Abstract

Weighted voting games apply to a wide variety of multi-agent settings. They enable the formalization of power indices which quantify the coalitional power of players. We take a novel approach to the study of the power of big vs. small players in these games. We model small (big) players as having single (multiple) votes. The aggregate relative power of big players is measured w.r.t. their votes proportion. For this ratio, we show small constant worst-case bounds for the Shapley-Shubik and the Deegan-Packel indices. In sharp contrast, this ratio is unbounded for the Banzhaf index. As an application, we define a false-name strategic normal form game where each big player may split its votes between false identities, and study its various properties. Together, our results provide foundations for the implications of players’ size, modeled as their ability to split, on their relative power.

Details

Title
Worst-case Bounds on Power vs. Proportion in Weighted Voting Games with an Application to False-name Manipulation
Author
Gafni, Yotam; Lavi, Ron; Tennenholtz, Moshe
Pages
99-135
Section
Articles
Publication year
2021
Publication date
2021
Publisher
AI Access Foundation
ISSN
10769757
e-ISSN
19435037
Source type
Scholarly Journal
Language of publication
English
DOI
https://doi.org/10.1613/jair.1.13136
ProQuest document ID
2577945859
Copyright
© 2021. Notwithstanding the ProQuest Terms and Conditions, you may use this content in accordance with the associated terms available at https://www.jair.org/index.php/jair/about