Abstract
Computing stable partitions in hedonic games is a challenging task because there exist games in which stable outcomes do not exist. Even more, these No-instances can often be leveraged to prove computational hardness results. We make this impression rigorous in a dynamic model of cardinal hedonic games by providing meta theorems. These imply hardness of deciding about the possible or necessary convergence of deviation dynamics based on the mere existence of No-instances. Our results hold for additively separable, fractional, and modified fractional hedonic games (ASHGs, FHGs, and MFHGs). Moreover, they encompass essentially all reasonable stability notions based on single-agent deviations. In addition, we propose dynamics as a method to find individually rational and contractually individual stable (CIS) partitions in ASHGs. In particular, we find that CIS dynamics from the singleton partition possibly converge after a linear number of deviations but may require an exponential number of deviations in the worst case.
| Original language | English |
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| Title of host publication | Proceedings of the 40th Annual AAAI Conference on Artificial Intelligence |
| Publisher | AAAI Press |
| DOIs | |
| Publication status | Accepted/In press - 7 Nov 2025 |
| Event | AAAI Conference on Artificial Intelligence - Singapore EXPO, Singapore, Singapore Duration: 20 Jan 2026 → 27 Jan 2026 Conference number: 40 https://aaai.org/conference/aaai/aaai-26/ |
Publication series
| Name | Proceedings of the AAAI Conference on Artificial Intelligence |
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| ISSN (Print) | 2159-5399 |
| ISSN (Electronic) | 2374-3468 |
Conference
| Conference | AAAI Conference on Artificial Intelligence |
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| Abbreviated title | AAAI 2026 |
| Country/Territory | Singapore |
| City | Singapore |
| Period | 20/01/26 → 27/01/26 |
| Internet address |
Keywords
- algorithmic game theory
- coalition formation
- hedonic games