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On Q-Fuzzy Ideals in Γ-Semigroups
Authors: Samit Kumar Majumder
Abstract:
In this paper the concept of Q-fuzzification of ideals of Γ-semigroups has been introduced and some important properties have been investigated. A characterization of regular Γ-semigroup in terms of Q-fuzzy ideals has been obtained. Operator semigroups of a Γ-semigroup has been made to work by obtaining various relationships between Q-fuzzy ideals of a Γ-semigroup and that of its operator semigroups.
Keywords: Q-Fuzzy set, Γ-semigroup, Regular Γ-semigroup, Q-Fuzzy left(right) ideal, Operator semigroups.
Digital Object Identifier (DOI): doi.org/10.5281/zenodo.1057265
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[1] S.K. Bhakat and P. Das, (2, 2 _q)-fuzzy subgroup, Fuzzy Sets Syst. 80 (1996) 359-368.
[2] S. Chattopadhyay; Right inverse ðô-semigroup, Bull. Cal. Math. Soc., 93(2001) 435-442.
[3] S. Chattopadhyay; Right orthodox ðô-semigroup, South East Asian Bulletin of Math., 29(2005) 23-30.
[4] R. Chinram; On quasi-ðô-ideals in ðô-semigroup, Science Asia, 32 (2006) 351-353.
[5] T.K. Dutta and N.C. Adhikari; On ðô-semigroup with right and left unities, Soochow Journal of Mathematics, 19 (4)(1993) 461-474.
[6] T.K. Dutta and N.C. Adhikari; On prime radical of ðô-semigroup, Bull. Cal. Math. Soc., 86 (5)(1994) 437-444.
[7] T.K. Dutta, S.K. Sardar and S.K. Majumder; Fuzzy ideal extensions of ¶ÇÇÇ- semigroups, International Mathematical Forum, 4 (42) (2009) 2093-2100.
[8] T.K. Dutta, S.K. Sardar and S.K. Majumder; Fuzzy ideal extensions of ¶ÇÇÇ-semigroups via its operator semigroups, International Journal of Contemporary Mathematical Sciences, 4 (30) (2009) 1455-1463.
[9] K. Hila; On regular, semiprime and quasi-reflexive ¶ÇÇÇ-semigroup and minimal quasiideals, Lobachevskii Journal of Mathematics, 29(2008) 141-152.
[10] K. Hila; On some classes of le-¶ÇÇÇ-semigroup, Algebras, Groups and Geometries, 24 (2007) 485-495.
[11] J.M. Howie; Fundamentals of semigroup theory, London Mathematical Society Monographs. New Series, 12. Oxford Science Publications. The Clarendon Press, Oxford University Press, New York, 1995.
[12] Y.B. Jun, S.M. Hong and J. Meng; Fuzzy Interior Ideals in Semigroups, Indian J. of Pure Appl. Math., 26(9)(1995) 859-863.
[13] N. Kuroki; On fuzzy ideals and fuzzy bi-ideals in semigroups, Fuzzy Sets and Systems, 5(1981) 203-215.
[14] N. Kuroki; On fuzzy semigroups, Information Sciences, 53(1991) 203-236.
[15] N, Kuroki ; Fuzzy semiprime quasi ideals in semigroups, Inform. Sci., 75(3)(1993) 201-211.
[16] Mordeson et all; Fuzzy semigroups, Springer-Verlag (2003), Heidelberg.
[17] A. Rosenfeld; Fuzzy groups, J. Math. Anal. Appl., 35 (1971) 512-517.
[18] S.K. Sardar and S.K. Majumder; On fuzzy ideals in ¶ÇÇÇ-semigroups, International Journal of Algebra., 3 (16) (2009) 775-784.
[19] S.K. Sardar and S.K. Majumder; A note on characterization of prime ideals of ¶ÇÇÇ-semigroups in terms of fuzzy subsets, International Journal of Contemporary Mathematical Sciences., 4 (30)(2009) 1465-1472.
[20] N.K. Saha; On ¶ÇÇÇ-semigroups II, Bull. of Cal. Math. Soc., 79 (1987) 331-335.
[21] M.K. Sen; On ¶ÇÇÇ-semigroups, Proceedings of the International conference on Algebra and its application. Decker Publication, New York, 301.
[22] M.K. Sen and N.K. Saha; On ¶ÇÇÇ-semigroups I, Bull. of Cal. Math. Soc., 78 (1986) 180-186.
[23] A. Seth; ¶ÇÇÇ-group congruences on Regular ¶ÇÇÇ-semigroups, International Journal of Mathematics and Mathematical Sciences., 15 (1) (1992) 103-106.
[24] Xiang-Yun Xie; Fuzzy ideal extensions of semigroups, Soochow Journal of Mathematics., 27(2)(April 2001) 125-138.
[25] Xiang-Yun Xie; Fuzzy ideal extensions of ordered semigroups, Lobach Journal of Mathematics., 19(2005) 29-40.
[26] L.A. Zadeh; Fuzzy Sets, Information and Control., 8 (1965) 338-353.