Frugal Splitting Operators: Representation, Minimal Lifting, and Convergence

IF 2.6 1区 数学 Q1 MATHEMATICS, APPLIED
Martin Morin, Sebastian Banert, Pontus Giselsson
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引用次数: 0

Abstract

SIAM Journal on Optimization, Volume 34, Issue 2, Page 1595-1621, June 2024.
Abstract. We investigate frugal splitting operators for finite sum monotone inclusion problems. These operators utilize exactly one direct or resolvent evaluation of each operator of the sum, and the splitting operator’s output is dictated by linear combinations of these evaluations’ inputs and outputs. To facilitate analysis, we introduce a novel representation of frugal splitting operators via a generalized primal-dual resolvent. The representation is characterized by an index and four matrices, and we provide conditions on these that ensure equivalence between the classes of frugal splitting operators and generalized primal-dual resolvents. Our representation paves the way for new results regarding lifting numbers and the development of a unified convergence analysis for frugal splitting operator methods, contingent on the directly evaluated operators being cocoercive. The minimal lifting number is [math] where [math] is the number of monotone operators and [math] is the number of direct evaluations in the splitting. Notably, this lifting number is achievable only if the first and last operator evaluations are resolvent evaluations. These results generalize the minimal lifting results by Ryu and by Malitsky and Tam that consider frugal resolvent splittings. Building on our representation, we delineate a constructive method to design frugal splitting operators, exemplified in the design of a novel, convergent, and parallelizable frugal splitting operator with minimal lifting.
节俭的拆分算子:表示、最小提升和收敛
SIAM 优化期刊》第 34 卷第 2 期第 1595-1621 页,2024 年 6 月。摘要。我们研究了有限和单调包含问题的节俭拆分算子。这些算子只需对和的每个算子进行一次直接或解析评估,分裂算子的输出由这些评估的输入和输出的线性组合决定。为了便于分析,我们通过广义的基元-二元解析式引入了节俭拆分算子的新表示法。该表示法的特征是一个索引和四个矩阵,我们对这些矩阵提供了条件,确保节俭拆分算子类和广义基元-二元解析子类之间的等价性。我们的表示法为有关提升数的新结果和节俭拆分算子方法的统一收敛分析的发展铺平了道路,而这取决于直接评估的算子是否具有协迫性。最小提升数是 [math],其中 [math] 是单调算子的数量,[math] 是拆分中直接求值的数量。值得注意的是,只有当第一个和最后一个算子求值都是解析求值时,这个提升数才能达到。这些结果概括了 Ryu 以及 Malitsky 和 Tam 考虑节俭的 resolvent 分裂的最小提升结果。在我们的表述基础上,我们描述了一种设计节俭拆分算子的构造方法,并以设计具有最小提升的新颖、收敛和可并行的节俭拆分算子为例加以说明。
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来源期刊
SIAM Journal on Optimization
SIAM Journal on Optimization 数学-应用数学
CiteScore
5.30
自引率
9.70%
发文量
101
审稿时长
6-12 weeks
期刊介绍: The SIAM Journal on Optimization contains research articles on the theory and practice of optimization. The areas addressed include linear and quadratic programming, convex programming, nonlinear programming, complementarity problems, stochastic optimization, combinatorial optimization, integer programming, and convex, nonsmooth and variational analysis. Contributions may emphasize optimization theory, algorithms, software, computational practice, applications, or the links between these subjects.
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