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Issue:Categorical properties of intuitionistic fuzzy groups

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Title of paper: Categorical properties of intuitionistic fuzzy groups
Author(s):
P. K. Sharma
P.G. department of Mathematics, D.A.V. College, Jalandhar, Punjab, India
pksharma@davjalandhar.com
Chandni
Lovely Professional University, Phagwara, India
chandni16041986@gmail.com
Published in: Notes on Intuitionistic Fuzzy Sets, Volume 27 (2021), Number 4, pages 55-70
DOI: https://doi.org/10.7546/nifs.2021.27.4.55-70
Download:  PDF (243  Kb, File info)
Abstract: The category theory deals with mathematical structures and relationships between them. Categories now appear in most branches of mathematics and in some areas of theoretical computer science and mathematical physics, and acting as a unifying notion. In this paper, we study the relationship between the category of groups and the category of intuitionistic fuzzy groups. We prove that the category of groups is a subcategory of category of intuitionistic fuzzy groups and that it is not an Abelian category. We establish a function β : Hom(A, B) → [0; 1] × [0; 1] on the set of all intuitionistic fuzzy homomorphisms between intuitionistic fuzzy groups A and B of groups G and H, respectively. We prove that β is a covariant functor from the category of groups to the category of intuitionistic fuzzy groups. Further, we show that the category of intuitionistic fuzzy groups is a top category by establishing a contravariant functor from the category of intuitionistic fuzzy groups to the lattices of all intuitionistic fuzzy groups.
Keywords: Intuitionistic fuzzy group, Intuitionistic fuzzy homomorphism, Category, Covariant functor, Contravariant functor.
AMS Classification: 03E72, 08A72.
References:
  1. Atanassov, K. T. (1986). Intuitionistic fuzzy sets. Fuzzy Sets and Systems, 20(1), 87–96.
  2. Atanassov, K. T. (1999). Intuitionistic Fuzzy Sets: Theory and Applications, Studies on Fuzziness and Soft Computing, 35, Heidelberg: Physica-Verlag.
  3. Awodey, S. (2005). Category Theory. Oxford University Press, 2 edition.
  4. Biswas, R. (1989). Intuitionistic fuzzy subgroup. Mathematical Forum, X, 37–46.
  5. Xu, C. (2008). New structure of Intuitionistic fuzzy groups. Huang, D. S., Wunsch, D. C., Levine. D. S., & Jo, K. H. (eds) Advanced Intelligent Computing Theories and Applications. With Aspects of Contemporary Intelligent Computing Techniques. ICIC 2008. Communications in Computer and Information Science, vol 15. Springer, Berlin, Heidelberg, 145–152.
  6. Eilenberg, S., & Mac Lane, S. (1945). General Theory of Natural Equivalences. American Mathematical Society, 58(2), 231–294.
  7. Fathi, M., & Salleh A.R. (2009). Intuitionistic fuzzy groups. Asian Journal of Algebra, 2(1), 1–10.
  8. Kim, J., Lim, P. K., Lee, J. G., & Hur, K. (2017). The category of intuitionistic fuzzy sets. Annals of Fuzzy Mathematics and Informatics, 14(6), 549–562.
  9. Leinster, T. (2014). Basic Category Theory. Cambridge Studies in Advanced Mathematics, Vol. 143.
  10. Sharma, P. K. (2011). Intuitionistic fuzzy groups. International Journal of Data warehousing and Mining, 1(1), 86–94.
  11. Sharma, P. K. (2012). On intuitionistic fuzzy Abelian subgroups, Advances in Fuzzy Sets and Systems, 12(1), 1–16.
  12. Sharma, P. K. (2015). Intuitionistic Fuzzy Representations of Intuitionistic Fuzzy Groups, Asian Journal of Fuzzy and Applied Mathematics, 3(3), 81–94.
  13. Wyler, O. (1971). On the categories of general topology and topological algebra, Archiv der Mathematik, 22, 7–17.
  14. Yuan, X.-H., Li, H.-X., & Stanley Lee, E. (2010). On the definition of the intuitionistic fuzzy subgroup, Computers & Mathematics with Applications, 59, 3117-3129.
  15. Zadeh, L. A. (1965). Fuzzy Sets. Information and Control, 8, 338–353.
  16. Zhan, J., & Tan, Z. (2004). Intuitionistic M-fuzzy groups. Soochow Journal of Mathematics, 30, 85–90.
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