Add to ORKGThe notions of power and potential, both defined for any semivalue, give rise to two endomorphisms of the vector space of all cooperative games on a given player set. Several properties of these linear mappings are stated and their action on unanimity games is emphasized. We also relate in both cases the multilinear extension of the image game to the multilinear extension of the original game
define the value for spaces of nonatomic games as a map from the space of games into bounded finitel...
This is a post-peer-review, pre-copyedit version of an article published in [insert journal title]. ...
... and it is represented by a family of subsets of the set of players. Although several models of p...
The notions of power and potential, both defined for any semivalue, give rise to two endomorphisms o...
The notions of total power and potential, both defined for any semivalue, give rise to two endomorph...
The notions of total power and potential, both defined for any semivalue, give rise to two endomorph...
The notions of power and potential, both defined for any semivalue, give rise to two endomorphisms o...
Concerning the solution theory for cooperative games with transferable utility, it is well-known tha...
The semivalues are solution concepts for cooperative games that assign to each player a weighted sum...
The multilinear extension of a cooperative game was introduced by Owen in 1972. In this contribution...
The goal of the paper is to introduce a family of values for transferable utility cooperative games ...
The theory of non cooperative games with potential function was introduced by Monderer and Shapley i...
We provide a condition guaranteeing when a value defined on the base of the unanimity games and exte...
International audienceThe representation of a cooperative transferable utility game as a linear comb...
Several relationships between simple games and a particular type of solu- tions for cooperative game...
define the value for spaces of nonatomic games as a map from the space of games into bounded finitel...
This is a post-peer-review, pre-copyedit version of an article published in [insert journal title]. ...
... and it is represented by a family of subsets of the set of players. Although several models of p...
The notions of power and potential, both defined for any semivalue, give rise to two endomorphisms o...
The notions of total power and potential, both defined for any semivalue, give rise to two endomorph...
The notions of total power and potential, both defined for any semivalue, give rise to two endomorph...
The notions of power and potential, both defined for any semivalue, give rise to two endomorphisms o...
Concerning the solution theory for cooperative games with transferable utility, it is well-known tha...
The semivalues are solution concepts for cooperative games that assign to each player a weighted sum...
The multilinear extension of a cooperative game was introduced by Owen in 1972. In this contribution...
The goal of the paper is to introduce a family of values for transferable utility cooperative games ...
The theory of non cooperative games with potential function was introduced by Monderer and Shapley i...
We provide a condition guaranteeing when a value defined on the base of the unanimity games and exte...
International audienceThe representation of a cooperative transferable utility game as a linear comb...
Several relationships between simple games and a particular type of solu- tions for cooperative game...
define the value for spaces of nonatomic games as a map from the space of games into bounded finitel...
This is a post-peer-review, pre-copyedit version of an article published in [insert journal title]. ...
... and it is represented by a family of subsets of the set of players. Although several models of p...