We investigate voting systems with two classes of voters, for which there is a hierarchy giving each member of the stronger class more influence or important than each member of the weaker class. We deduce for voting systems one important counting fact that allows determining how many of them are for a given number of voters. In fact, the number of these systems follows a Fibonacci sequence with a smooth polynomial variation on the number of voters. On the other hand, we classify by means of some parameters which of these systems are weighted. This result allows us to state an asymptotic conjecture which is opposed to what occurs for symmetric games
This paper seeks to expand voting power theory, a branch of game theory that applies to many importa...
ABSTRACT. A natural partial ordering exists on all weighted games and, more broadly, on all linear g...
ABSTRACT. Important decisions are likely made by groups of agents. Thus group decision making is ver...
We investigate voting systems with two classes of voters, for which there is a hierarchy giving each...
We investigate binary voting systems with two types of voters and a hierarchy among the members in e...
Some distinguished types of voters, as vetoes, passers or nulls, as well as some others, play a sign...
Some distinguished types of voters, as vetoes, passers or nulls, as well as some others, play a sign...
In a weighted voting game, each voter has a given weight and a coalition of voters is successful if ...
In voting systems, game theory, switching functions, threshold logic, hypergraphs or coherent struct...
In many multiagent settings, situations arise in which agents must collectively make decisions while...
Weighted voting games are ubiquitous mathematical models which are used in economics, political scie...
We consider plurality voting games being simple games in partition function form such that in every ...
A voting situation, in which voters are asked to rank all candidates pair by pair, induces a tournam...
Weighted voting games are ubiquitous mathematical models which are used in economics, political scie...
This project will be focused around the theory of Simple Games, weighted Voting Games will be of spe...
This paper seeks to expand voting power theory, a branch of game theory that applies to many importa...
ABSTRACT. A natural partial ordering exists on all weighted games and, more broadly, on all linear g...
ABSTRACT. Important decisions are likely made by groups of agents. Thus group decision making is ver...
We investigate voting systems with two classes of voters, for which there is a hierarchy giving each...
We investigate binary voting systems with two types of voters and a hierarchy among the members in e...
Some distinguished types of voters, as vetoes, passers or nulls, as well as some others, play a sign...
Some distinguished types of voters, as vetoes, passers or nulls, as well as some others, play a sign...
In a weighted voting game, each voter has a given weight and a coalition of voters is successful if ...
In voting systems, game theory, switching functions, threshold logic, hypergraphs or coherent struct...
In many multiagent settings, situations arise in which agents must collectively make decisions while...
Weighted voting games are ubiquitous mathematical models which are used in economics, political scie...
We consider plurality voting games being simple games in partition function form such that in every ...
A voting situation, in which voters are asked to rank all candidates pair by pair, induces a tournam...
Weighted voting games are ubiquitous mathematical models which are used in economics, political scie...
This project will be focused around the theory of Simple Games, weighted Voting Games will be of spe...
This paper seeks to expand voting power theory, a branch of game theory that applies to many importa...
ABSTRACT. A natural partial ordering exists on all weighted games and, more broadly, on all linear g...
ABSTRACT. Important decisions are likely made by groups of agents. Thus group decision making is ver...