Let A be a prime ∗-algebra and � preserve ∗-Lie n-tuple derivations on A, that is, for every A1, A2, . . . , An ∈ A, �(A1 � A2 � · · · � An) = �(A1) � A2 � · · · � An + A1 � �(A2) � · · · � An + · · ·+ A1 � A2 � · · · � �(An) where Ai � Aj = Ai Aj − Aj A∗ i for i , j ∈ N, then � is additive. Moreover, if �(i I2 ) is self-adjoint then � is a ∗-derivation. The result is also valid when A is a von Neumann algebra without central abelian projections.
