On (δ,f)-derivations and Jordan (δ,f)-derivations on modules

Abstract

Let R be a ring with identity, M,N right modules over R. An additive mapping δ from R to R is called derivation on ring R if it satisfies the Leibniz condition. If δ is a derivation on R and f:M → N is a module homomorphism over R, then an additive mapping d:M → N is called a (δ,f)-derivation if it satisfies d(xa)=d(x)a+f(x)δ(a) for all x ∈ M and a ∈ R. An additive mapping δ: R → R is called Jordan derivation on ring R if δ(x2)=δ(x)x+xδ(x) for all x ∈ R, which is the generalization of derivation This paper presents generalization of Posner's First Theorem of (δ,f)-derivation on 2-torsion prime modules. It also provides a generalization of some results in case of 2-torsion free prime modules from ring situation. Moreover, we introduce a Jordan (δ,f)-derivation on modules and prove that every Jordan (δ,f)-derivation on modules is a (δ,f)-derivation on modules.