The mathematics and statistics of voting power
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Publication:1429029
DOI10.1214/ss/1049993201zbMath1062.91019OpenAlexW2052960815WikidataQ56113860 ScholiaQ56113860MaRDI QIDQ1429029
Jonathan N. Katz, Francis Tuerlinckx, Andrew Gelman
Publication date: 29 March 2004
Published in: Statistical Science (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1214/ss/1049993201
Related Items (11)
“One Man, One Vote” Part 1: Electoral Justice in the U.S. Electoral College: Banzhaf and Shapley/Shubik Versus May ⋮ Fair representation and a linear Shapley rule ⋮ A law of large numbers for weighted majority ⋮ A note on the direct democracy deficit in two-tier voting ⋮ Developing the aggregate empirical side of computational social choice ⋮ Choosing the best among peers ⋮ Square Root Voting System, Optimal Threshold and $$ \uppi $$ π ⋮ Equal representation in two-tier voting systems ⋮ Measuring voting power for dependent voters through causal models ⋮ Voting power: an information theory approach ⋮ The exact bias of the Banzhaf measure of power when votes are neither equiprobable nor independent
Uses Software
Cites Work
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- Every monotone graph property has a sharp threshold
- Some surprising properties of power indices.
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