Some differential identities in prime $gamma$ rings

Mohammad Ashraf; Malik Rashid Jamal

doi:10.5269/bspm.v32i1.13457

Authors

Mohammad Ashraf Aligarh Muslim University Department of mathematics
Malik Rashid Jamal Aligarh Muslim University Department of mathematics

DOI:

https://doi.org/10.5269/bspm.v32i1.13457

Keywords:

$gamma$ rings, prime $gamma$ rings, derivations, ideals, commutativity

Abstract

Let $M$ be a prime $\Gamma$-ring and $U$ be a nonzero ideal of $M$.
An additive mapping $d:M\longrightarrow M,$ where $M$ is a $\Gamma$-ring, is called a derivation if for any $a,b\in M$ and$\alpha \in \Gamma$, $d(a\alpha b)=d(a)\alpha b+a\alpha d(b)$. In this paper, we investigate the commutativity of prime $\Gamma$-ring satisfying certain differential identities.