Randomized Strategies for Robust Combinatorial Optimization with Approximate Separation

IF 0.9 4区 计算机科学 Q4 COMPUTER SCIENCE, SOFTWARE ENGINEERING Algorithmica Pub Date : 2023-10-10 DOI:10.1007/s00453-023-01175-3
Yasushi Kawase, Hanna Sumita
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Abstract

In this paper, we study the following robust optimization problem. Given a set family representing feasibility and candidate objective functions, we choose a feasible set, and then an adversary chooses one objective function, knowing our choice. The goal is to find a randomized strategy (i.e., a probability distribution over the feasible sets) that maximizes the expected objective value in the worst case. This problem is fundamental in wide areas such as artificial intelligence, machine learning, game theory, and optimization. To solve the problem, we provide a general framework based on the dual linear programming problem. In the framework, we utilize the ellipsoid algorithm with the approximate separation algorithm. We prove that there exists an \(\alpha \)-approximation algorithm for our robust optimization problem if there exists an \(\alpha \)-approximation algorithm for finding a (deterministic) feasible set that maximizes a nonnegative linear combination of the candidate objective functions. Using our result, we provide approximation algorithms for the max–min fair randomized allocation problem and the maximum cardinality robustness problem with a knapsack constraint.

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近似分离的鲁棒组合优化随机策略
本文研究以下鲁棒优化问题。给定一个代表可行性和候选目标函数的集合族,我们选择一个可行集合,然后对手在知道我们的选择后选择一个目标函数。我们的目标是找到一种随机策略(即可行集合的概率分布),在最坏情况下最大化预期目标值。这个问题是人工智能、机器学习、博弈论和优化等广泛领域的基本问题。为了解决这个问题,我们提供了一个基于对偶线性规划问题的通用框架。在这个框架中,我们利用了椭圆算法和近似分离算法。我们证明,如果存在一个(确定性)可行集的近似算法来找到最大化候选目标函数的非负线性组合的(确定性)可行集,那么我们的鲁棒优化问题就存在一个(α)近似算法。利用我们的结果,我们提供了最大最小公平随机分配问题和最大卡方健壮性问题的近似算法。
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来源期刊
Algorithmica
Algorithmica 工程技术-计算机:软件工程
CiteScore
2.80
自引率
9.10%
发文量
158
审稿时长
12 months
期刊介绍: Algorithmica is an international journal which publishes theoretical papers on algorithms that address problems arising in practical areas, and experimental papers of general appeal for practical importance or techniques. The development of algorithms is an integral part of computer science. The increasing complexity and scope of computer applications makes the design of efficient algorithms essential. Algorithmica covers algorithms in applied areas such as: VLSI, distributed computing, parallel processing, automated design, robotics, graphics, data base design, software tools, as well as algorithms in fundamental areas such as sorting, searching, data structures, computational geometry, and linear programming. In addition, the journal features two special sections: Application Experience, presenting findings obtained from applications of theoretical results to practical situations, and Problems, offering short papers presenting problems on selected topics of computer science.
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