Fuzzy radicals and prime fuzzy ideals of ordered semigroups

Let S be an ordered semigroup. A fuzzy subset of S is, by definition, an arbitrary mapping f: S->[0,1], where [0,1] is the usual interval of real numbers. Motivated by studying prime fuzzy ideals in rings, semigroups and ordered semigroups, and as a continuation of Kehayopulu and Tsingelis's works in ordered semigroups in terms of fuzzy subsets, in this paper we introduce the notion of ordered fuzzy points of an ordered semigroup S, and give a characterization of prime fuzzy ideals of an ordered semigroup S. We also introduce the concepts of weakly prime fuzzy ideals, completely prime fuzzy ideals, completely semiprime fuzzy ideals and weakly completely prime fuzzy ideals of an ordered semigroup S, and establish the relationship between the five classes of ideals. Furthermore, we characterize weakly prime fuzzy ideals, completely semiprime fuzzy ideals and weakly completely prime fuzzy ideals of S by their level ideals. Finally, we introduce and investigate the fuzzy radicals of ordered semigroups by means of ordered fuzzy points, and prove that the fuzzy radical of every completely semiprime fuzzy ideal of an ordered semigroup S can be expressed as the intersection of all weakly completely prime fuzzy ideals containing it. As an application of the results of this paper, the corresponding results of semigroups (without order) are also obtained.

[1]  Zhiwen Mo,et al.  On pointwise depiction of fuzzy regularity of semigroups , 1993, Inf. Sci..

[2]  N. Kehayopulu On prime, weakly prime ideals in ordered semigroups , 1992 .

[3]  Manoj K. Kantroo,et al.  The nil radical of a fuzzy ideal , 1993 .

[4]  Michiro Kondo,et al.  On the structure of generalized rough sets , 2006, Inf. Sci..

[5]  Jianming Zhan,et al.  Fuzzy h-ideals of hemirings , 2007, Inf. Sci..

[6]  Vilém Vychodil,et al.  Algebras with fuzzy equalities , 2006, Fuzzy Sets Syst..

[7]  Y B Jun,et al.  ROUGHNESS OF GAMMASUBSEMI GROUPS/IDEALS IN GAMMA-SEMIGROUPS , 2003 .

[8]  Young Bae Jun,et al.  Intuitionistic fuzzy Hv-submodules , 2006, Inf. Sci..

[9]  Wang-jin Liu,et al.  Fuzzy invariant subgroups and fuzzy ideals , 1982 .

[10]  Huaguang Zhang,et al.  Two new operators in rough set theory with applications to fuzzy sets , 2004, Inf. Sci..

[11]  Bijan Davvaz,et al.  Roughness in rings , 2004, Inf. Sci..

[12]  Zhudeng Wang TL-filters of integral residuated l-monoids , 2007, Inf. Sci..

[13]  Niovi Kehayopulu,et al.  Fuzzy bi-ideals in ordered semigroups , 2005, Inf. Sci..

[14]  Zhang Yue,et al.  Prime L -fuzzy ideals and primary L -fuzzy ideals , 1988 .

[15]  Lotfi A. Zadeh,et al.  Fuzzy Sets , 1996, Inf. Control..

[16]  Bijan Davvaz,et al.  Roughness based on fuzzy ideals , 2006, Inf. Sci..

[17]  N. Kuroki Fuzzy bi-ideals in semigroups , 1980 .

[18]  Niovi Kehayopulu,et al.  Regular ordered semigroups in terms of fuzzy subsets , 2006, Inf. Sci..

[19]  M. K. Sen,et al.  Prime fuzzy ideals in rings , 1989 .

[20]  Ali Jaballah,et al.  Existence and uniqueness of fuzzy ideals , 2005, Fuzzy Sets Syst..

[21]  Nobuaki Kuroki,et al.  On fuzzy semigroups , 1991, Inf. Sci..

[22]  Niovi Kehayopulu,et al.  The embedding of an ordered groupoid into a poe-groupoid in terms of fuzzy sets , 2003, Inf. Sci..

[23]  Nobuaki Kuroki,et al.  Fuzzy generalized Bi-ideals in semigroups , 1992, Inf. Sci..

[24]  Azriel Rosenfeld,et al.  Fuzzy Group Theory , 2005, Studies in Fuzziness and Soft Computing.

[25]  D. Dubois,et al.  ROUGH FUZZY SETS AND FUZZY ROUGH SETS , 1990 .

[26]  Wang Xue-ping,et al.  Fuzzy regular subsemigroups in semigroups , 1993 .

[27]  N. Kehayopulu On weakly prime ideals of ordered semigroups , 1990 .

[28]  Young Bae Jun,et al.  Generalized fuzzy interior ideals in semigroups , 2006, Inf. Sci..

[29]  N. Kehayopulu,et al.  Fuzzy sets in ordered groupoids , 2002 .

[30]  U. M. Swamy,et al.  Fuzzy prime ideals of rings , 1988 .

[31]  Jerzy W. Grzymala-Busse,et al.  Rough Sets , 1995, Commun. ACM.

[32]  Zheng Pei,et al.  On the topological properties of fuzzy rough sets , 2005, Fuzzy Sets Syst..

[33]  M. K. Sen,et al.  On fuzzy ideals of a ring 1 , 1987 .

[34]  Jie Meng,et al.  On fuzzy ideals in BCK/BCI-algebras , 2005, Fuzzy Sets Syst..

[35]  Wang Xue-ping,et al.  Fuzzy ideals generated by fuzzy sets in semigroups , 1995 .

[36]  Nobuaki Kuroki,et al.  Rough Ideals in Semigroups , 1997, Inf. Sci..

[37]  Paul P. Wang,et al.  Comment on “The lower and upper approximations in a fuzzy group” , 1996, 2009 International Conference on Machine Learning and Cybernetics.

[38]  Degang Chen,et al.  Some notes on equivalent fuzzy sets and fuzzy subgroups , 2005, Fuzzy Sets Syst..

[39]  Malaysian Mathematical,et al.  Fuzzy Prime Ideals in -rings , 2007 .

[40]  John N. Mordeson,et al.  Fuzzy Semigroups , 2003, Studies in Fuzziness and Soft Computing.

[41]  Bijan Davvaz,et al.  Redefined fuzzy Hv-submodules and many valued implications , 2007, Inf. Sci..

[42]  Rajesh Kumar,et al.  Certain fuzzy ideals of rings redefined , 1992 .

[43]  Niovi Kehayopulu,et al.  GREEN'S RELATIONS IN ORDERED GROUPOIDS IN TERMS OF FUZZY SUBSETS , 2007 .

[44]  Qi-Mei Xiao,et al.  Rough prime ideals and rough fuzzy prime ideals in semigroups , 2006, Inf. Sci..

[45]  N. Kuroki Fuzzy semiprime ideals in semigroups , 1982 .

[46]  J. Bae ROUGHNESS OF IDEALS IN BCK-ALGEBRAS , 2003 .

[47]  Salah Abou-Zaid On fuzzy subnear-rings and ideals , 1991 .

[48]  John N. Mordeson,et al.  Fuzzy prime ideals of a ring , 1990 .