This paper provides a formal proof of the conjecture stating that optimal colorings in max k-cut games over unweighted and undirected graphs do not allow the formation of any strongly divergent coalition, i.e., a subset of nodes able to increase their own payoffs simultaneously. The result is obtained by means of a new method grounded on game theory, which consists in splitting the nodes of the graph into three subsets: the coalition itself, the coalition boundary and the nodes without relationship with the coalition. Moreover, we find additional results concerning the properties of optimal colorings
We identify two sufficient conditions for games with strategic complementarities to have a unique eq...
Representation languages for coalitional games are a key research area in algorithmic game theory. ...
A Nash Equilibrium (NE) is a strategy profile that is resilient to unilateral deviations, and is pre...
We investigate strong Nash equilibria in the max k-cut game, where we are given an undirected edge-w...
An instance of the max k −cut game is an edge weighted graph. Every vertex is controlled by an auton...
We study a strategic game where every node of a graph is owned by a player who has to choose a color...
International audienceThis paper deals with states that are immune to group deviations. Group deviat...
The Nash equilibrium (NE) is known to be a very important solution concept in game theory. However, ...
We study the existence and computational complexity of coalitional stability concepts based on socia...
Representation languages for coalitional games are a key research area in algorithmic game theory. T...
We introduce natural strategic games on graphs, which capture the idea of coordination in a local se...
We introduce a new game, the so-called bin coloring game, in which selfish players control colored i...
Distributed tasks such as constructing a maximal independent set (MIS) in a network, or properly col...
Representation languages for coalitional games are a key research area in algorithmic game theory. T...
Graphical games (GG) provide compact representations of multiplayer games involving large population...
We identify two sufficient conditions for games with strategic complementarities to have a unique eq...
Representation languages for coalitional games are a key research area in algorithmic game theory. ...
A Nash Equilibrium (NE) is a strategy profile that is resilient to unilateral deviations, and is pre...
We investigate strong Nash equilibria in the max k-cut game, where we are given an undirected edge-w...
An instance of the max k −cut game is an edge weighted graph. Every vertex is controlled by an auton...
We study a strategic game where every node of a graph is owned by a player who has to choose a color...
International audienceThis paper deals with states that are immune to group deviations. Group deviat...
The Nash equilibrium (NE) is known to be a very important solution concept in game theory. However, ...
We study the existence and computational complexity of coalitional stability concepts based on socia...
Representation languages for coalitional games are a key research area in algorithmic game theory. T...
We introduce natural strategic games on graphs, which capture the idea of coordination in a local se...
We introduce a new game, the so-called bin coloring game, in which selfish players control colored i...
Distributed tasks such as constructing a maximal independent set (MIS) in a network, or properly col...
Representation languages for coalitional games are a key research area in algorithmic game theory. T...
Graphical games (GG) provide compact representations of multiplayer games involving large population...
We identify two sufficient conditions for games with strategic complementarities to have a unique eq...
Representation languages for coalitional games are a key research area in algorithmic game theory. ...
A Nash Equilibrium (NE) is a strategy profile that is resilient to unilateral deviations, and is pre...