Comparison of Jordan (sigma,tau)- Derivations and Jordan Triple (sigma,tau)- Derivations in Semiprime Rings

Let R be a 3!-torsion free semiprime ring, τ, σ two endomorphisms of R, d:R→R an  additive mapping and L be a noncentral square-closed Lie ideal of R . An additive mapping  d:R→R is said to be a Jordan (σ,τ)-derivation if d(x²)=d(x)σ(x)+τ(x)d(x) holds for all x,y∈R.  Also, d is called a Jordan triple (σ,τ)-derivation if d(xyx)=d(x)σ(yx)+τ(x)d(y)σ(x)+τ(xy)d(x),  for all x,y∈R. In this paper, we proved the following result: d is a Jordan (σ,τ)-derivation if  and only if d is a Jordan triple (σ,τ)-derivation.