Abstract
In this paper, we introduce the concept of medial left bipotent seminear-rings and discuss some of their properties. We have shown that any medial seminear-ring with mate functions is a medial left bipotent seminear-ring. We also obtain a characterization of such a seminear-ring.
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References
Ahsan, J.: Seminear-rings characterized by their s-ideals. II. Proc. Jpn. Acad. 71(A), 111–113 (1995)
Ahsan, J.: Seminear-rings characterized by their s-ideals. I. Proc. Jpn. Acad. 71(A), 101–103 (1995)
Balakrishnan, R., Perumal, R.: Left Duo Seminear-rings. Sci. Magna 8(3), 115–120 (2012)
Booth, G.L., Groenewald, N.J.: On strongly prime near-rings. Indian J. Math. 40(2), 113–121 (1998)
Jat, J.L., Choudary, S.C.: On left bipotent near-rings. Proc. Edin. Math. Soc. 22, 99–107 (1979)
Park, Y.S., Kim, W.J.: On structures of left bipotent near-rings. Kyungbook Math. J. 20(2), 177–181 (1980)
Pellegrini Manara, S.: On medial near-rings, near-rings and near fields, Amsterdam, pp. 199–210 (1987)
Pellegrini Manara, S.: On regular medial near-rings. Boll. Unione Mat. Ital. VI Ser. D Algebra Geom. 6, 131–136 (1985)
Perumal, R., Balakrishnan, R., Uma, S.: Some special seminear-ring structures. Ultra Sci. Phys. Sci. 23(2), 427–436 (2011)
Perumal, R., Balakrishnan, R., Uma, S.: Some special seminear-ring structures II. Ultra Sci. Phy. Sci. 24(1), 91–98 (2012)
Perumal, R., Balakrishnan, R.: Left bipotent seminear-rings. Int. J. Algebra 6(26), 1289–1295 (2012)
Pilz Günter, Near-rings, North Holland, Amsterdam (1983)
Shabir, M., Ahamed, I.: Weakly regular seminearrings. Int. Electr. J. Algebra 2, 114–126 (2007)
van Willy, G., Hoorn, G., van Rootselaar, R.: Fundamental notions in the theory of seminearrings. Compos. Math. 18, 65–78 (1967)
Weinert, H.J.: seminear-rings. seminearfield and their semigroup theoretical background. Semigroup Forum 24, 231–254 (1982)
Weinert H.J.: Related representation theorems for rings, semi-rings, near-rings and seminear-rings by partial transformations and partial endomorphisms. Proc. Edinburgh Math. Soc. 20, 307–315 (1976–77)
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Perumal, R., Chinnaraj, P. (2015). Medial Left Bipotent Seminear-Rings. In: Mohapatra, R., Chowdhury, D., Giri, D. (eds) Mathematics and Computing. Springer Proceedings in Mathematics & Statistics, vol 139. Springer, New Delhi. https://doi.org/10.1007/978-81-322-2452-5_31
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DOI: https://doi.org/10.1007/978-81-322-2452-5_31
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Online ISBN: 978-81-322-2452-5
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