Аннотация:
The paper investigates two-stage stochastic minimum spanning tree games with perishable goods. The cooperative behaviour of the players is defined. At each stage, all players jointly take action to construct a network with a cost matrix. At the second stage, a particular player may leave the game, and the probability of this leaving depends on the cooperative behaviour of all players at the first stage. At each stage game, the total cost of the spanning tree is calculated to include the sum of the costs of the contained edges and the cost of the loss of perishable goods expended on that edge of the spanning tree. The characteristic functions in the game are considered, and the dynamic Shapley values are modified. The time consistency of the dynamic Shapley values is studied.
This work was supported by the China Scholarship Council (No. 201508090030).
Тип публикации:
Статья
Язык публикации: английский
Образец цитирования:
Yin Li, Ovanes Petrosian, Jinying Zou, “Dynamic shapley value in the game with perishable goods”, Contributions to Game Theory and Management, 14 (2021), 273–289
\RBibitem{LiPetZou21}
\by Yin~Li, Ovanes~Petrosian, Jinying~Zou
\paper Dynamic shapley value in the game with perishable goods
\jour Contributions to Game Theory and Management
\yr 2021
\vol 14
\pages 273--289
\mathnet{http://mi.mathnet.ru/cgtm402}
\crossref{https://doi.org/10.21638/11701/spbu31.2021.20}