Simple Games versus Weighted Voting Games
Abstract
A simple game is given by a set of players and a partition of into a set of losing coalitions with value that is closed under taking subsets and a set of winning coalitions with . Simple games with are known as weighted voting games. Freixas and Kurz (IJGT, 2014) conjectured that for every simple game . We confirm this conjecture for two complementary cases, namely when all minimal winning coalitions have size and when no minimal winning coalition has size . As a general bound we prove that for every simple game . For complete simple games, Freixas and Kurz conjectured that . We prove this conjecture up to a factor. We also prove that for graphic simple games, that is, simple games in which every minimal winning coalition has size 2, computing is \NP-hard, but polynomial-time solvable if the underlying graph is bipartite. Moreover, we show that for every graphic simple game, deciding if is polynomial-time solvable for every fixed .
Keywords
Cite
@article{arxiv.1805.02192,
title = {Simple Games versus Weighted Voting Games},
author = {Frits Hof and Walter Kern and Sascha Kurz and Daniël Paulusma},
journal= {arXiv preprint arXiv:1805.02192},
year = {2018}
}
Comments
13 pages, 2 figures