Parameterized Algorithms for Optimal Refugee Resettlement

arXiv - CS - Computer Science and Game Theory Pub Date : 2024-08-15 DOI:arxiv-2408.08392

Jiehua Chen, Ildikó Schlotter, Sofia Simola

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Abstract

We study variants of the Optimal Refugee Resettlement problem where a set $F$ of refugee families need to be allocated to a set $L$ of possible places of resettlement in a feasible and optimal way. Feasibility issues emerge from the assumption that each family requires certain services (such as accommodation, school seats, or medical assistance), while there is an upper and, possibly, a lower quota on the number of service units provided at a given place. Besides studying the problem of finding a feasible assignment, we also investigate two natural optimization variants. In the first one, we allow families to express preferences over $P$, and we aim for a Pareto-optimal assignment. In a more general setting, families can attribute utilities to each place in $P$, and the task is to find a feasible assignment with maximum total utilities. We study the computational complexity of all three variants in a multivariate fashion using the framework of parameterized complexity. We provide fixed-parameter tractable algorithms for a handful of natural parameterizations, and complement these tractable cases with tight intractability results.

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优化难民安置的参数化算法

我们研究了最优难民安置问题的变体，即需要以可行和最优的方式将一组 $F$ 的难民家庭分配到一组 $L$ 的可能安置地点。可行性问题产生于以下假设：每个家庭都需要某些服务（如住宿、学校座位或医疗援助），而在给定地点提供的服务单位数量有上限，也可能有下限。除了研究寻找可行分配的问题，我们还研究了两个自然优化变体。在第一种变式中，我们允许家庭表达对 $P$ 的偏好，并以帕累托最优分配为目标。在更一般的情况下，家庭可以为 $P$ 中的每个位置赋予效用，任务是找到总效用最大的可行分配。我们利用参数化复杂性框架，以多元方式研究了所有三种变体的计算复杂性。我们提供了一些自然参数化的固定参数可解算法，并用严密的难解性结果对这些可解情况进行了补充。

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arXiv - CS - Computer Science and Game Theory

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