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Fuzzy random variables - I. Definitions and theorems. (English) Zbl 0438.60004

MSC:
60A05 Axioms; other general questions in probability
94D05 Fuzzy sets and logic (in connection with information, communication, or circuits theory)
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References:
[1] Gaines, B.R., Stochastic and fuzzy logics, Electron. letters, 11, 9, 188-189, (1975)
[2] Bellman, R.; Giertz, M., On the analytic formalism of the theory of fuzzy sets, Information sci., 5, 149-156, (1973) · Zbl 0251.02059
[3] Zadeh, L.A., Probability measures of fuzzy events, J. math. anal. appl., 23, 2, 421-427, (1968) · Zbl 0174.49002
[4] Negoita, C.V.; Ralescu, D.A., Applications of fuzzy sets to systems analysis, (1975), Birkhäuser Basel · Zbl 0326.94002
[5] Zadeh, L.A., The concept of a linguistic variable and its application to approximate reasoning—III, Information sci., 9, 1, 43-80, (1975) · Zbl 0404.68075
[6] Loève, M., Probability theory, (1963), Van Nostrand Princeton, N.J · Zbl 0108.14202
[7] Doob, J.L., Stochastic processes, (1953), Wiley New York · Zbl 0053.26802
[8] Rutherford, D.E., Introduction to lattice theory, (1965), Oliver and Boyd London · Zbl 0127.24904
[9] Kaufmann, A., Introduction à la théorie des sous-ensembles flous, (1973), Masson Paris · Zbl 0302.02023
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