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Periodic rings with commuting nilpotents

Author

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  • Hazar Abu-Khuzam
  • Adil Yaqub

Abstract

Let R be a ring (not necessarily with identity) and let N denote the set of nilpotent elements of R . Suppose that (i) N is commutative, (ii) for every x in R , there exists a positive integer k = k ( x ) and a polynomial f ( λ ) = f x ( λ ) with integer coefficients such that x k = x k + 1 f ( x ) , (iii) the set I n = { x | x n = x } where n is a fixed integer, n > 1 , is an ideal in R . Then R is a subdirect sum of finite fields of at most n elements and a nil commutative ring. This theorem, generalizes the x n = x theorem of Jacobson, and (taking n = 2 ) also yields the well known structure of a Boolean ring. An Example is given which shows that this theorem need not be true if we merely assume that I n is a subring of R .

Suggested Citation

  • Hazar Abu-Khuzam & Adil Yaqub, 1984. "Periodic rings with commuting nilpotents," International Journal of Mathematics and Mathematical Sciences, Hindawi, vol. 7, pages 1-4, January.
  • Handle: RePEc:hin:jijmms:921648
    DOI: 10.1155/S0161171284000417
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