Liberating the Subgradient Optimality Conditions from Constraint Qualifications

V. JEYAKUMAR; Z. Y. WU; G. M. LEE; N. DINH

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Liberating the Subgradient Optimality Conditions from Constraint Qualifications

机译：从约束资格中解放次优最优条件

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In convex optimization the significance of constraint qualifications is evidenced by the simple duality theory, and the elegant subgradient optimality conditions which completely characterize a minimizer. However, the constraint qualifications do not always hold even for finite dimensional optimization problems and frequently fail for infinite dimensional problems. In the present work we take a broader view of the subgradient optimality conditions by allowing them to depend on a sequence of ∈-subgradients at a minimizer and then by letting them to hold in the limit. Liberating the optimality conditions in this way permits us to obtain a complete characterization of optimality without a constraint qualification. As an easy consequence of these results we obtain optimality conditions for conic convex optimization problems without a constraint qualification. We derive these conditions by applying a powerful combination of conjugate analysis and ∈-subdifferential calculus. Numerical examples are discussed to illustrate the significance of the sequential conditions.

机译：在凸优化中，约束条件的重要性由简单的对偶理论和优雅的次梯度最优条件（完全代表极小化特征）证明。但是，即使对于有限维优化问题，约束条件也不总是成立，而对于无限维问题常常失败。在当前的工作中，我们通过允许次优最优条件依赖于最小化器上的ε-次优序列，然后让它们保持在极限中，从而对次优最优条件有更广泛的了解。以这种方式放宽最优性条件，使我们无需约束条件即可获得最优性的完整表征。作为这些结果的简单结果，我们获得了没有约束条件的圆锥凸优化问题的最优条件。我们通过应用共轭分析和ε-亚微积分的强大组合来得出这些条件。讨论了数值示例，以说明顺序条件的重要性。

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来源
《Journal of Global Optimization》 |2006年第1期|p.127-137|共11页
作者
V. JEYAKUMAR; Z. Y. WU; G. M. LEE; N. DINH;
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作者单位

School of Mathematics, University of New South Wales, Sydney 2052, Australia;

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正文语种 eng
中图分类应用数学;
关键词
necessary and sufficient conditions; ∈-subdifferentials; sequential optimality conditions; convex optimization; semidefinite programs;

机译：充要条件;ε-次微分;序最优性条件;凸优化;半定程序;

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Liberating the Subgradient Optimality Conditions from Constraint Qualifications

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