混合整数凸优化的精确增量拉格朗日对偶性

IF 2.6 1区数学 Q1 MATHEMATICS, APPLIED

SIAM Journal on Optimization Pub Date : 2024-05-02 DOI:10.1137/22m1526204

Avinash Bhardwaj, Vishnu Narayanan, Abhishek Pathapati

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引用次数: 0

摘要

SIAM 优化期刊》第 34 卷第 2 期第 1622-1645 页，2024 年 6 月。摘要增量拉格朗日对偶用违反松弛/对偶约束的非负非线性惩罚函数来增量经典拉格朗日对偶，以减小对偶差距。我们研究了混合整数凸优化问题中使用尖锐增强函数（作为增强惩罚函数的规范）进行精确惩罚表示的情况。我们提出了一种可推广的构造证明技术，在特定条件下利用相关的值函数证明混合整数凸程序存在精确的惩罚表示。这概括了混合整数线性规划的最新成果 [M. J. Feizollahi, M. J. Feizollahi, M. J. M.J. Feizollahi, S. Ahmed, and A. Sun, Math.161 (2017), pp. 365-387] 和混合整数二次编程 [X. Gu, S. Ahmed, and S. S. Dey, SIAM J. Optim., 30 (2020), pp.

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Exact Augmented Lagrangian Duality for Mixed Integer Convex Optimization

SIAM Journal on Optimization, Volume 34, Issue 2, Page 1622-1645, June 2024.
Abstract. Augmented Lagrangian dual augments the classical Lagrangian dual with a nonnegative nonlinear penalty function of the violation of the relaxed/dualized constraints in order to reduce the duality gap. We investigate the cases in which mixed integer convex optimization problems have an exact penalty representation using sharp augmenting functions (norms as augmenting penalty functions). We present a generalizable constructive proof technique for proving existence of exact penalty representations for mixed integer convex programs under specific conditions using the associated value functions. This generalizes the recent results for mixed integer linear programming [M. J. Feizollahi, S. Ahmed, and A. Sun, Math. Program., 161 (2017), pp. 365–387] and mixed integer quadratic progamming [X. Gu, S. Ahmed, and S. S. Dey, SIAM J. Optim., 30 (2020), pp. 781–797] while also providing an alternative proof for the aforementioned along with quantification of the finite penalty parameter in these cases.

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来源期刊

SIAM Journal on Optimization 数学-应用数学

CiteScore

5.30

自引率

9.70%

发文量

101

审稿时长

6-12 weeks

期刊介绍： The SIAM Journal on Optimization contains research articles on the theory and practice of optimization. The areas addressed include linear and quadratic programming, convex programming, nonlinear programming, complementarity problems, stochastic optimization, combinatorial optimization, integer programming, and convex, nonsmooth and variational analysis. Contributions may emphasize optimization theory, algorithms, software, computational practice, applications, or the links between these subjects.