Weakly balanced contributions and the weighted Shapley values
- We provide a concise characterization of the class of positively weighted Shapley values by three properties, two standard properties, efficiency and marginality, and a relaxation of the balanced contributions property called the weak balanced contributions property. Balanced contributions: the amount one player gains or loses when another player leaves the game equals the amount the latter player gains or loses when the former player leaves the game. Weakly balanced contributions: the direction (sign) of the change of one player’s payoff when another player leaves the game equals the direction (sign) of the change of the latter player’s payoff when the former player leaves the game. Given this characterization, the symmetric Shapley value can be “extracted”from the class of positively weighted Shapley values by either replacing the weak balanced contributions property with the standard symmetry property or by strengthening the former into the balanced contributions property.
Document Type: | Article |
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Language: | English |
Author: | André Casajus |
Chairs and Professorships: | Chair of Economics and Information Systems |
DOI: | https://doi.org/10.1016/j.jmateco.2020.102459 |
Parent Title (English): | Journal of Mathematical Economics |
ISSN: | 0304-4068 |
Volume: | 94 |
Issue: | May |
Year of Completion: | 2021 |
First Page: | 102459 |
Tag: | Marginality; TU game; Weakly balanced contributions; Weighted Shapley values |
Content Focus: | Academic Audience |
Peer Reviewed: | Yes |
Rankings: | AJG Ranking / 3 |
SJR Ranking / Q2 | |
Licence (German): | Urheberrechtlich geschützt |