Average Weights and Power in Weighted Voting Games
Abstract
We investigate a class of weighted voting games for which weights are randomly distributed over the standard probability simplex. We provide close-formed formulae for the expectation and density of the distribution of weight of the -th largest player under the uniform distribution. We analyze the average voting power of the -th largest player and its dependence on the quota, obtaining analytical and numerical results for small values of and a general theorem about the functional form of the relation between the average Penrose--Banzhaf power index and the quota for the uniform measure on the simplex. We also analyze the power of a collectivity to act (Coleman efficiency index) of random weighted voting games, obtaining analytical upper bounds therefor.
Cite
@article{arxiv.1905.04261,
title = {Average Weights and Power in Weighted Voting Games},
author = {Daria Boratyn and Werner Kirsch and Wojciech Słomczyński and Dariusz Stolicki and Karol Życzkowski},
journal= {arXiv preprint arXiv:1905.04261},
year = {2022}
}
Comments
12 pages, 7 figures