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Tarnauceanu, Marius. (1394). Classifying fuzzy normal subgroups of\ finite groups. نشریه علمی دانشگاه سیستان و بلوچستان, 12(2), 107-115. doi: 10.22111/ijfs.2015.1986
Marius Tarnauceanu. "Classifying fuzzy normal subgroups of\ finite groups". نشریه علمی دانشگاه سیستان و بلوچستان, 12, 2, 1394, 107-115. doi: 10.22111/ijfs.2015.1986
Tarnauceanu, Marius. (1394). 'Classifying fuzzy normal subgroups of\ finite groups', نشریه علمی دانشگاه سیستان و بلوچستان, 12(2), pp. 107-115. doi: 10.22111/ijfs.2015.1986
Tarnauceanu, Marius. Classifying fuzzy normal subgroups of\ finite groups. نشریه علمی دانشگاه سیستان و بلوچستان, 1394; 12(2): 107-115. doi: 10.22111/ijfs.2015.1986

Classifying fuzzy normal subgroups of\ finite groups

Iranian Journal of Fuzzy Systems
مقاله 9، دوره 12، شماره 2، تیر 2015، صفحه 107-115    اصل مقاله (300.33 K)
نوع مقاله: Research Paper
شناسه دیجیتال (DOI): 10.22111/ijfs.2015.1986
نویسنده
Marius Tarnauceanu*
Faculty of Mathematics, "Al.I. Cuza" University, Iasi, Romania
چکیده
In this paper a first step in classifying the fuzzy normal
subgroups of a finite group is made. Explicit formulas for the
number of distinct fuzzy normal subgroups are obtained in the
particular cases of symmetric groups and dihedral groups.
کلیدواژه‌ها
Fuzzy normal subgroups؛ Chains of normal subgroups؛ Maximal chains of normal subgroups؛ Symmetric groups؛ Dihedral groups
مراجع
[1] N. Ajmal and K.V. Thomas, The lattice of fuzzy normal subgroups is modu-lar, Inform. Sci.
83 (1995), 199{209.
[2] G. Gratzer, General lattice theory, Academic Press, New York, 1978.
[3] T. Head, A metatheorem for deriving fuzzy theorems from crisp versions, Fuzzy Sets and
Systems 73 (1995), 349-358; 79 (1996), 277{278.
[4] M. Mashinchi and M. Mukaidono, A classi cation of fuzzy subgroups, Ninth Fuzzy System
Symposium, Sapporo, Japan, (1992), 649{652.
[5] M. Mashinchi and M. Mukaidono, On fuzzy subgroups classi cation, Research Report of Meiji
Univ., 9 (1993), 31{36.
[6] J. N. Mordeson, K. R. Bhutani and A. Rosenfeld, Fuzzy group theory, Springer Verlag, Berlin,
2005.
[7] V. Murali and B. B. Makamba, Normality and congruence in fuzzy subgroups, Inform. Sci.,
59 (1992), 121{129.
[8] V. Murali and B. B. Makamba, On an equivalence of fuzzy subgroups, I, Fuzzy Sets and
Systems, 123 (2001), 259{264.
[9] V. Murali and B. B. Makamba, On an equivalence of fuzzy subgroups, II, Fuzzy Sets and
Systems, 136 (2003), 93{104.
[10] V. Murali and B. B. Makamba, On an equivalence of fuzzy subgroups, III, Int. J. Math. Sci.,
36 (2003), 2303{2313.
[11] V. Murali and B. B. Makamba, Counting the number of fuzzy subgroups of an abelian group
of order pnqm, Fuzzy Sets and Systems, 144 (2004), 459{470.
[12] V. Murali and B. B. Makamba, Fuzzy subgroups of nite abelian groups, FJMS, 14 (2004),
113{125.
[13] R. Schmidt, Subgroup lattices of groups, de Gruyter Expositions in Mathematics 14, de
Gruyter, Berlin, 1994.
[14] M. Suzuki, Group theory, I, II, Springer Verlag, Berlin, (1982), (1986).
[15] M. Stefanescu and M. Tarnauceanu, Counting maximal chains of subgroups of nite nilpotent
groups, Carpathian J. Math., 25 (2009), 119{127.
[16] M. Tarnauceanu and L. Bentea, On the number of fuzzy subgroups of nite abelian groups,
Fuzzy Sets and Systems, doi: 10.1016/j.fss.2007.11.014, 159 (2008), 1084{1096.
[17] A. C. Volf, Counting fuzzy subgroups and chains of subgroups, Fuzzy Systems & Arti cial
Intelligence, 10 (2004), 191{200.

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