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Basic concepts for a theory of evaluation: The aggregative operator. (English) Zbl 0488.90003

MSC:
91B06 Decision theory
03B52 Fuzzy logic; logic of vagueness
03E72 Theory of fuzzy sets, etc.
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[1] Aczél, J., Lectures on functional equations and their applications, (1966), Academic press New York · Zbl 0139.09301
[2] J. Dombi, A general class of fuzzy operators, the DeMorgan class of fuzzy operators and fuzziness measures induced by fuzzy operators, Fuzzy Sets Systems, to appear. · Zbl 0494.04005
[3] Hamacher, H., Über logische agregationen nich binar explizierter entscheidungskriterien, (1978), Rita G. Fischer Verlage Frankfurt am Main
[4] Kuwagaki, A., Sur l’équations fonctionelle rationelle de la fonction inconnue de deux variables, Mem. college of science, university of Kyoto, 27, 2, 145-151, (1952) · Zbl 0047.36201
[5] Luce, R.D., A “fundamental” axiomatization of multiplicative power relations among three variables, Philos. sci., 32, 301-309, (1965)
[6] Silvert, W., Symmetric summation: A class of operations on fuzzy sets, IEEE trans. SMC, 9, 10, 657-659, (1979) · Zbl 0424.04003
[7] Sugeno, M., Theory of fuzzy integrals and its application, (1974), Tokyo Institute of Technology, A dissertation at
[8] R.R. Yager, On a general class of fuzzy connectives, Iona College Technical Report RRY 78-18. · Zbl 0443.04008
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