The nucleolus of homogeneous games with steps
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Publication:1324689
DOI10.1016/0166-218X(94)90163-5zbMath0803.90140OpenAlexW2031263625MaRDI QIDQ1324689
Peter Sudhölter, Joachim Rosenmüller
Publication date: 3 January 1995
Published in: Discrete Applied Mathematics (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/0166-218x(94)90163-5
Related Items (5)
Directed and weighted majority games ⋮ Proper strong-Fibonacci games ⋮ Noncooperative foundations of the nucleolus in majority games ⋮ Star-shapedness of the kernel for homogeneous games ⋮ Reducing the number of linear programs needed for solving the nucleolus problem of \(n\)-person game theory
Cites Work
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- Homogeneous games with countably many players
- The least core, nucleolus, and kernel of homogeneous weighted majority games
- Homogeneous games as anti step functions
- On the kernel of constant-sum simple games with homogeneous weights
- A CLASS OF MAJORITY GAMES
- Homogeneous Games: Recursive Structure and Computation
- Geometric Properties of the Kernel, Nucleolus, and Related Solution Concepts
- On the Enumeration of Majority Games
- On Weights of Constant-Sum Majority Games
- The Nucleolus of a Characteristic Function Game
- On the Nucleolus of a Characteristic Function Game
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