Descriptor: "Nakamura number" / Search Limiters: Peer Reviewed - Searchworks@Jio Institute Digital Library Search Results

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Author: Freixas, Josep and Kurz, Sascha
Subjects: *SOCIAL stability, *GAME theory, *WEIGHTED graphs, *ACYCLIC model, *LINEAR programming
Abstract: The Nakamura number is an appropriate invariant of a simple game to study the existence of social equilibria and the possibility of cycles. For symmetric (quota) games its number can be obtained by an easy formula. For some subclasses of simple games the corresponding Nakamura number has also been characterized. However, in general, not much is known about lower and upper bounds depending on invariants of simple, complete or weighted games. Here, we survey such results and highlight connections with other game theoretic concepts. [ABSTRACT FROM AUTHOR]
Published: 2019
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Author: Abdou, Joseph
Subjects: *STABILITY theory, *GAME theory, *LATTICE theory, *SEMILATTICES, *EQUILIBRIUM, *MATHEMATICAL functions, *NUMBER theory
Abstract: We study the stability and the stability index of the meet game form defined on a meet semilattice. Given any active coalition structure, we show that the stability index relative to the equilibrium, to the beta core and to the exact core is a function of the Nakamura number, the depth of the semilattice and its gap function. [ABSTRACT FROM AUTHOR]
Published: 2012
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Author: Kumabe, Masahiro and Mihara, H. Reiju
Subjects: *SOCIAL choice, *GAMES, *SATISFACTION, *PREFERENCE heterogeneity, *HYPOTHESIS, *GAME theory
Abstract: Abstract: Acyclicity of individual preferences is a minimal assumption in social choice theory. We replace that assumption by the direct assumption that preferences have maximal elements on a fixed agenda. We show that the core of a simple game is nonempty for all profiles of such preferences if and only if the number of alternatives in the agenda is less than the Nakamura number of the game. The same is true if we replace the core by the core without majority dissatisfaction, obtained by deleting from the agenda all the alternatives that are non-maximal for all players in a winning coalition. Unlike the core, the core without majority dissatisfaction depends only on the playersʼ sets of maximal elements and is included in the union of such sets. A result for an extended framework gives another sense in which the core without majority dissatisfaction behaves better than the core. [Copyright &y& Elsevier]
Published: 2011
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