Add to ORKGIn this paper we introduce a new cost sharing rule-the minimal overlap cost sharing rule-which is associated with the minimal overlap rule for claims problems defined by O'Neill (1982). An axiomatic characterization is given by employing a unique axiom: demand separability. Variations of this axiom enable the serial cost sharing rule (Moulin and Shenker, 1992) and the rules of a family (Albizuri, 2010) that generalize the serial cost sharing rule to be characterized. Finally, a family that includes the minimal overlap cost sharing rule is defined and obtained by means of an axiomatic characterization
La regle de partage de coût derivee de la valeur de Shapley est l'unique regle de partage qui ...
This paper analyzes cooperative purchasing situations with two suppliers with limited supply capacit...
Abstract We consider the cost sharing problemwith divisible demands of hetero-geneous goods. We prop...
In this paper we introduce a new cost sharing rule-the minimal overlap cost sharing rule-which is as...
A new family of cost sharing rules for cost sharing problems is proposed. This family generalizes t...
In this paper we give a generalization of the serial cost-sharing rule defined by Moulin and Shenker...
In this study we define a cost sharing rule for cost sharing problems. This rule is related to the ...
A finite group of agents share a (one output) production function. A cost sharing rule allocates the...
We focus on the radial serial rule as a natural extension of the Moulin-Shenker cost sharing rule. W...
In this paper we introduce a new axiom, denoted claims separability, that is satisfied by several cl...
The directional serial rule is introduced as a natural serial extension, generalizing the Moulin-She...
The cost sharing rule derived from the Shapley value is the unique sharing rule which allocates fixe...
We offer an axiomatization of the serial cost-sharing method of Friedman and Moulin (1999). The key ...
We reconsider the discrete version of the axiomatic cost-sharing model. We propose a condition of (i...
We study cost sharing methods with variable demands of heterogeneous goods, additive in the cost fun...
La regle de partage de coût derivee de la valeur de Shapley est l'unique regle de partage qui ...
This paper analyzes cooperative purchasing situations with two suppliers with limited supply capacit...
Abstract We consider the cost sharing problemwith divisible demands of hetero-geneous goods. We prop...
In this paper we introduce a new cost sharing rule-the minimal overlap cost sharing rule-which is as...
A new family of cost sharing rules for cost sharing problems is proposed. This family generalizes t...
In this paper we give a generalization of the serial cost-sharing rule defined by Moulin and Shenker...
In this study we define a cost sharing rule for cost sharing problems. This rule is related to the ...
A finite group of agents share a (one output) production function. A cost sharing rule allocates the...
We focus on the radial serial rule as a natural extension of the Moulin-Shenker cost sharing rule. W...
In this paper we introduce a new axiom, denoted claims separability, that is satisfied by several cl...
The directional serial rule is introduced as a natural serial extension, generalizing the Moulin-She...
The cost sharing rule derived from the Shapley value is the unique sharing rule which allocates fixe...
We offer an axiomatization of the serial cost-sharing method of Friedman and Moulin (1999). The key ...
We reconsider the discrete version of the axiomatic cost-sharing model. We propose a condition of (i...
We study cost sharing methods with variable demands of heterogeneous goods, additive in the cost fun...
La regle de partage de coût derivee de la valeur de Shapley est l'unique regle de partage qui ...
This paper analyzes cooperative purchasing situations with two suppliers with limited supply capacit...
Abstract We consider the cost sharing problemwith divisible demands of hetero-geneous goods. We prop...