Uneingeschränkter Zugang

Modelling of Uncertainty and Bi–Variable Maps


Zitieren

[1] AL-ADILEE, A. M.-NÁNÁSIOVÁ, O. : Copula and s-Map on a Quantum Logic, Information Sciences 179 (2009), 4199-4207.10.1016/j.ins.2009.08.011Search in Google Scholar

[2] AUBIN, J. P. : Mathematical Methods of Games and Economic Theory, North-Holland, Amsterdam, 1979.Search in Google Scholar

[3] AUMAN, R. J.-SHAPLEY, L. S. : Values of Non-Atomic Games, Princeton University Press, Princeton, 1974.Search in Google Scholar

[4] BELTRAMETTI, E. G.-CASSINELLI, G. : The Logic of Quantum Mechanics, Addison-Wesley, Reading MA, 1981.Search in Google Scholar

[5] BUTNARIU, D. : Non-Atomic Fuzzy Measures and Games, Fuzzy Sets and Systems 17 No. 1985, 39-52.10.1016/0165-0114(85)90005-3Search in Google Scholar

[6] BUTNARIU, D. : Values and Cores for Fuzzy Games with Infinitely Many Players, International Journal of Game Theory 16 (1987), 43-68.10.1007/BF01756244Search in Google Scholar

[7] BUTNARIU, D.-KLEMENT, E. P. : Triangular Norm-Based Measures and their Markov Kernel Representation, Journal of Mathematical Analysis and Applications 162 (1991), 111-143.10.1016/0022-247X(91)90181-XSearch in Google Scholar

[8] De BAETS, B.-MESIAR, M. : Triangular Norms on Product Lattices, Fuzzy Sets and Systems 104 (1999), 61-75.10.1016/S0165-0114(98)00259-0Search in Google Scholar

[9] DVORETZKY, A.-WALD, A.-WOLFOWITZ, J. : Relations Among Certain Ranges of Vector Measures, Pacific Journal of Mathematics 1 (1951), 59-74.10.2140/pjm.1951.1.59Search in Google Scholar

[10] FRANK, M. D. : On the Simultaneous Associativity of F(x, y) and x + y − F(x, y) , Aequationes Mathematicae 19 (1979), 194-226.10.1007/BF02189866Search in Google Scholar

[11] GILES, R. : Lukasiewicz Logic and Fuzzy Set Theory, International Journal of Man-Machine Studies 67 (1976), 313-327.10.1016/S0020-7373(76)80003-XSearch in Google Scholar

[12] GREECHIE, R. J. : Orthomodular Lattices Admitting no States, Journal of Combinatorial Theory, Ser. A 10 (1971), 119-132.Search in Google Scholar

[13] KALMBACH, G. : Orthomodular Lattices, Academic Press, London, 1983.Search in Google Scholar

[14] KLEMENT, E. P.-MESIAR, R.-PAP, E. : Triangular Norms, Kluwer, Dordrecht, 2000.10.1007/978-94-015-9540-7Search in Google Scholar

[15] MARTINEK, R.-KELNAR, M.-VANUS, J. : A Robust Approach for Acoustic Noise Suppression in Speech using ANFIS, Journal of Electrical Engineering 66 (2015), 301-310.10.2478/jee-2015-0050Search in Google Scholar

[16] MENGER, K. : Statistical Metrics, Proceedings of the National Academy of Sciences of the USA 28 (1942), 353-537.10.1073/pnas.28.12.535107853416588583Search in Google Scholar

[17] MESIAR, R. : Fundamental Triangular Norm Based Tribes and Measures, Journal of Mathematical Analysis and Applications 177 (1993), 633-640.10.1006/jmaa.1993.1283Search in Google Scholar

[18] NÁNÁSIOVÁ, O. : Map for Simultaneous Measurements for a Quantum Logic, International Journal of Theoretical Physics 42 (2003), 1889-1903.10.1023/A:1027384132753Search in Google Scholar

[19] NÁNÁSIOVÁ, O.-KHRENNIKOV, A. : Representation Theorem for Observables on a Quantum System, International Journal of Theoretical Physics 45 (2006), 469-482.10.1007/s10773-006-9030-6Search in Google Scholar

[20] NÁNÁSIOVÁ, O.-VALÁŠKOVÁ, Ľ. : Maps on a Quantum Logic, Soft Computing 14 (2010), 1047-1052.10.1007/s00500-009-0483-4Search in Google Scholar

[21] NAVARA, M. : Small Quantum Structures with Small State Spaces, International Journal of Theoretical Physics 47 (2008), 36-43.10.1007/s10773-007-9415-1Search in Google Scholar

[22] NAVARA, M. : Triangular Norms and Conorms, www.scholarpedia.org/article/Triangular_norms_and_conorms .Search in Google Scholar

[23] NELSEN, R. B. : An Introduction to Copulas, Springer, New York, 1999.10.1007/978-1-4757-3076-0Search in Google Scholar

[24] PETROVIĆ, I.-JOZSA, L.-BAUS, Z. : Use of Fuzzy Logic System for Assessment of Primary Faults, Journal of Electrical Engineering 66 (2015), 257-263.10.2478/jee-2015-0042Search in Google Scholar

[25] PYKACZ, J. : Fuzzy Quantum Logics and Infinite-Valued Lukasiewicz Logic, International Journal of Theoretical Physics 33 (1994), 1403-1416.10.1007/BF00670685Search in Google Scholar

[26] PYKACZ,.: Lukasiewicz Operations in Fuzzy Set and Many- Valued Representations of Quantum Logics, Foundations of Physics 30 (2000), 1503-1524.10.1023/A:1026462019270Search in Google Scholar

[27] PTÁK, P.-PULMANNOVÁ, S. : Orthomodular Structures as Quantum Logics, Kluwer, Dordrecht, 1991.Search in Google Scholar

[28] PYKACZ, J.-VALÁŠKOVÁ, Ľ.-NÁNÁSIOVÁ, O. : Bell- Type Inequalities for Bivariate Maps on Orthomodular Lattices, Foundations of Physics 45 (2014), 900-913.10.1007/s10701-015-9906-5Search in Google Scholar

[29] ROSE, A.-ROSSER, J. B. : Fragments of Many Valued Statement Calculus, Transactions of the American Mathematical Society 87 (1958), 1-53.10.1090/S0002-9947-1958-0094299-1Search in Google Scholar

[30] SCHWEIZER, B.-SKLAR, A. : Probabilistic Metric Spaces, North-Holland, New York, 1983.Search in Google Scholar

[31] SOCHA, V.-KUTÍLEK, P.-VITEČKOVÁ, S. : The Evaluation of the Practical Adhesion Strenght of Biocompatible Thin Films by Fuzzy Logic Expert Sysstem and International Standards, Journal of Electrical Engineering 64 (2013), 354-360.10.2478/jee-2013-0053Search in Google Scholar

[32] TKADLEC, J. : Subadditivity of States on Quantum Logics, International Journal of Theoretical Physics 34 (1995), 1767-1774.10.1007/BF00676290Search in Google Scholar

[33] WALD, A. : On Statistical Generalizations of Metric Spaces, Proceedings of the National Academy of Sciences of the USA 29 (1943), 196-197.10.1073/pnas.29.6.196107858416578072Search in Google Scholar

[34] ZHANG, D. : Triangular Norms on Partially Ordered Sets, Fuzzy Sets and Systems 153 (2005), 195-209.10.1016/j.fss.2005.02.001Search in Google Scholar

eISSN:
1339-309X
Sprache:
Englisch
Zeitrahmen der Veröffentlichung:
6 Hefte pro Jahr
Fachgebiete der Zeitschrift:
Technik, Einführungen und Gesamtdarstellungen, andere