A bi-average tree solution for probabilistic communication situations with fuzzy coalition
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Publication:5227200
DOI10.14736/kyb-2019-1-0063zbMath1449.05187OpenAlexW2921625573MaRDI QIDQ5227200
Hao Sun, Xianghui Li, Dongshuang Hou
Publication date: 5 August 2019
Published in: Kybernetika (Search for Journal in Brave)
Full work available at URL: http://hdl.handle.net/10338.dmlcz/147706
fuzzy coalitionaverage tree solutionmaximal product spanning treeprobabilistic communication situation
Cooperative games (91A12) Games on graphs (graph-theoretic aspects) (05C57) Graph operations (line graphs, products, etc.) (05C76) Fractional graph theory, fuzzy graph theory (05C72)
Cites Work
- Unnamed Item
- Games on fuzzy communication structures with Choquet players
- The fuzzy core in games with fuzzy coalitions
- Stability and Shapley value for an \(n\)-persons fuzzy game
- Values of games with probabilistic graphs
- Strong arcs in fuzzy graphs.
- Games with fuzzy authorization structure: a Shapley value
- A value for generalized probabilistic communication situations
- The average tree solution for cycle-free graph games
- On the Position Value for Communication Situations
- Graphs and Cooperation in Games
- The Myerson value for cooperative games on communication structure with fuzzy coalition
- On the position value for communication situations with fuzzy coalition
- A Shapley function on a class of cooperative fuzzy games.
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