Constraint Qualifications and Strong Global Convergence Properties of an Augmented Lagrangian Method on Riemannian Manifolds

IF 2.6 1区 数学 Q1 MATHEMATICS, APPLIED SIAM Journal on Optimization Pub Date : 2024-05-20 DOI:10.1137/23m1582382
Roberto Andreani, Kelvin R. Couto, Orizon P. Ferreira, Gabriel Haeser
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Abstract

SIAM Journal on Optimization, Volume 34, Issue 2, Page 1799-1825, June 2024.
Abstract. In the past several years, augmented Lagrangian methods have been successfully applied to several classes of nonconvex optimization problems, inspiring new developments in both theory and practice. In this paper we bring most of these recent developments from nonlinear programming to the context of optimization on Riemannian manifolds, including equality and inequality constraints. Many research have been conducted on optimization problems on manifolds, however only recently the treatment of the constrained case has been considered. In this paper we propose to bridge this gap with respect to the most recent developments in nonlinear programming. In particular, we formulate several well-known constraint qualifications from the Euclidean context which are sufficient for guaranteeing global convergence of augmented Lagrangian methods, without requiring boundedness of the set of Lagrange multipliers. Convergence of the dual sequence can also be assured under a weak constraint qualification. The theory presented is based on so-called sequential optimality conditions, which is a powerful tool used in this context. The paper can also be read with the Euclidean context in mind, serving as a review of the most relevant constraint qualifications and global convergence theory of state-of-the-art augmented Lagrangian methods for nonlinear programming.
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黎曼曼曲面上的增量拉格朗日方法的约束条件和强全局收敛特性
SIAM 优化期刊》,第 34 卷,第 2 期,第 1799-1825 页,2024 年 6 月。 摘要在过去几年中,增强拉格朗日方法已成功应用于几类非凸优化问题,激发了理论和实践的新发展。在本文中,我们将这些最新发展从非线性编程引入到黎曼流形的优化中,包括平等和不平等约束。关于流形上的优化问题已经开展了很多研究,但直到最近才开始考虑如何处理受约束的情况。在本文中,我们将结合非线性程序设计的最新发展来弥补这一差距。特别是,我们提出了欧几里得背景下的几个众所周知的约束条件,这些条件足以保证增强拉格朗日方法的全局收敛性,而不需要拉格朗日乘数集的有界性。在弱约束条件下,也能保证对偶序列的收敛性。本文提出的理论是基于所谓的顺序最优条件,这是在此背景下使用的一个强大工具。阅读本文时也可考虑欧几里得背景,作为对最先进的非线性编程增强拉格朗日方法的最相关约束条件和全局收敛理论的回顾。
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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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