A General Purpose Exact Solution Method for Mixed Integer Concave Minimization Problems

Ankur Sinha, A. Das, Guneshwar Anand, S. Jayaswal
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Abstract

In this article, we discuss an exact algorithm for solving mixed integer concave minimization problems. A piecewise inner-approximation of the concave function is achieved using an auxiliary linear program that leads to a bilevel program, which provides a lower bound to the original problem. The bilevel program is reduced to a single level formulation with the help of Karush-Kuhn-Tucker (KKT) conditions. Incorporating the KKT conditions lead to complementary slackness conditions that are linearized using BigM, for which we identify a tight value for general problems. Multiple bilevel programs, when solved over iterations, guarantee convergence to the exact optimum of the original problem. Though the algorithm is general and can be applied to any optimization problem with concave function(s), in this paper, we solve two common classes of operations and supply chain problems; namely, the concave knapsack problem, and the concave production-transportation problem. The computational experiments indicate that our proposed approach outperforms the customized methods that have been used in the literature to solve the two classes of problems by an order of magnitude in most of the test cases.
混合整数凹最小化问题的一种通用精确解方法
本文讨论了求解混合整数凹极小化问题的一种精确算法。使用辅助线性规划实现凹函数的分段内逼近,该规划导致双层规划,该规划提供了原始问题的下界。在Karush-Kuhn-Tucker (KKT)条件的帮助下,将双层程序简化为单层公式。结合KKT条件导致使用BigM线性化的互补松弛条件,我们为一般问题确定了一个紧值。多个双层方案,当通过迭代求解时,保证收敛到原问题的精确最优。虽然该算法是通用的,可以应用于任何凹函数优化问题,但在本文中,我们解决了两类常见的操作和供应链问题;即凹背包问题和凹生产运输问题。计算实验表明,在大多数测试用例中,我们提出的方法比文献中用于解决这两类问题的定制方法要好一个数量级。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
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