约束极大极小优化的稳定性

IF 1.2 Q2 MATHEMATICS, APPLIED CSIAM Transactions on Applied Mathematics Pub Date : 2021-11-10 DOI:10.4208/csiam-am.so-2021-0040
Yuhong Dai, Liwei Zhang
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引用次数: 0

摘要

极小极大优化问题是现代机器学习和传统研究领域中产生的一类重要优化问题。基于Dai和Zhang(2020)的局部极小极大点概念,我们重点研究了约束极小极大优化问题的稳定性。首先,我们将非线性规划的经典雅可比唯一性条件推广到约束极大极小问题,并证明了这组性质对于小扰动是稳定的。其次,我们提供了一组条件,称为性质a,它不需要上层约束的严格互补条件。最后,我们证明了性质A是Kurash-Kuhn-Tucker(KKT)系统在KKT点上的强正则性的一个充分条件,也是Kojima映射在KKT附近的局部Lipschitzian同胚的一个足够条件。
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Stability for Constrained Minimax Optimization
Minimax optimization problems are an important class of optimization problems arising from both modern machine learning and from traditional research areas. We focus on the stability of constrained minimax optimization problems based on the notion of local minimax point by Dai and Zhang (2020). Firstly, we extend the classical Jacobian uniqueness conditions of nonlinear programming to the constrained minimax problem and prove that this set of properties is stable with respect to small $C^2$ perturbation. Secondly, we provide a set of conditions, called Property A, which does not require the strict complementarity condition for the upper level constraints. Finally, we prove that Property A is a sufficient condition for the strong regularity of the Kurash-Kuhn-Tucker (KKT) system at the KKT point, and it is also a sufficient condition for the local Lipschitzian homeomorphism of the Kojima mapping near the KKT point.
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