近端中心凸组合乘法器的近端交替方向法

IF 1.1 4区 管理学 Q4 OPERATIONS RESEARCH & MANAGEMENT SCIENCE
Danqing Zhou, Haiwen Xu, Junfeng Yang
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引用次数: 0

摘要

乘法器的近端交替方向法(PADMM)是一种经典的原对偶分裂方法,用于求解具有线性等式约束的可分离凸优化问题,在信号和图像处理、机器学习和统计学等领域有广泛的应用。在本文中,我们提出了PADMM的一个新的变体,称为PADMC,它的近端中心由迭代的凸组合构造。PADMC能够利用问题结构,并保持经典PADMM的理想特性。我们建立了迭代收敛性以及[公式:见文]遍历和[公式:见文]非遍历次线性收敛率结果,由函数残差和可行性违背度量,其中[公式:见文]表示迭代次数。此外,我们提出了PADMC的两种快速变体,一种是在其中一个分量函数为强凸时实现更快的遍历收敛速率[公式:见文],另一种是通过约束违反来保证更快的非遍历收敛速率[公式:见文]。最后,给出了LASSO和弹性网正则化问题的初步数值结果,验证了所提方法的有效性。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
Proximal alternating direction method of multipliers with convex combination proximal centers
Proximal alternating direction method of multipliers (PADMM) is a classical primal-dual splitting method for solving separable convex optimization problems with linear equality constraints, which have numerous applications in, e.g., signal and image processing, machine learning, and statistics. In this paper, we propose a new variant of PADMM, called PADMC, whose proximal centers are constructed by convex combinations of the iterates. PADMC is able to take advantage of problem structures and preserves the desirable properties of the classical PADMM. We establish iterate convergence as well as [Formula: see text] ergodic and [Formula: see text] nonergodic sublinear convergence rate results measured by function residual and feasibility violation, where [Formula: see text] denotes the iteration number. Moreover, we propose two fast variants of PADMC, one achieves faster [Formula: see text] ergodic convergence rate when one of the component functions is strongly convex, and the other ensures faster [Formula: see text] nonergodic convergence rate measured by constraint violation. Finally, preliminary numerical results on the LASSO and the elastic-net regularization problems are presented to demonstrate the performance of the proposed methods.
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来源期刊
Asia-Pacific Journal of Operational Research
Asia-Pacific Journal of Operational Research 管理科学-运筹学与管理科学
CiteScore
2.00
自引率
14.30%
发文量
44
审稿时长
14.2 months
期刊介绍: The Asia-Pacific Journal of Operational Research (APJOR) provides a forum for practitioners, academics and researchers in Operational Research and related fields, within and beyond the Asia-Pacific region. APJOR will place submissions in one of the following categories: General, Theoretical, OR Practice, Reviewer Survey, OR Education, and Communications (including short articles and letters). Theoretical papers should carry significant methodological developments. Emphasis is on originality, quality and importance, with particular emphasis given to the practical significance of the results. Practical papers, illustrating the application of Operation Research, are of special interest.
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