dc.contributor.author
Alonso-Meijide, José Mª
dc.contributor.author
Álvarez-Mozos, Mikel
dc.contributor.author
Fiestras-Janeiro, M. Gloria, 1962-
dc.contributor.author
Jiménez-Losada, Andrés
dc.date.issued
2018-09-10T10:53:45Z
dc.date.issued
2018-09-10T10:53:45Z
dc.identifier
https://hdl.handle.net/2445/124420
dc.description.abstract
We propose and characterize a new family of Shapley values for games with coalitional externalities. To define it we generalize the concept of marginal contribution by using a lattice structure on the set of embedded coalitions. The family of lattice structure values is characterized by extensions of Shapley's axioms: efficiency, additivity, symmetry, and the null player property. The first three axioms have widely accepted generalizations to the framework of games with externalities. However, different concepts of null players have been proposed in the literature and we contribute to this debate with a new one. The null player property that we use is weaker than the others. Finally, we present one particular value of the family, new in the literature, which delivers balanced payoffs and characterize it by two additional properties.
dc.format
application/pdf
dc.publisher
Universitat de Barcelona. Facultat d'Economia i Empresa
dc.relation
UB Economics – Working Papers, 2018, E18/379
dc.relation
[WP E-Eco18/379]
dc.rights
cc-by-nc-nd, (c) Alonso et al., 2018
dc.rights
http://creativecommons.org/licenses/by-nc-nd/3.0/
dc.rights
info:eu-repo/semantics/openAccess
dc.source
UB Economics – Working Papers [ERE]
dc.subject
Externalitats (Economia)
dc.subject
Teoria de jocs
dc.subject
Externalities (Economics)
dc.title
The family of lattice structure values for games with externalities
dc.type
info:eu-repo/semantics/workingPaper
