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Issue:On IF-numbers: Difference between revisions

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  | title          = On IF-numbers
  | title          = On IF-numbers
  | shortcut        = nifs/22/3/9-14
  | shortcut        = nifs/22/3/9-13
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  | conference      =  20th [[International Conference on Intuitionistic Fuzzy Sets]], 2–3  September 2016, Sofia, Bulgaria  
  | conference      =  20th [[International Conference on Intuitionistic Fuzzy Sets]], 2–3  September 2016, Sofia, Bulgaria  
  | issue          = [[Notes on Intuitionistic Fuzzy Sets/22/3|"Notes on IFS", Volume 22, 2016, Number 3]], pages 9—14
  | issue          = [[Notes on Intuitionistic Fuzzy Sets/22/3|"Notes on Intuitionistic Fuzzy Sets", Volume 22, 2016, Number 3]], pages 9—13
  | file            = NIFS-22-3-009-014.pdf
  | file            = NIFS-22-3-009-013.pdf
  | format          = PDF
  | format          = PDF
  | size            = 132
  | size            = 136
  | abstract        = In the paper analogously to the notion of fuzzy numbers ([10, 11, 12, 13, 14, 18], the notion of the IF-number is introduced, using a new approach and it is studied. Especially it is proved that the space of all IF-numbers with a convenient metric function is a complete metric space.
  | abstract        = In the paper analogously to the notion of fuzzy numbers ([10, 11, 12, 13, 14, 18], the notion of the IF-number is introduced, using a new approach and it is studied. Especially it is proved that the space of all IF-numbers with a convenient metric function is a complete metric space.
  | keywords        = Intuitionistic fuzzy sets, Fuzzy numbers, Metric spaces.
  | keywords        = Intuitionistic fuzzy sets, Fuzzy numbers, Metric spaces.

Latest revision as of 11:11, 29 August 2024

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http://ifigenia.org/wiki/issue:nifs/22/3/9-13
Title of paper: On IF-numbers
Author(s):
Beloslav Riečan
Faculty of Natural Sciences, Matej Bel University, Department of Mathematics, Tajovskeho 40, 974 01 Banska Bystrica, SLOVAKIA
Mathematical Institute of Slovak Acad. of Sciences, Stefanikova 49, SK-81473 Bratislava, SLOVAKIA
riecan@umb.sk
Daniela Kluvancová
Faculty of Natural Sciences, Matej Bel University, Department of Mathematics, Tajovskeho 40, 974 01 Banska Bystrica, SLOVAKIA
Mathematical Institute of Slovak Acad. of Sciences, Stefanikova 49, SK-81473 Bratislava, SLOVAKIA
kluvancova.daniela@umb.sk
Presented at: 20th International Conference on Intuitionistic Fuzzy Sets, 2–3 September 2016, Sofia, Bulgaria
Published in: "Notes on Intuitionistic Fuzzy Sets", Volume 22, 2016, Number 3, pages 9—13
Download:  PDF (136  Kb, File info)
Abstract: In the paper analogously to the notion of fuzzy numbers ([10, 11, 12, 13, 14, 18], the notion of the IF-number is introduced, using a new approach and it is studied. Especially it is proved that the space of all IF-numbers with a convenient metric function is a complete metric space.
Keywords: Intuitionistic fuzzy sets, Fuzzy numbers, Metric spaces.
AMS Classification: 03E72, 08A72.
References:
  1. Atanassov, K. (1999) Intuitionistic Fuzzy Sets: Theory and Applications. Studies in Fuzziness and Soft Computing. Physica Verlag, Heidelberg.
  2. Atanassov, K. (2012) On Intuitionistic Fuzzy Sets Theory. Springer, Berlin.
  3. Atanassov, K. (2007) Remark on intuitionistic fuzzy numbers. Notes on Intuitionistic Fuzzy Sets, 13(3), 29–32.
  4. Atanassov, K. T., Vassilev, P. M., & Tsvetkov, R. T. (2013) Intuitionistic Fuzzy Sets, Measures and Integrals. Prof. M. Drinov Academic Publishing House, Sofia.
  5. Ban, A. (2006) Intuitionistic Fuzzy Measures. Theory and Applications. Nova Sci. Publishers, New York.
  6. Ban, A., & Coroianu, L. (2011) Approximations of intuitionistic fuzzy numbers generated from approximations of fuzzy numbers. Recent Advances in Fuzzy Sets, Intuitionistic Fuzzy Sets, Generalized Nets and Related Topics, Vol. I: Foundations. Warsaw, SRI Polish Academy of Sciences, 43–61.
  7. Boccuto, A., Riečan, B., Vrábelová, & M. Kurzweil (2009) Henstock Integral in Riesz Spaces, Bentham.
  8. Burillo, P., Bustince, H. & Mohedano, V. (1994) Some definitions of intuitionistic fuzzy number. First properties. Proc. of the First Workshop on Fuzzy Based Expert Systems (D. Lakov, Ed.), Sofia, 28–30 Sept. 1994, 53–55.
  9. Ciungu, L., & Riečan, B. (2010) Representation theorem for probabilities on IFS-events. Information Sciences, 180, 703–708.
  10. Congxin, W., & Gong, Z. (2001) On Henstock integral of fuzzy-number-valued functions, Fuzzy Sets and Systems, 120(3), 523–532.
  11. Congxin, W., & Ming, M. (1991) On embeding problem of fuzzy number space: Part 1. Fuzzy Sets and Systems 44, 33–38.
  12. Goetchel, R., & Voxman,W. (1986) Elementary fuzzy calculus. Fuzzy Sets and Systems, 18, 31–43. 12
  13. Guang-Quan, Z. (1991) Fuzzy continuous function and its properties. Fuzzy Sets and Systems, 43, 159–171.
  14. Ming, M. (1993) On embedding problem of fuzzy number space. Part 4. Fuzzy Sets and Systems, 58, 185–193.
  15. Riečan, B. (2012) Analysis of Fuzzy Logic Models. Intelligent Systems (V. M. Koleshko ed.), INTECH, 219–244.
  16. Riečan, B., & Mundici, D. (2002) Probability inMV-algebras. Handbook of Measure Theory (E. Pap ed.), Elsevier, Heidelberg.
  17. Riečan, B., & Neubrunn, T. (1997) Integral, Measure, and Ordering. Kluwer, Dordrecht.
  18. Uzzal Afsan, B. M. (2016) On convergence theorems for fuzzy Henstock integrals. Iranian J. of Fuzzy Systems (in press).
  19. Zadeh, L. A. (1965) Fuzzy sets. Inform. and Control, 8, 338–358.
  20. Zadeh, L. A. (1968) Probability measures of fuzzy events. J. Mat. Anal. Apl., 23, 421–427.
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