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Rings and groups with commuting powers

Author

Listed:
  • Hazar Abu-Khuzam
  • Adil Yaqub

Abstract

Let n be a fixed positive integer. Let R be a ring with identity which satisfies (i) x n y n = y n x n for all x , y in R , and (ii) for x , y in R , there exists a positive integer k = k ( x , y ) depending on x and y such that x k y k = y k x k and ( n , k ) = 1 . Then R is commutative. This result also holds for a group G . It is further shown that R and G need not be commutative if any of the above conditions is dropped.

Suggested Citation

  • Hazar Abu-Khuzam & Adil Yaqub, 1981. "Rings and groups with commuting powers," International Journal of Mathematics and Mathematical Sciences, Hindawi, vol. 4, pages 1-7, January.
  • Handle: RePEc:hin:jijmms:427649
    DOI: 10.1155/S0161171281000069
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