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Issue:Intuitionistic fuzzy set theory and mass assignment theory: Some relations

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Title of paper: Intuitionistic fuzzy set theory and mass assignment theory: Some relations
Author(s):
Eulalia Szmidt
Systems Research Institute Polish Academy of Sciences, ul. Newelska 6, 01-447 Warsaw, Poland
szmidt@ibspan.waw.pl
Janusz Kacprzyk
Systems Research Institute Polish Academy of Sciences, ul. Newelska 6, 01-447 Warsaw, Poland
kacprzyk@ibspan.waw.pl
Published in: "Notes on Intuitionistic Fuzzy Sets", Volume 4 (1998) Number 1, pages 1—7
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Abstract: We show some similarities/parallels between Mass Assignment Theory and Intuitionistic Fuzzy Set Theory. Mass Assignment Theory is well known tool for dealing with both probabilistic and fuzzy uncertainties. On the other hand Intuitionistic Fuzzy Set theory is an extension of Fuzzy Set Theory which make it possible to describe imprecise information.
Keywords: fuzzy sets, intuitionistic fuzzy sets, Mass Assignment Theory
References:
  1. K. Atanassov (1986), Intuitionistic fuzzy sets, Fuzzy Sets and Systems, 20 87-96.
  2. K. Atanassov (1989), More on intuitionistic fuzzy sets, Fuzzy Sets and Systems 33 37-46.
  3. K. Atanassov, (1994a), New operations defined over the intuitionistic fuzzy sets, Fuzzy Sets and Systems 61 137-142.
  4. K. Atanassov, (1994b), Operators over interval valued intuitionistic fuzzy sets, Fuzzy Sets and Systems, 64 159-174.
  5. K. Atanassov (1998), Intuitionistic Fuzzy Sets: Theory and Applications (to appear).
  6. J.F. Baldwin, B.W. Pilsworth. (1990), Semantic Unification with Fuzzy Concepts in Fril. IPMU'90. Third Int. Conf. Paris, July 2-6.
  7. J.F. Baldwin. (1991a), Combining Evidences for Evidential Reasoning. International Journal of Intelligent Systems, 6, 569-616
  8. J.F. Baldwin (1992), Fuzzy and Probabilistic Uncertainties in Encyclopaedia of AI (ed. S.A Shapiro), John Wiley, pp 528-537.
  9. J.F. Baldwin (1994), Mass assignments and fuzzy sets for fuzzy databases. In. Advances in the Dempster-Shafer theory of evidence. Ed. by R. Yager at al. John Wiley, pp. 577-594.
  10. J.F. Baldwin, J. Lawry, TP. Martin (1995a) A Mass Assignment Theory of the Probability of Fuzzy Events. ITRC Report 229, University of Bristol, UK.
  11. J.F. Baldwin, M.R. Coyne, TP. Martin (1995b) Intelligent Reasoning Using General Knowledge to Update Specific Information: A Database Approach. Journal of Intelligent Information Systems, 4, pp. 281-304.
  12. J.F. Baldwin, TP. Martin (1995c) - Extracting Knowledge from Incomplete Databases using the Fril Data Browser. Proc. EUFIT'95, August 28-31, Aachen, pp. 111-115.
  13. J.F. Baldwin, TP. Martin (1996) -FRIL as an Implementation Language for Fuzzy Information Systems. Proc. Sixth Int. Conf. IPMU'96 Granada, July 1-5, pp. 289-294.
  14. E. Szmidt and J. Kacprzyk (1996), Intuitionistic fuzzy sets in group decision making, Notes on IFS 2 15-32.
  15. E. Szmidt and J. Kacprzyk (1996), Group decision making via intuitionistic fuzzy sets, Proceeding of FUBEST'96 (Sofia, Bulgaria, 1996) 107-112.
  16. E. Szmidt and J. Kacprzyk (1996), Remarks on some applications of intuitionistic fuzzy sets in decision making, Notes on IFS 2 22-31.
  17. E. Szmidt and J. Kacprzyk (1997), Intuitionistic fuzzy sets for more realistic group decision making, Proceedings of TRANSITIONS'97 (Warsaw, Poland) 430-433.
  18. E. Szmidt and J. Kacprzyk (1997), On measuring distances between intuitionistic fuzzy sets, Notes on IFS 3 (1997) 1-13.
  19. E.Szmidt and J. Kacprzyk (1998) An intuitionistic fuzzy set corresponding to a fuzzy set (to appear).
  20. L.A. Zadeh (1965), Fuzzy sets. Information and Control 8 338-353.
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