Generating functions for coalitional power indices: an application to the IMF
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Publication:816502
DOI10.1007/s10479-005-2242-yzbMath1138.91315OpenAlexW1974327200MaRDI QIDQ816502
C. Bowles, José M. Alonso-Meijide
Publication date: 9 March 2006
Published in: Annals of Operations Research (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1007/s10479-005-2242-y
Related Items (26)
Measuring the relevance of factors in the occurrences of events ⋮ Implementing generating functions to obtain power indices with coalition configuration ⋮ Assessing systematic sampling in estimating the Banzhaf-Owen value ⋮ Statistics and game theory: estimating coalitional values in R software ⋮ On weights and quotas for weighted majority voting games ⋮ Dynamic programming for computing power indices for weighted voting games with precoalitions ⋮ On stratified sampling for estimating coalitional values ⋮ On new characterizations of the Owen value ⋮ Power distribution in the Basque parliament using games with externalities ⋮ Spectrum value for coalitional games ⋮ A generating functions approach for computing the public good index efficiently ⋮ Enumeration of weighted games with minimum and an analysis of voting power for bipartite complete games with minimum ⋮ Sampling methods to estimate the Banzhaf-Owen value ⋮ Reflections on Power, Voting, and Voting Power ⋮ A Review of Some Recent Results on Power Indices ⋮ Power in voting rules with abstention: an axiomatization of a two components power index ⋮ Power indices of simple games and vector-weighted majority games by means of binary decision diagrams ⋮ The multilinear extension and the symmetric coalition Banzhaf value ⋮ An approach via generating functions to compute power indices of multiple weighted voting games with incompatible players ⋮ Banzhaf index for multiple voting systems. An application to the European Union ⋮ Generating Functions of Weighted Voting Games, MacMahon’s Partition Analysis, and Clifford Algebras ⋮ Monotonicity of power in games with a priori unions ⋮ Weighted multiple majority games with unions: generating functions and applications to the European Union ⋮ Tensor approximation of cooperative games and their semivalues ⋮ SOME OPEN PROBLEMS IN SIMPLE GAMES ⋮ Computation of several power indices by generating functions
Cites Work
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- A value for cooperative games with levels structure of cooperation
- Computing power indices in weighted multiple majority games.
- Generating functions for computing the Myerson value
- Modification of the Banzhaf value for games with a coalition structure
- Voting power in the governance of the international monetary fund
- Postulates and paradoxes of relative voting power -- A critical re-appraisal
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