Ordinal Hedonic Seat Arrangement Under Restricted Preference Domains: Swap Stability and Popularity

IJCAI 2023 pp. 2906-2914

doi:10.24963/IJCAI.2023/324 /ijcai/2023/wilczynski2023ijcai-ordinal/

Abstract

We study a variant of hedonic games, called hedonic seat arrangements in the literature, where the goal is not to partition the agents into coalitions but to assign them to vertices of a given graph; their satisfaction is then based on the subset of agents in their neighborhood. We focus on ordinal hedonic seat arrangements where the preferences over neighborhoods are deduced from ordinal preferences over single agents and a given preference extension. In such games and for different types of preference restrictions and extensions, we investigate the existence of arrangements satisfying stability w.r.t. swaps of positions in the graph or the well-known optimality concept of popularity.

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Text

Wilczynski. "Ordinal Hedonic Seat Arrangement Under Restricted Preference Domains: Swap Stability and Popularity." International Joint Conference on Artificial Intelligence, 2023. doi:10.24963/IJCAI.2023/324

Markdown

[Wilczynski. "Ordinal Hedonic Seat Arrangement Under Restricted Preference Domains: Swap Stability and Popularity." International Joint Conference on Artificial Intelligence, 2023.](https://mlanthology.org/ijcai/2023/wilczynski2023ijcai-ordinal/) doi:10.24963/IJCAI.2023/324

BibTeX

@inproceedings{wilczynski2023ijcai-ordinal,
  title     = {{Ordinal Hedonic Seat Arrangement Under Restricted Preference Domains: Swap Stability and Popularity}},
  author    = {Wilczynski, Anaëlle},
  booktitle = {International Joint Conference on Artificial Intelligence},
  year      = {2023},
  pages     = {2906-2914},
  doi       = {10.24963/IJCAI.2023/324},
  url       = {https://mlanthology.org/ijcai/2023/wilczynski2023ijcai-ordinal/}
}