English

Simple Games versus Weighted Voting Games

Computer Science and Game Theory 2018-08-30 v1

Abstract

A simple game (N,v)(N,v) is given by a set NN of nn players and a partition of 2N2^N into a set L\mathcal{L} of losing coalitions LL with value v(L)=0v(L)=0 that is closed under taking subsets and a set W\mathcal{W} of winning coalitions WW with v(W)=1v(W)=1. Simple games with α=minp0maxWW,LLp(L)p(W)<1\alpha= \min_{p\geq 0}\max_{W\in {\cal W},L\in {\cal L}} \frac{p(L)}{p(W)}<1 are known as weighted voting games. Freixas and Kurz (IJGT, 2014) conjectured that α14n\alpha\leq \frac{1}{4}n for every simple game (N,v)(N,v). We confirm this conjecture for two complementary cases, namely when all minimal winning coalitions have size 33 and when no minimal winning coalition has size 33. As a general bound we prove that α27n\alpha\leq \frac{2}{7}n for every simple game (N,v)(N,v). For complete simple games, Freixas and Kurz conjectured that α=O(n)\alpha=O(\sqrt{n}). We prove this conjecture up to a lnn\ln n factor. We also prove that for graphic simple games, that is, simple games in which every minimal winning coalition has size 2, computing α\alpha is \NP-hard, but polynomial-time solvable if the underlying graph is bipartite. Moreover, we show that for every graphic simple game, deciding if α<a\alpha<a is polynomial-time solvable for every fixed a>0a>0.

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

R2 v1 2026-06-23T01:46:19.625Z