Composition independence in compound games: a characterization of the Banzhaf power index and the Banzhaf value

Composition independence in compound games: a characterization of the Banzhaf power index and the Banzhaf value

We introduce the axiom of composition independence for power indices and value maps. In the context of compound (two-tier) voting, the axiom requires the power attributed to a voter to be independent of the second-tier voting games played in all constituencies other than that of the voter. We show t...

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Veröffentlicht in:International journal of game theory 2019-09, Vol.48 (3), p.755-768
1. Verfasser: Haimanko, Ori
Format: Artikel
Sprache:eng
Schlagworte:
Axioms
Behavioral/Experimental Economics
Composition
Dummy
Economic Theory/Quantitative Economics/Mathematical Methods
Economics
Economics and Finance
Game Theory
Games
Operations Research/Decision Theory
Original Paper
Positive emotions
Power
Social and Behav. Sciences
Symmetry
Voting
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Beschreibung
Zusammenfassung:We introduce the axiom of composition independence for power indices and value maps. In the context of compound (two-tier) voting, the axiom requires the power attributed to a voter to be independent of the second-tier voting games played in all constituencies other than that of the voter. We show that the Banzhaf power index is uniquely characterized by the combination of composition independence, four semivalue axioms (transfer, positivity, symmetry, and dummy), and a mild efficiency-related requirement. A similar characterization is obtained as a corollary for the Banzhaf value on the space of all finite games (with transfer replaced by additivity).
ISSN:0020-7276
1432-1270
DOI:10.1007/s00182-019-00660-w