A Shapley value for multi-choice cooperative games revisited

被引：0

作者：

Hu, Xunfeng ^{[1
]}

Li, Dengfeng ^{[2
]}

机构：

[1] School of Business, Guangxi University, Nanning

[2] School of Management and Economics, University of Electronic Science and Technology of China, Chengdu

来源：

Xitong Gongcheng Lilun yu Shijian/System Engineering Theory and Practice | 2024年 / 44卷 / 08期

基金：

中国国家自然科学基金;

关键词：

cooperative game; multi-choice; Shapley value; supply chain resilience;

D O I：

10.12011/SETP2023-0906

中图分类号：

学科分类号：

摘要：

A multi-choice cooperative game is a cooperative game that allows players to have multi-choices of actions. While a narrow multi-choice cooperative game requires all players to have the same action set, a generalized game allows different sets for different players. In this paper, under the framework of generalized games, a Shapley value of narrow games is revisited. We extend the value to generalized games with the axiomatic method, give a detailed numerical example to illustrate its calculation process, and use it to analyze supply chain resilience. © 2024 Systems Engineering Society of China. All rights reserved.

引用

页码：2524 / 2531

页数：7

共 17 条

[1] Yang S, Zhao X M., Towards shared prosperity: Practice, performance and prospect of social security redistribution in China[J], Journal of Management World, 38, 11, pp. 43-56, (2022)
[2] Qi Y D, Xiao X., Transformation of enterprise management in the era of digital economy[J], Journal of Management World, 36, 6, pp. 135-152, (2020)
[3] Xiao T S, Sun R Q, Yuan C, Et al., Enterprise digital transformation, human capital structure adjustment and labor income distribution[J], Journal of Management World, 38, 12, pp. 220-237, (2022)
[4] Hsiao C R, Raghavan T., Shapley value for multi-choice cooperative Games I[J], Games & Economic Behavior, 5, 2, pp. 240-256, (1993)
[5] Hsiao C R, Raghavan T., Monotonicity and dummy free property for multi-choice cooperative games[J], International Journal of Game Theory, 21, 3, pp. 301-312, (1992)
[6] Shapley L S., A value for n-person games[C], The Shapley Value, pp. 31-40, (1988)
[7] Van den Nouweland A, Tijs S, Potters J, Et al., Cores and related solution concepts for multi-choice games[J], ZOR — Mathematical Methods of Operations Research, 41, 3, pp. 289-311, (1995)
[8] Derks J, Peters H., A Shapley value for games with restricted coalitions[J], International Journal of Game Theory, 21, 4, pp. 351-360, (1993)
[9] Peters H, Zank H., The egalitarian solution for multi-choice games[J], Annals of Operations Research, 137, 1, pp. 399-409, (2005)
[10] Lowing D, Techer K., Marginalism, egalitarianism and efficiency in multi-choice games[J], Social Choice and Welfare, 59, 4, pp. 815-861, (2022)

← 1 2 →