Title of article :
On Right (σ,τ)- Derivation of Prime Rings
Author/Authors :
Majeed, A. H. University of Baghdad - College of Science - Department of Mathematics, Iraq , Hamdi, Asawer D. University of Baghdad - College of Science - Department of Mathematics, Iraq
Abstract :
Let R be a prime ring and δ a right (σ,τ)-derivation on R. In the present paper we will prove the following results: First, suppose that R is a prime ring and I a non-zero ideal of R if δ acts as a homomorphism on I then δ=0 on R, and if δ acts an anti- homomorphism on I then either δ=0 on R or R is commutative. Second, suppose that R is 2-torsion-free prime ring and J a non-zero Jordan ideal and a subring of R, if δ acts as a homomorphism on J then δ=0 on J, and if δ acts an anti- homomorphism on J then either δ=0 on J or J subseteq Z(R).
Keywords :
prime rings , (σ , τ) , derivations , right (σ , τ) , derivations.
Journal title :
Iraqi Journal Of Science
Journal title :
Iraqi Journal Of Science
