Optimal Partitions in Additively Separable Hedonic Games
Abstract
We conduct a computational analysis of fair and optimal partitions in additively separable hedonic games. We show that, for strict preferences, a Pareto optimal partition can be found in polynomial time while verifying whether a given partition is Pareto optimal is coNP-complete, even when preferences are symmetric and strict. Moreover, computing a partition with maximum egalitarian or utilitarian social welfare or one which is both Pareto optimal and individually rational is NP-hard. We also prove that checking whether there exists a partition which is both Pareto optimal and envy-free is -complete. Even though an envy-free partition and a Nash stable partition are both guaranteed to exist for symmetric preferences, checking whether there exists a partition which is both envy-free and Nash stable is NP-complete.
Keywords
Cite
@article{arxiv.1005.4540,
title = {Optimal Partitions in Additively Separable Hedonic Games},
author = {Haris Aziz and Felix Brandt and Hans Georg Seedig},
journal= {arXiv preprint arXiv:1005.4540},
year = {2015}
}
Comments
11 pages; A preliminary version of this work was invited for presentation in the session `Cooperative Games and Combinatorial Optimization' at the 24th European Conference on Operational Research (EURO 2010) in Lisbon