Add to ORKGIn this paper we introduce the class of simple combinatorial optimisation cost games, which are games associated to {0, 1}-matrices.A coalitional value of a combinatorial optimisation game is determined by solving an integer program associated with this matrix and the characteristic vector of the coalition.For this class of games, we will characterise core stability and totally balancedness.We continue by characterising exactness and largeness.Finally, we conclude the paper by applying our main results to minimum colouring games and minimum vertex cover games
Combinatorial optimization games form an important subclass of cooperative games. In recent years, i...
Much of the literature on cooperative games associated with combinatorial optimization problems is c...
The notion of optimality naturally arises in many areas of applied mathematics and computer science ...
This article surveys studies on universally balanced properties of cooperative games defined in a su...
In this paper, based on the article entitled Cooperative Combinatorial Games written by Imma Curiel ...
Summarization: Cooperative game theory is concerned primarily with groups of players who coordinate ...
AbstractOptimization theory resolves problems to minimize total costs when the agents are involved i...
none2Combinatorial optimization games form an important subclass of cooperative games. In recent yea...
We apply linear and non-linear programming to find the solutions for Nash equilibriums and Nash arbi...
Computing solution concepts in games is an important endeavor in the field of algorithmic game theor...
The least core value of a cooperative game is the minimum penalty we need to charge a coalition for ...
We define a class of zero-sum games with combinatorial structure, where the best response problem of...
The paper examines resource allocation games such as Colonel Blotto and Colonel Lotto games with the...
We study the computation and efficiency of pure Nash equilibria in combinatorial congestion games, w...
AbstractGames in which at least one player must solve a combinatorial optimization problem are studi...
Combinatorial optimization games form an important subclass of cooperative games. In recent years, i...
Much of the literature on cooperative games associated with combinatorial optimization problems is c...
The notion of optimality naturally arises in many areas of applied mathematics and computer science ...
This article surveys studies on universally balanced properties of cooperative games defined in a su...
In this paper, based on the article entitled Cooperative Combinatorial Games written by Imma Curiel ...
Summarization: Cooperative game theory is concerned primarily with groups of players who coordinate ...
AbstractOptimization theory resolves problems to minimize total costs when the agents are involved i...
none2Combinatorial optimization games form an important subclass of cooperative games. In recent yea...
We apply linear and non-linear programming to find the solutions for Nash equilibriums and Nash arbi...
Computing solution concepts in games is an important endeavor in the field of algorithmic game theor...
The least core value of a cooperative game is the minimum penalty we need to charge a coalition for ...
We define a class of zero-sum games with combinatorial structure, where the best response problem of...
The paper examines resource allocation games such as Colonel Blotto and Colonel Lotto games with the...
We study the computation and efficiency of pure Nash equilibria in combinatorial congestion games, w...
AbstractGames in which at least one player must solve a combinatorial optimization problem are studi...
Combinatorial optimization games form an important subclass of cooperative games. In recent years, i...
Much of the literature on cooperative games associated with combinatorial optimization problems is c...
The notion of optimality naturally arises in many areas of applied mathematics and computer science ...