.org/10.1007/978-3-319-41589-5_4

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