Bell, Howard E.; Mason, Gordon On derivations in near-rings and rings. (English) Zbl 0810.16042 Math. J. Okayama Univ. 34, 135-144 (1992). In a near-ring \(R\) a derivation \(D\) is called an scp-derivation if \([x,y] = [D(x), D(y)]\), a Daif 1(2)-derivation if \(D(xy) - D(yx) = [x, y] (=[-x, y])\) (\(\forall x, y \in R\)). Various commutativity (and distributivity) results linked to such derivations are given: e.g. if \(R\) is a prime ring having a nonzero right ideal \(U\) and a derivation \(D\) such that \(\forall x,y \in U\) \([x, y] = [D(x), D(y)]\) then \(R\) is commutative. Reviewer: C.Cotti-Ferrero (Parma) Cited in 7 ReviewsCited in 27 Documents MSC: 16Y30 Near-rings 16W25 Derivations, actions of Lie algebras 16U70 Center, normalizer (invariant elements) (associative rings and algebras) 16U80 Generalizations of commutativity (associative rings and algebras) 16N60 Prime and semiprime associative rings Keywords:scp-derivation; Daif 1(2)-derivation; commutativity; distributivity; derivations; prime ring × Cite Format Result Cite Review PDF