关于人均沙普利支助水平值的说明

IF 0.6 4区 经济学 Q4 ECONOMICS International Journal of Game Theory Pub Date : 2024-03-15 DOI:10.1007/s00182-024-00885-4
Manfred Besner
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引用次数: 0

摘要

人均沙普利支持水平值将沙普利值扩展到具有水平结构的合作博弈中。这个值可以防止不同规模的对称玩家群体受到同等对待。我们利用效率、可加性、空玩家属性和两个新属性给出了一个公理化特征。第一个属性被称为联合生产率,是组成部分内部的公平属性,与沙普利等级值有区别。如果两个部分的所有博弈者只是共同生产,那么他们应该得到相同的报酬。我们的第二条公理称为中性串通,是针对组件外部参与者的公平公理。无论一个组成部分的参与者如何组织他们的力量,只要包括该组成部分所有参与者的联盟的力量保持不变,该组成部分之外的参与者的报酬就不会改变。
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A note on the per capita Shapley support levels value

The per capita Shapley support levels value extends the Shapley value to cooperative games with a level structure. This value prevents symmetrical groups of players of different sizes from being treated equally. We use efficiency, additivity, the null player property, and two new properties to give an axiomatic characterization. The first property, called joint productivity, is a fairness property within components and makes the difference to the Shapley levels value. If all players of two components are only jointly productive, they should receive the same payoff. Our second axiom, called neutral collusions, is a fairness axiom for players outside a component. Regardless of how players of a component organize their power, as long as the power of the coalitions that include all players of the component remains the same, the payoff to players outside the component does not change.

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来源期刊
International Journal of Game Theory
International Journal of Game Theory 数学-数学跨学科应用
CiteScore
1.30
自引率
0.00%
发文量
9
审稿时长
1 months
期刊介绍: International Journal of Game Theory is devoted to game theory and its applications. It publishes original research making significant contributions from a methodological, conceptual or mathematical point of view. Survey articles may also be considered if especially useful for the field.
期刊最新文献
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