TY - GEN
T1 - Hedonic clustering games
AU - Feldman, Moran
AU - Lewin-Eytan, Liane
AU - Naor, Joseph
PY - 2012
Y1 - 2012
N2 - Clustering, the partitioning of objects with respect to a similarity measure, has been extensively studied as a global optimization problem. We investigate clustering from a game theoretic approach, and consider the class of hedonic clustering games. Here, a self organized clustering is obtained via decisions made by independent players, corresponding to the elements clustered. Being a hedonic setting, the utility of each player is determined by the identity of the other members of her cluster. This class of games seems to be quite robust, as it fits with rather different, yet commonly used, clustering criteria. Specifically, we investigate hedonic clustering games in two different models: fixed clustering, which subdivides into k-median and k-center, and correlation clustering. We provide a thorough and non-trivial analysis of these games, characterizing Nash equilibria, and proving upper and lower bounds on the price of anarchy and price of stability. For fixed clustering we focus on the existence of a Nash equilibrium, as it is a rather non-trivial issue in this setting. We study it both for general metrics and special cases, such as line and tree metrics. In the correlation clustering model, we study both minimization and maximization variants, and provide almost tight bounds on both price of anarchy and price of stability.
AB - Clustering, the partitioning of objects with respect to a similarity measure, has been extensively studied as a global optimization problem. We investigate clustering from a game theoretic approach, and consider the class of hedonic clustering games. Here, a self organized clustering is obtained via decisions made by independent players, corresponding to the elements clustered. Being a hedonic setting, the utility of each player is determined by the identity of the other members of her cluster. This class of games seems to be quite robust, as it fits with rather different, yet commonly used, clustering criteria. Specifically, we investigate hedonic clustering games in two different models: fixed clustering, which subdivides into k-median and k-center, and correlation clustering. We provide a thorough and non-trivial analysis of these games, characterizing Nash equilibria, and proving upper and lower bounds on the price of anarchy and price of stability. For fixed clustering we focus on the existence of a Nash equilibrium, as it is a rather non-trivial issue in this setting. We study it both for general metrics and special cases, such as line and tree metrics. In the correlation clustering model, we study both minimization and maximization variants, and provide almost tight bounds on both price of anarchy and price of stability.
KW - Clustering games
KW - Hedonic games
KW - Price of anarchy
KW - Price of stability
UR - http://www.scopus.com/inward/record.url?scp=84864133466&partnerID=8YFLogxK
U2 - 10.1145/2312005.2312053
DO - 10.1145/2312005.2312053
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AN - SCOPUS:84864133466
SN - 9781450312134
T3 - Annual ACM Symposium on Parallelism in Algorithms and Architectures
SP - 267
EP - 276
BT - SPAA'12 - Proceedings of the 24th ACM Symposium on Parallelism in Algorithms and Architectures
T2 - 24th ACM Symposium on Parallelism in Algorithms and Architectures, SPAA'12
Y2 - 25 June 2012 through 27 June 2012
ER -