Amalgamating players, symmetry, and the Banzhaf value

Casajus A (2012)
International Journal of Game Theory 41(3): 497-515.

Journal Article | Published | English

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Abstract
We suggest new characterizations of the Banzhaf value without the symmetry axiom, which reveal that the characterizations by Lehrer (Int J Game Theory 17:89-99, 1988) and Nowak (Int J Game Theory 26:137-141, 1997) as well as most of the characterizations by Casajus (Theory Decis 71:365-372, 2011b) are redundant. Further, we explore symmetry implications of Lehrer's 2-efficiency axiom.
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Casajus A. Amalgamating players, symmetry, and the Banzhaf value. International Journal of Game Theory. 2012;41(3):497-515.
Casajus, A. (2012). Amalgamating players, symmetry, and the Banzhaf value. International Journal of Game Theory, 41(3), 497-515.
Casajus, A. (2012). Amalgamating players, symmetry, and the Banzhaf value. International Journal of Game Theory 41, 497-515.
Casajus, A., 2012. Amalgamating players, symmetry, and the Banzhaf value. International Journal of Game Theory, 41(3), p 497-515.
A. Casajus, “Amalgamating players, symmetry, and the Banzhaf value”, International Journal of Game Theory, vol. 41, 2012, pp. 497-515.
Casajus, A.: Amalgamating players, symmetry, and the Banzhaf value. International Journal of Game Theory. 41, 497-515 (2012).
Casajus, André. “Amalgamating players, symmetry, and the Banzhaf value”. International Journal of Game Theory 41.3 (2012): 497-515.
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