The bargaining problem without convexity. Extending the egalitarian and Kalai-Smorodinsky solutions
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Publication:1186867
DOI10.1016/0165-1765(91)90199-UzbMath0758.90089OpenAlexW1548262512MaRDI QIDQ1186867
Publication date: 28 June 1992
Published in: Economics Letters (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/0165-1765(91)90199-u
Related Items (17)
Altenative characterizations of three bargaining solution for nonconvex problems ⋮ A SIMPLE AXIOMATIZATION OF THE EGALITARIAN SOLUTION ⋮ Exact solution approaches for integer linear generalized maximum multiplicative programs through the lens of multi-objective optimization ⋮ \(n\)-person non-convex bargaining: efficient proportional solutions ⋮ A logic-based axiomatic model of bargaining ⋮ Bargaining with subjective mixtures ⋮ On the axiomatic theory of bargaining: a survey of recent results ⋮ A new two-party bargaining mechanism ⋮ Duality, area-considerations, and the Kalai-Smorodinsky solution ⋮ The bargaining problem without convexity. Extending the egalitarian and Kalai-Smorodinsky solutions ⋮ Bargaining and the MISO interference channel ⋮ Efficiency-free characterizations of the Kalai-Smorodinsky bargaining solution ⋮ The impossibility of Paretian monotonic solutions: a strengthening of Roth's result ⋮ Delayed probabilistic risk attitude: a parametric approach ⋮ An equitable Nash solution to nonconvex bargaining problems ⋮ Unnamed Item ⋮ DEA and Cooperative Game Theory
Cites Work
- An extension of the Nash bargaining problem and the Nash social welfare function
- The bargaining problem without convexity. Extending the egalitarian and Kalai-Smorodinsky solutions
- Bargaining without convexity: generalizing the Kalai-Smorodinsky solution
- The Nash program: Non-convex bargaining problems
- The Bargaining Problem
- Other Solutions to Nash's Bargaining Problem
- Proportional Solutions to Bargaining Situations: Interpersonal Utility Comparisons
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