On implicit variables in optimization theory

Journal of Nonsmooth Analysis and Optimization Pub Date : 2020-08-19 DOI:10.46298/jnsao-2021-7215

Mat'uvs Benko, P. Mehlitz

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引用次数: 10

Abstract

Implicit variables of a mathematical program are variables which do not need to be optimized but are used to model feasibility conditions. They frequently appear in several different problem classes of optimization theory comprising bilevel programming, evaluated multiobjective optimization, or nonlinear optimization problems with slack variables. In order to deal with implicit variables, they are often interpreted as explicit ones. Here, we first point out that this is a light-headed approach which induces artificial locally optimal solutions. Afterwards, we derive various Mordukhovich-stationarity-type necessary optimality conditions which correspond to treating the implicit variables as explicit ones on the one hand, or using them only implicitly to model the constraints on the other. A detailed comparison of the obtained stationarity conditions as well as the associated underlying constraint qualifications will be provided. Overall, we proceed in a fairly general setting relying on modern tools of variational analysis. Finally, we apply our findings to different well-known problem classes of mathematical optimization in order to visualize the obtained theory. Comment: 34 pages

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论优化理论中的隐变量

数学程序的隐式变量是不需要优化但用来模拟可行性条件的变量。它们经常出现在优化理论的几个不同的问题类别中，包括双层规划，评估多目标优化或具有松弛变量的非线性优化问题。为了处理隐式变量，它们通常被解释为显式变量。在这里，我们首先指出，这是一种轻率的方法，它会产生人工的局部最优解。然后，我们推导了各种mordukhovitch -平稳性类型的必要最优性条件，这些条件一方面对应于将隐式变量视为显式变量，另一方面仅使用它们隐式建模约束。将提供对所获得的平稳性条件以及相关的潜在约束条件的详细比较。总的来说，我们在一个相当普遍的背景下进行，依靠现代变分分析工具。最后，我们将我们的发现应用于不同的数学优化问题类别，以便将所获得的理论可视化。点评:34页

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Journal of Nonsmooth Analysis and Optimization

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