On the symmetric and weighted Shapley values
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Publication:1179447
DOI10.1007/BF01240278zbMath0745.90086OpenAlexW1994956922MaRDI QIDQ1179447
Publication date: 26 June 1992
Published in: International Journal of Game Theory (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1007/bf01240278
Related Items (24)
Symmetry, mutual dependence, and the weighted Shapley values ⋮ Efficient firm groups: allocative efficiency in cooperative games ⋮ A note on the Shapley value for airport cost pooling game ⋮ A note on sign symmetry for a subclass of efficient, symmetric, and linear values ⋮ Group contributions in TU-games: a class of \(k\)-lateral Shapley values ⋮ The Shapley value for the probability game ⋮ The weighted-egalitarian Shapley values ⋮ Implementation and axiomatization of discounted Shapley values ⋮ Axiomatizations of the proportional Shapley value ⋮ Core stability of the Shapley value for cooperative games ⋮ Characterizing the Shapley value in fixed-route traveling salesman problems with appointments ⋮ Axiomatic characterizations of the family of Weighted priority values ⋮ The balanced contributions property for symmetric players ⋮ Relaxations of symmetry and the weighted Shapley values ⋮ Null or nullifying players: the difference between the Shapley value and equal division solutions ⋮ A new look at the role of players' weights in the weighted Shapley value ⋮ Weakly balanced contributions and the weighted Shapley values ⋮ New axiomatizations of the Owen value ⋮ On axiomatizations of the weighted Shapley values ⋮ On axiomatizations of the Shapley value for assignment games ⋮ Egalitarian allocation and players of certain type ⋮ Marginalist and efficient values for TU games ⋮ How to share when context matters: the Möbius value as a generalized solution for cooperative games ⋮ Weak addition invariance and axiomatization of the weighted Shapley value
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