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Issue:Counting the number of intuitionistic fuzzy subgroups of finite Abelian groups of different order: Difference between revisions

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  | issue          = [[Notes on Intuitionistic Fuzzy Sets/19/4|"Notes on IFS", Volume 19, 2013, Number 4]], pages 42—47
  | issue          = [[Notes on Intuitionistic Fuzzy Sets/19/4|"Notes on Intuitionistic Fuzzy Sets", Volume 19, 2013, Number 4]], pages 42—47
  | file            = NIFS-19-4-42-47.pdf
  | file            = NIFS-19-4-42-47.pdf
  | format          = PDF
  | format          = PDF

Latest revision as of 17:13, 28 August 2024

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Title of paper: Counting the number of intuitionistic fuzzy subgroups of finite Abelian groups of different order
Author(s):
Neeraj Doda
Hindu College, Amritsar, India
neerajdoda11@yahoo.com
P. K. Sharma
Hindu College, Amritsar, India
pk_Sharma7@rediffmail.com
Published in: "Notes on Intuitionistic Fuzzy Sets", Volume 19, 2013, Number 4, pages 42—47
Download:  PDF (108  Kb, File info)
Abstract: In this paper, we have defined double keychain, double pinned flag and equivalence classes of intuitionistic fuzzy subgroups of a group by using an equivalence relation. We have also determined the formulae to count the number of distinct intuitionistic fuzzy subgroups of finite Abelian groups; in particular the intuitionistic fuzzy subgroups of p-groups and that of [math]\displaystyle{ Z_{p^2} \times Z_q }[/math], where p and q are distinct primes.
Keywords: Double pins, Double keychain, Double pinned flag, Equivalence, Intuitionistic fuzzy subgroup.
AMS Classification: 08A72, 20N25, 03F55.
References:
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  2. Neeraj, D., P. K. Sharma. Different possibilities of fuzzy subgroups of a cyclic group I, Advances in Fuzzy Sets and Systems, Vol. 12, 2012, No. 2, 101–109.
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  6. Murali, V., B. B. Makamba. Counting the number of fuzzy subgroups of an Abelian group of order pn qm, Fuzzy Sets and Systems, Vol. 144, 2004, 459–470.
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  10. Tarnauceanu, M., L. Bentea. On the number of fuzzy subgroups of finite Abelian groups, Fuzzy Sets and Systems, Vol. 159, 2008, 1084–1096.
  11. Chen, Y., Y. Jiang, S. Jia. On the number of fuzzy subgroups of finite Abelian p-groups, International Journal of Algebra, Vol. 6, 2011, No. 5, 233–238.
  12. Zadeh, L. A. Fuzzy sets, Information and Control, Vol. 8, 1965, 338–353.
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