Volume 1, Issue 2, December 2017, pp 15-21
1R. Perumal, 1R. Arulprakasam and 1M. Radhakrishnan
1Department of Mathematics, SRM Institute of Science and Technology, Tamilnadu-603203, India
The aim of this paper is to introduce the concept of normal (left normal and right normal) seminear-rings. Moreover some related properties of those are investigated. We also characterize such seminear-rings under certain conditions.
Left (Right) normal seminear-ring, Regular seminear-ring, Idempotent and Nilpotent.
1. Balakrishnan R. and Perumal R., Left Duo Seminear-rings, Scientia Magna, 8(3), 115 -120, (2012).
2. Booth G. L. and Groenewald N. J., On strongly prime near-rings, Indian Journal of Mathematics, 40(2), 113 - 121, (1998).
3. Jat J.L. and Choudary S.C., On left bipotent near-rings, Proc. Edin. Math. Soc., 22, 99 - 107, (1979)
4. Javed AHSAN, Seminear-rings Characterized by their s-ideals. I Proc. Japan Acad, 71(A), 101 - 103,(1995).
5. Javed AHSAN, Seminear-rings Characterized by their s-ideals. II Proc. Japan Acad, 71(A), 111 -113, (1995).
6. Neal. H. McCoy, The Theory of rings (1970), MacMillan and Co. R. Vaidyanathaswamy. The localization theory in set topology. Proc. Indian Acad. Sci., 1945, 20: 51 - 61
7. Pellegrini Manara S., On regular medial near-rings,Boll. Unione Mat. Ital., VI Ser., D, Algebra Geom, 6(1985), 131 - 136.
8. Pellegrini Manara S., On medial near-rings, Near-Rings and Near fields, Amsterdam, North Holland, 199 - 210, (1987).
9. Perumal R., Balakrishnan R. and Uma S., Some Special Seminear-ring Structures, Ultra Scientist of Physical Sciences., 23(2), 427 - 436, (2011).
10. Perumal R., Balakrishnan R. and Uma S., Some Special Seminear-ring Structures II, Ultra Scientist of Physical Sciences., 24(1), 91 - 98, (2012).
11. Perumal R. and Balakrishnan R., Left Bipotent Seminear-rings , International Journal of Algebra, 6(26), 1289 -1295, (2012).
12. Perumal R. and Chinnaraj. P., Medial Left Bipotent Seminear-Rings, Springer Proceedings in Mathematics & Statistics., 139, 451-457, (2015).
13. Perumal R. and Chinnaraj. P., Ideals in P(r,m) Seminear-Rings, International Journal of Pure and Applied Mathematics., 106(2), 533-541, (2016).
14. Pilz Günter, Near-Rings, North Holland (1983), Amsterdam.
15. Shabir. M and Ahamed. I, Weakly Regular Seminearrings International Electronic Journal of Algebra,2(2007), 114 - 126.
16. Weinert H.J., Seminear-rings, Seminearfield and their Semigroup Theoretical Background, Semigroup Forum, 24, 231 - 254, (1982).
17. Willy G. van Hoorn and van Rootselaar R., Fundamental notions in the theory of Seminearrings, Compositio Math, 18, 65 - 78, (1967).
18. Weinert H.J., Related Representation theorems for Rings, Semi-rings, Near-rings and Seminear-rings by Partial Transformations and Partial Endomorphisms, Proceedings of the Edinburgh Mathematical Society, 20, 307 - 315, (1976-77).
