María Albina Puente scite author profile

We introduce here a family of mixed coalitional values. They extend the binomial semivalues to games endowed with a coalition structure, satisfy the property of symmetry in the quotient game and the quotient game property, generalize the symmetric coalitional Banzhaf value introduced by Alonso and Fiestras and link and merge the Shapley value and the binomial semivalues. A computational procedure in terms of the multilinear extension of the original game is also provided and an application to political science is sketched.

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A note about games-composition dimension

Freixas

Puente

2001

Discrete Applied Mathematics

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Coalitional multinomial probabilistic values

Carreras

Puente

2015

European Journal of Operational Research

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We introduce a new family of coalitional values designed to take into account players' attitudes with regard to cooperation. This new family of values applies to cooperative games with a coalition structure by combining the Shapley value and the multinomial probabilistic values, thus generalizing the symmetric coalitional binomial semivalues. Besides an axiomatic characterization, a computational procedure is provided in terms of the multilinear extension of the game and an application to the Catalonia Parliament, Legislature 2003Legislature -2007, is shown.

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