Information Technology Reference
In-Depth Information
[19] Foulis D. and Bennett M.: Effect algebras and unsharp quantum logics. Found. Phys. 24,
1994, 1325-1346.
[20] Georgescu G.: Bosbach states on fuzzy structures. Soft Computing 8, 2004, 217-230.
[21] Gerstenkorn T.,
Manko J.:
Probabilities of intuitionistic fuzzy events. In:
Issues
in Intelligent Systems:
Paradigms,
(O.Hryniewicz et al. eds.),
Intuitionistic fuzzy
probability theory 45 2005, 63-58.
[22] Grzegorzewski P. and Mrowka E.: Probability of intuistionistic fuzzy events. In: Soft
Metods in Probability, Statistics and Data Analysis, (P. Grzegorzewski et al.eds),2002,
105-115.
[23] Hájek P.: Metamathematics of Fuzzy Logic. Kluwer, Dordrecht, 1998.
[24] Hanesová R.: Statistical estimation on MV-algebras. Proc. of the Eleventh International
Workshop on Generalized Nets and the Second International Workshop on Generalized
Nets, Intuitionistic Fuzzy Sets and Knowledge Engineering, London 9 July 2010, 66 - 70.
[25] Jurecková, M.: The addition to ergodic theorem on probability MV-algebras with
product. Soft Computing 7, 2003, 105 - 115.
[26] Kelemenová,J.: The inclusion-exclusion principle in semigroups. Recent Advances in
Fuzzy Sets, Intuitionistic Fuzzy Sets, Generalized Nets and related Topics, Vol.I IBS PAN
SRI PAS Warsaw 2011, 87- 94.
[27] Klement E., Mesiar R., and Pap E.: Triangular Norms. Kluwer, Dordrecht, 2000.
[28] Kôpka F., Chovanec F.: D-posets. Math. Slovaca 44, 1994, 21-34.
[29] Krachounov M.: Intuitionistic probability and intuitionistic fuzzy sets. In: First Intern.
Workshop on IFS, (El-Darzi et al. eds.), 2006, 714-717.
[30] Kuková M.: The inclusion-exclusion principle on some algebraic structures. Recent
Advances in Fuzzy Sets, Intuitionistic Fuzzy Sets, Generalized Nets and related Topics,
Vol.I IBS PAN SRI PAS Warsaw 2011, 123 - 126.
[31] Lašová L.: The individual ergodic theorem on IF-events. Developments in Fuzzy Sets,
Intuitionistic Fuzzy Sets, Generalized Nets and related Topics, Vol.I IBS PAN SRI PAS
Warsaw 2010, 131 - 140.
[32] Lendelová K.: Convergence of IF-observables. In: Issues in the Representation and
Processing of Uncertain and Imprecise Information - Fuzzy Sets, Intuitionistic Fuzzy Sets,
Generalized nets, and Related Topics. EXIT, Warsaw 2005, 232 - 240.
[33] Lendelová K.: IF-probability on MV-algebras. Notes on Intuitionistic Fuzzy Sets 11, 2005,
66-72.
[34] Lendelová K.: Conditional IF-probability. In: Advances in Soft Computing: Soft Methods
for Integrated Uncertainty Modelling, 2006, 275-283.
[35] Lendelová K., Petrovicová J.: Representation of IF-probability for MV- algebras. Soft
Computing (A Fusion of Fundations, Metodologies and Applications 10, 2006, 564-566.
[36] Lendelová K., Riecan B.: Weak law of large numbers for IF-events. In: Current Issues in
Data and Knowledge Engineering,(Bernard De Baets et al. eds.), 2004, 309-314.
[37] Lendelová K., Riecan B.: Probability on triangle and square. In: Proceedings of the
Eleventh International Conference IPMU 2006, July, 2-7, 2006, Paris, 977 - 982.
[38] Lendelová K., Riecan B.: Strong law of large numbers for IF-events. In: Proceedings of
the Eleventh International Conference IPMU 2006, July, 2-7, 2006, Paris 2006, 2363-2366.
[39] Markechová D.: The conjugation of fuzzy probability spaces to the unit interval. Fuzzy
Sets and Systems 47, 1992, 87 - 92.
[40] Markechová D.: F-quantum spaces and their dynamics. Fuzzy Sets and Systems 50, 1992,
79- 88.
