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A general class of fuzzy operators, the DeMorgan class of fuzzy operators and fuzziness measures induced by fuzzy operators. (English) Zbl 0494.04005

MSC:
03E72 Theory of fuzzy sets, etc.
39B99 Functional equations and inequalities
94D05 Fuzzy sets and logic (in connection with information, communication, or circuits theory)
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[1] Aczel, J., Lectures on functional equations and their applications, (1966), Academic Press New York · Zbl 0139.09301
[2] Albert, P., The algebra of fuzzy logic, Fuzzy sets and systems, 1, 203-230, (1978) · Zbl 0407.03031
[3] Bellman, R.; Giertz, M., On the analytic formalism of the theory of fuzzy sets, Inform. sci., 5, 149-156, (1973) · Zbl 0251.02059
[4] DeLuca, A.; Termini, S., A definition of a non-probabilistic entropy in the setting of fuzzy sets theory, Inform. and control, 301-312, (1972) · Zbl 0239.94028
[5] Fung, L.W.; Fu, K.S., An axiomatic approach to rational decision making in a fuzzy environment, () · Zbl 0366.90003
[6] Hamacher, H., Über logische agregationen nicht binär explizierter entscheidungskriterien, (1978), Rita G. Fischer Verlag
[7] Thole, U.; Zimmermann, H.-J.; Zysno, P., On the suitability of minimum and product operators for the intersection of fuzzy sets, Fuzzy sets and systems, 2, 167-180, (1979) · Zbl 0408.94030
[8] Yager, R.R., On a general class of fuzzy connectives, Iona college tech. report RRY 78-18, (1978) · Zbl 0443.04008
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