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Polynomial near-rings in k indeterminates

Published online by Cambridge University Press:  17 April 2009

Enoch K.S. Lee
Affiliation:
Mathematics Department, Ferris State University, Big Rapids, MI 49307, United States of America, e-mail: [email protected]
Nico J. Groenewald
Affiliation:
Mathematics Department, University of Port Elizabeth, P.O. Box 1600, Port Elizabeth, South Africa, e-mail: [email protected]
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Polynomial near-rings in k-commuting indeterminates are our object of study. We illustrate out work for k = 2, that is, N[x, y] as an extension to N[x], while the case for arbitrarily k follows easily. Our approach is different from the recursive definition N[x][y]. However, it can be shown that N[x, y] is isomorphic to N[x][y]. Several important tools such as the degree, the least degree, et cetera are defined with respect to N[x, y]. We also clarify some notations involved in defining polynomial near-rings.

Type
Research Article
Copyright
Copyright © Australian Mathematical Society 2004

References

[1]Bagley, S.W., Polynomial near-rings, distributor and J2 ideals of generalized centralizer near-rings, (Doctoral Dissertation) (Texas A&M University, Texas, 1993).Google Scholar
[2]Bagley, S.W., ‘Polynomial near-rings: Polynomials with coefficients from a near-ring’, in Nearrings, Nearfields and Loops, (Saad, and Thomsen, , Editors) (Kluwer Academic Publishers, Netherlands, 1997), pp. 179190.CrossRefGoogle Scholar
[3]Farag, M., ‘On the structure of polynomial near-rings, (Doctoral Dissertation) (Texas A&M University, Texas, 1999).Google Scholar
[4]Farag, M., ‘A new generalization of the center of a near-ring with applications of polynomial near-rings’, Comm. Algebra 29 (2001), 23772387.CrossRefGoogle Scholar
[5]Farag, M., ‘Ideals in polynomial near-rings’, Algebra Collo. 9 (2002), 219232.Google Scholar
[6]Lee, E.K.S., ‘Theory of polynomial near-rings’, Comm. Algebra 32 (2004), 16191635.CrossRefGoogle Scholar
[7]Meldrum, J.D.P. and van der Walt, A.P.J., ‘Matrix near-rings’, Arch. Math. 47 (1986), 312319.CrossRefGoogle Scholar
[8]Meyer, J.H., ‘On the near-ring counterpart of the matrix ring isomorphism Mmn(R) ≅ Mn(Mm(R))’, Rocky Mountain J. Math. 27 (1997), 231240.CrossRefGoogle Scholar
[9]Meldrum, J.D.P., Near-rings and their links with groups, Research Notes in Mathematics 134 (Pitman, Marshfield, M.A., 1985).Google Scholar
[10]Pilz, G., Near-rings (North-Holland/American Elsevier, Amsterdam, 1983).Google Scholar