A Note on Characterization of Regular Γ-Semigroups in terms of (∈,∈ ∨q)-Fuzzy Bi-ideal
The purpose of this note is to obtain some properties of
(∈,∈ ∨q)- fuzzy bi-ideals in a Γ-semigroup in order to characterize
regular and intra-regular Γ-semigroups.
[1] S.K. Bhakat and P. Das, (Ôêê,Ôêê Ôê¿q)-fuzzy subgroup, Fuzzy Sets Syst. 80
(1996) 359-368.
[2] S. Chattopadhyay, Right orthodox Γ-semigroup, Southeast Asian Bull.
Math., 29 (2005) 23-30.
[3] R. Chinram, On quasi-Γ-ideals in Γ-semigroups, Science Asia 32 (2006)
351-353.
[4] T.K. Dutta and N.C. Adhikari, On Γ-semigroup with the right and left
unities, Soochow J. Math., 19 (4) (1993) 461-474.
[5] T.K. Dutta and N.C. Adhikari, On prime radical of Γ-semigroup, Bull.
Cal. Math. Soc., 86 (5) (1994) 437-444.
[6] T.K. Dutta, S.K. Sardar and S.K. Majumder, Fuzzy ideal extensions
of Γ-semigroups via its operator semigroups, Int. J. Contemp. Math.
Sciences, 4(30)(2009) 1455 - 1463.
[7] K. Hila, On some classes of le- Γ-semigroup and minimal quasi-ideals,
Algebras Groups Geom. 24 (2007) 485-495.
[8] Y.B. Jun and S.Z. Song, Generalized fuzzy interior ideals in semigroups,
Inform Sci. 176 (2006) 3079-3093.
[9] N. Kuroki, On fuzzy semigroups, Inform Sci. 53 (1991) 203-236.
[10] N. Kuroki, On fuzzy ideals and fuzzy bi-ideals in semigroups, Fuzzy
Sets Syst. 5 (1981) 203-215.
[11] N. Kuroki, Fuzzy semiprime ideals in semigroups, Fuzzy Sets Syst. 158
(2004) 277-288.
[12] V. Murali, Fuzzy points of equivalent fuzzy subsets, Inform. Sci.
158(2004) 277-288.
[13] P.M. Pu and Y.M. Liu, Fuzzy topology I, neighbourhood structure of
a fuzzy point and Moore-Smith convergence, J. Math. Anal. Appl. 76
(1980) 571-599.
[14] A. Rosenfeld, Fuzzy groups, J. Math. Anal. Appl., 35 (1971) 512-517.
[15] N.K. Saha, On Γ-semigroup II, Bull. Cal. Math. Soc. 79 (1987) 331-335.
[16] S.K. Sardar and S.K. Majumder, On fuzzy ideals in Γ-semigroups,
International Journal of Algebra, 3 (16) (2009)775-784.
[17] S.K. Sardar, S.K. Majumder and D. Mandal, A note on characterization
of prime ideals of Γ-semigroups in terms of fuzzy subsets,Int. J. Contemp.
Math. Sciences, 4(30)(2009) 1465 -1472.
[18] S.K. Sardar and S.K. Majumder, A note on characterization of
semiprime ideals of Γ-semigroups in terms of fuzzy subsets, International
Journal of Pure and Applied Mathematics, 3(56)(2009)451-457.
[19] S.K. Sardar, B. Davvaz and S.K. Majumder, A study on fuzzy
interior ideals of Γ-semigroups,Computers and Mathematics with
applications(Elsevier),60 (2010) 90-94.
[20] S.K. Sardar, B. Davvaz, S.K. Majumder and S. Kayal,
(╬▒, β)-fuzzy subsemigroup and (╬▒, β)-fuzzy bi-ideal in Γ-
semigroups,(Communicated).
[21] M.K. Sen and S. Chattopadhyay, Semidirect product of a monoid and
a Γ-semigroup, East-West J. Math. 6 (2004) 131-138.
[22] M.K. Sen and N.K. Saha, Orthodox Γ-semigroups, Internat. J. Math.
Math. Sci., 13 (1990) 527-534.
[23] M.K. Sen and N.K. Saha, On Γ-semigroup I, Bull. Cal. Math. Soc. 78
(1986) 180-186.
[24] A. Seth, Γ-group congruences on regular Γ-semigroups, Internat. J.
Math. Math. Sci. 15 (1992)103-106.
[25] Y. Yunqiang and D. Xu, The (Ôêê,Ôêê Ôê¿q)-fuzzy subsemigroups and ideals
of an (Ôêê,Ôêê Ôê¿q)-fuzzy semigroup, Southeast Asian Bull. of math. 33
(2009)391-400.
[26] L.A. Zadeh, Fuzzy Sets, Information and Control, 8 (1965) 338-353.
[1] S.K. Bhakat and P. Das, (Ôêê,Ôêê Ôê¿q)-fuzzy subgroup, Fuzzy Sets Syst. 80
(1996) 359-368.
[2] S. Chattopadhyay, Right orthodox Γ-semigroup, Southeast Asian Bull.
Math., 29 (2005) 23-30.
[3] R. Chinram, On quasi-Γ-ideals in Γ-semigroups, Science Asia 32 (2006)
351-353.
[4] T.K. Dutta and N.C. Adhikari, On Γ-semigroup with the right and left
unities, Soochow J. Math., 19 (4) (1993) 461-474.
[5] T.K. Dutta and N.C. Adhikari, On prime radical of Γ-semigroup, Bull.
Cal. Math. Soc., 86 (5) (1994) 437-444.
[6] T.K. Dutta, S.K. Sardar and S.K. Majumder, Fuzzy ideal extensions
of Γ-semigroups via its operator semigroups, Int. J. Contemp. Math.
Sciences, 4(30)(2009) 1455 - 1463.
[7] K. Hila, On some classes of le- Γ-semigroup and minimal quasi-ideals,
Algebras Groups Geom. 24 (2007) 485-495.
[8] Y.B. Jun and S.Z. Song, Generalized fuzzy interior ideals in semigroups,
Inform Sci. 176 (2006) 3079-3093.
[9] N. Kuroki, On fuzzy semigroups, Inform Sci. 53 (1991) 203-236.
[10] N. Kuroki, On fuzzy ideals and fuzzy bi-ideals in semigroups, Fuzzy
Sets Syst. 5 (1981) 203-215.
[11] N. Kuroki, Fuzzy semiprime ideals in semigroups, Fuzzy Sets Syst. 158
(2004) 277-288.
[12] V. Murali, Fuzzy points of equivalent fuzzy subsets, Inform. Sci.
158(2004) 277-288.
[13] P.M. Pu and Y.M. Liu, Fuzzy topology I, neighbourhood structure of
a fuzzy point and Moore-Smith convergence, J. Math. Anal. Appl. 76
(1980) 571-599.
[14] A. Rosenfeld, Fuzzy groups, J. Math. Anal. Appl., 35 (1971) 512-517.
[15] N.K. Saha, On Γ-semigroup II, Bull. Cal. Math. Soc. 79 (1987) 331-335.
[16] S.K. Sardar and S.K. Majumder, On fuzzy ideals in Γ-semigroups,
International Journal of Algebra, 3 (16) (2009)775-784.
[17] S.K. Sardar, S.K. Majumder and D. Mandal, A note on characterization
of prime ideals of Γ-semigroups in terms of fuzzy subsets,Int. J. Contemp.
Math. Sciences, 4(30)(2009) 1465 -1472.
[18] S.K. Sardar and S.K. Majumder, A note on characterization of
semiprime ideals of Γ-semigroups in terms of fuzzy subsets, International
Journal of Pure and Applied Mathematics, 3(56)(2009)451-457.
[19] S.K. Sardar, B. Davvaz and S.K. Majumder, A study on fuzzy
interior ideals of Γ-semigroups,Computers and Mathematics with
applications(Elsevier),60 (2010) 90-94.
[20] S.K. Sardar, B. Davvaz, S.K. Majumder and S. Kayal,
(╬▒, β)-fuzzy subsemigroup and (╬▒, β)-fuzzy bi-ideal in Γ-
semigroups,(Communicated).
[21] M.K. Sen and S. Chattopadhyay, Semidirect product of a monoid and
a Γ-semigroup, East-West J. Math. 6 (2004) 131-138.
[22] M.K. Sen and N.K. Saha, Orthodox Γ-semigroups, Internat. J. Math.
Math. Sci., 13 (1990) 527-534.
[23] M.K. Sen and N.K. Saha, On Γ-semigroup I, Bull. Cal. Math. Soc. 78
(1986) 180-186.
[24] A. Seth, Γ-group congruences on regular Γ-semigroups, Internat. J.
Math. Math. Sci. 15 (1992)103-106.
[25] Y. Yunqiang and D. Xu, The (Ôêê,Ôêê Ôê¿q)-fuzzy subsemigroups and ideals
of an (Ôêê,Ôêê Ôê¿q)-fuzzy semigroup, Southeast Asian Bull. of math. 33
(2009)391-400.
[26] L.A. Zadeh, Fuzzy Sets, Information and Control, 8 (1965) 338-353.
@article{"International Journal of Engineering, Mathematical and Physical Sciences:58124", author = "S.K.Sardar and B.Davvaz and S.Kayal and S.K.Majumdar", title = "A Note on Characterization of Regular Γ-Semigroups in terms of (∈,∈ ∨q)-Fuzzy Bi-ideal", abstract = "The purpose of this note is to obtain some properties of
(∈,∈ ∨q)- fuzzy bi-ideals in a Γ-semigroup in order to characterize
regular and intra-regular Γ-semigroups.", keywords = "Regular Γ-semigroup, belong to or quasi-coincident,
(∈,∈ ∨q)-fuzzy subsemigroup, (∈,∈ ∨q)-fuzzy bi-ideals.", volume = "5", number = "4", pages = "617-4", }
