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Pove that for any set of three of the four properties


Prove the minimality of the set of properties defining the Kalai-Smorodinsky solution.

In other words, prove (by examples) that for any set of three of the four properties characterizing the solution concept, there exists a solution concept over F0 that satisfies those three properties, but not the fourth property.

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Mathematics: Pove that for any set of three of the four properties
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