SOME RESULTS ON (σ,τ)-DERIVATION IN PRIME RINGS

Abdul-Ruhman  Hameed; Kassim  Abdul-Hameed

doi:10.24996/ijs.2008.49.1.%g

Authors

Abdul-Ruhman Hameed Department of Mathematics, College of Science, University of Baghdad. Baghdad-Iraq.
Kassim Abdul-Hameed Department of Mathematics, College of Science, University of Baghdad. Baghdad-Iraq.

DOI:

https://doi.org/10.24996/ijs.2008.49.1.%25g

Keywords:

RESULTS, PRIME

Abstract

Let R be a prime ring and d. R→R be a (o,t)-derivation of R. U be a left ideal of R which is semiprime as a ring In this paper we proved that if d is a nonzero endomorphism on Rand d(R)Z(R), then R is commutative, and we show by an example the condition d is an endomorphism on R can not be excluded. Also, we proved the following.

(i) If UacZ(R) (or aUCZ(R)), for aeR), then 20 or R is commutative.

(ii) If d is a nonzero on R such that d(U)ac (R) (or ad(U)Z(R) for a∈Z(R), then either

0-0 or (1)+(U)Z(R).

(iii) If d is a nonzero homomorphism on U such that d(Uja Z(R)(or ad(U)Z(R))

for

GER, then a-0 or a()+(U)(R).