Augmented Lagrangian and exact penalty methods for quasi-variational inequalities

被引:0
|
作者
Christian Kanzow
Daniel Steck
机构
[1] University of Würzburg,Institute of Mathematics
来源
Computational Optimization and Applications | 2018年 / 69卷
关键词
Quasi-variational inequality; Augmented Lagrangian method; Global convergence; Feasibility; Exact penalty;
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学科分类号
摘要
A variant of the classical augmented Lagrangian method was recently proposed in Kanzow (Math Program 160(1–2, Ser. A):33–63, 2016), Pang and Fukushima (Comput Manag Sci 2(1):21–56, 2005) for the solution of quasi-variational inequalities (QVIs). In this paper, we describe an improved convergence analysis to the method. In particular, we introduce a secondary QVI as a new optimality concept for quasi-variational inequalities and use this tool to prove convergence theorems for certain popular classes of QVIs under very mild assumptions. Finally, we present a modification of the augmented Lagrangian method which turns out to be an exact penalty method, and also give detailed numerical results illustrating the performance of both methods.
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页码:801 / 824
页数:23
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