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arxiv: 1910.04229 · v3 · pith:ZRWE5CYE · submitted 2019-10-09 · math.OC

Robust Convergence Analysis of Three-Operator Splitting

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classification math.OC
keywords algorithmconvergencesplittingcontrolinequalitieslinearmatrixnumerically
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Operator splitting methods solve composite optimization problems by breaking them into smaller sub-problems that can be solved sequentially or in parallel. In this paper, we propose a unified framework for certifying both linear and sublinear convergence rates for three-operator splitting (TOS) method under a variety of assumptions about the objective function. By viewing the algorithm as a dynamical system with feedback uncertainty (the oracle model), we leverage robust control theory to analyze the worst-case performance of the algorithm using matrix inequalities. We then show how these matrix inequalities can be used to verify sublinear/linear convergence of the TOS algorithm and guide the search for selecting the parameters of the algorithm (both symbolically and numerically) for optimal worst-case performance. We illustrate our results numerically by solving an input-constrained optimal control problem.

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