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SM ISO690:2012 DRAGAN, Irinel. Egalitarian Allocations and the Inverse Problem for the Shapley Value. In: Conference on Applied and Industrial Mathematics: CAIM 2018, 20-22 septembrie 2018, Iași, România. Chișinău, Republica Moldova: Casa Editorial-Poligrafică „Bons Offices”, 2018, Ediţia a 26-a, p. 73. ISBN 978-9975-76-247-2. |
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Conference on Applied and Industrial Mathematics Ediţia a 26-a, 2018 |
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Conferința "Conference on Applied and Industrial Mathematics" Iași, România, Romania, 20-22 septembrie 2018 | ||||||
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Pag. 73-73 | ||||||
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In a cooperative transferable utilities game, the allocation of the win of the grand coalition is an Egalitarian Allocation if this win is divided into equal parts among all players. The Inverse Set relative to the Shapley Value of a game is a set of games in which the Shapley Value is the same as the initial one. In the Inverse Set we determined a family of games for which this Shapley Value is a coalitional rational value. The Egalitarian Allocation of the game is ecient, so that in the Inverse Set relative to the Shapley Value, the allocation is the same as the initial one, but may not be coalitional rational. In this paper, we shall be nding out in the same family of the Inverse Set, a subfamily of games for which the Egalitarian Allocation is also coalitional rational. We show some relationship between the two sets of games, where our values are coalitional rational. Finally, we discuss the possibility that our procedure may be used for solving the same problem for other ecient values. Numerical examples show the procedure to get solutions for the ecient values. |
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Cuvinte-cheie Egalitarian Allocation, Coalitional Rationality, inverse problem |
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