BDD-based optimization for the quadratic stable set problem

IF 0.9 4区数学 Q3 MATHEMATICS, APPLIED

Discrete Optimization Pub Date : 2022-05-01 DOI:10.1016/j.disopt.2020.100610

Jaime E. González , Andre A. Cire , Andrea Lodi , Louis-Martin Rousseau

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引用次数: 5

Abstract

The quadratic stable set problem (QSSP) is a natural extension of the well-known maximum stable set problem. The QSSP is NP-hard and can be formulated as a binary quadratic program, which makes it an interesting case study to be tackled from different optimization paradigms. In this paper, we propose a novel representation for the QSSP through binary decision diagrams (BDDs) and adapt a hybrid optimization approach which integrates BDDs and mixed-integer programming (MIP) for solving the QSSP. The exact framework highlights the modeling flexibility offered through decision diagrams to handle nonlinear problems. In addition, the hybrid approach leverages two different representations by exploring, in a complementary way, the solution space with BDD and MIP technologies. Machine learning then becomes a valuable component within the method to guide the search mechanisms. In the numerical experiments, the hybrid approach shows to be superior, by at least one order of magnitude, than two leading commercial MIP solvers with quadratic programming capabilities and a semidefinite-based branch-and-bound solver.

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基于bdd的二次稳定集问题优化

二次稳定集问题(QSSP)是极大稳定集问题的自然推广。QSSP是NP-hard的，可以被表述为二元二次规划，这使得它成为一个有趣的案例研究，可以从不同的优化范式中解决。本文通过二元决策图(bdd)提出了一种新的QSSP表示方法，并采用了一种将二元决策图和混合整数规划(MIP)相结合的混合优化方法来求解QSSP。精确的框架强调了通过决策图提供的建模灵活性，以处理非线性问题。此外，混合方法利用两种不同的表示，以一种互补的方式探索BDD和MIP技术的解决方案空间。然后，机器学习成为指导搜索机制的方法中有价值的组成部分。在数值实验中，混合方法比具有二次规划能力的两种领先的商业MIP求解器和基于半定的分支定界求解器至少优越一个数量级。

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来源期刊

Discrete Optimization 管理科学-应用数学

CiteScore

2.10

自引率

9.10%

发文量

审稿时长

>12 weeks

期刊介绍： Discrete Optimization publishes research papers on the mathematical, computational and applied aspects of all areas of integer programming and combinatorial optimization. In addition to reports on mathematical results pertinent to discrete optimization, the journal welcomes submissions on algorithmic developments, computational experiments, and novel applications (in particular, large-scale and real-time applications). The journal also publishes clearly labelled surveys, reviews, short notes, and open problems. Manuscripts submitted for possible publication to Discrete Optimization should report on original research, should not have been previously published, and should not be under consideration for publication by any other journal.