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Minimal balanced collections and their applications to core stability and other topics of game theory

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  • Dylan Laplace Mermoud
  • Michel Grabisch
  • Peter Sudholter

Abstract

Minimal balanced collections are a generalization of partitions of a finite set of n elements and have important applications in cooperative game theory and discrete mathematics. However, their number is not known beyond n = 4. In this paper we investigate the problem of generating minimal balanced collections and implement the Peleg algorithm, permitting to generate all minimal balanced collections till n = 7. Secondly, we provide practical algorithms to check many properties of coalitions and games, based on minimal balanced collections, in a way which is faster than linear programming-based methods. In particular, we construct an algorithm to check if the core of a cooperative game is a stable set in the sense of von Neumann and Morgenstern. The algorithm implements a theorem according to which the core is a stable set if and only if a certain nested balancedness condition is valid. The second level of this condition requires generalizing the notion of balanced collection to balanced sets.

Suggested Citation

  • Dylan Laplace Mermoud & Michel Grabisch & Peter Sudholter, 2025. "Minimal balanced collections and their applications to core stability and other topics of game theory," Papers 2507.05898, arXiv.org.
    • Handle: RePEc:arx:papers:2507.05898
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    1. Derks, Jean & Peters, Hans, 1998. "Orderings, excess functions, and the nucleolus," Mathematical Social Sciences, Elsevier, vol. 36(2), pages 175-182, September.
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    2. Dylan Laplace Mermoud, 2024. "Projection onto the core: An optimal reallocation to correct market failure," Papers 2411.11810, arXiv.org.
    3. Michel Grabisch & Hervé Moulin & José Manuel Zarzuelo, 2024. "Professor Peter Sudhölter (1957–2024)," International Journal of Game Theory, Springer;Game Theory Society, vol. 53(2), pages 289-294, June.

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