East Asian mathematical journal

The Youngnam Mathematical Society (영남수학회)
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SOME RESULTS ON ENDOMORPHISMS OF PRIME RING WHICH ARE $(\sigma,\tau)$-DERIVATION

  • Golbasi, Oznur (Cumhuriyet University Faculty of Arts and Science Department of Mathematics, TURKEY) ;
  • Aydin, Neset (Canakkale 18 Mart University Faculty of Arts and Science Department of Mathematics Canakkale - TURKEY)
  • Published : 2002.12.27
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Abstract

Let R be a prime ring with characteristic not two and U is a nonzero left ideal of R which contains no nonzero nilpotent right ideal as a ring. For a $(\sigma,\tau)$-derivation d : R$\rightarrow$R, we prove the following results: (1) If d is an endomorphism on R then d=0. (2) If d is an anti-endomorphism on R then d=0. (3) If d(xy)=d(yx), for all x, y$\in$R then R is commutative. (4) If d is an homomorphism or anti-homomorphism on U then d=0.

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