区间Shapley值的一些性质:公理分析

IF 0.6 Q4 ECONOMICS Games Pub Date : 2023-06-15 DOI:10.3390/g14030050
S. Ishihara, Junnosuke Shino
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引用次数: 0

摘要

区间博弈是合作联盟博弈的延伸,在合作联盟博弈中,假设参与者面临回报的不确定性。因此,特征函数指定了一个闭合区间,而不是实数。本研究重新审视了Shapley值的两个区间对策版本(即区间Shapley值和区间Shapley样值),并使用公理化方法对其进行了刻画。对于区间Shapley值,我们证明了现有的公理化可以推广到一个更广泛的区间对策子类,称为大小单调对策。对于区间Shapley样值,我们证明了使用Young强单调性的标准公理化在整类区间对策上成立。
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Some Properties of Interval Shapley Values: An Axiomatic Analysis
Interval games are an extension of cooperative coalitional games, in which players are assumed to face payoff uncertainty. Characteristic functions thus assign a closed interval instead of a real number. This study revisits two interval game versions of Shapley values (i.e., the interval Shapley value and the interval Shapley-like value) and characterizes them using an axiomatic approach. For the interval Shapley value, we show that the existing axiomatization can be generalized to a wider subclass of interval games called size monotonic games. For the interval Shapley-like value, we show that a standard axiomatization using Young’s strong monotonicity holds on the whole class of interval games.
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来源期刊
Games
Games Decision Sciences-Statistics, Probability and Uncertainty
CiteScore
1.60
自引率
11.10%
发文量
65
审稿时长
11 weeks
期刊介绍: Games (ISSN 2073-4336) is an international, peer-reviewed, quick-refereeing open access journal (free for readers), which provides an advanced forum for studies related to strategic interaction, game theory and its applications, and decision making. The aim is to provide an interdisciplinary forum for all behavioral sciences and related fields, including economics, psychology, political science, mathematics, computer science, and biology (including animal behavior). To guarantee a rapid refereeing and editorial process, Games follows standard publication practices in the natural sciences.
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