Sequential optimality conditions for cardinality-constrained optimization problems with applications

被引：0

作者：

Christian Kanzow

Andreas B. Raharja

Alexandra Schwartz

机构：

[1] University of Würzburg,Institute of Mathematics

[2] Technische Universität Dresden,Fakultät Mathematik

来源：

Computational Optimization and Applications | 2021年 / 80卷

关键词：

Cardinality constraints; Sequential optimality condition; Cone-continuity type constraint qualification; Relaxation method; Augmented Lagrangian method;

D O I：

暂无

中图分类号：

学科分类号：

摘要：

Recently, a new approach to tackle cardinality-constrained optimization problems based on a continuous reformulation of the problem was proposed. Following this approach, we derive a problem-tailored sequential optimality condition, which is satisfied at every local minimizer without requiring any constraint qualification. We relate this condition to an existing M-type stationary concept by introducing a weak sequential constraint qualification based on a cone-continuity property. Finally, we present two algorithmic applications: We improve existing results for a known regularization method by proving that it generates limit points satisfying the aforementioned optimality conditions even if the subproblems are only solved inexactly. And we show that, under a suitable Kurdyka–Łojasiewicz-type assumption, any limit point of a standard (safeguarded) multiplier penalty method applied directly to the reformulated problem also satisfies the optimality condition. These results are stronger than corresponding ones known for the related class of mathematical programs with complementarity constraints.

引用

页码：185 / 211

页数：26

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