Lie n-centralizers of von Neumann algebras

Abstract

Let be a von Neumann algebra with a projection P∈ . For any A1,A2,…,An∈, define p1(A1)=A1, pn (A1,A2,…,An)=[pn-1 (A1,A2,…,An-1),An] for all integers n≥ 2, where [A,B]=AB-BA (A,B∈) denotes the usual Lie product. Assume that φ: is an additive mapping satisfying \[φ(pn(A1, A2, …, An)) = pn(φ(A1), A2, …, An) = pn(A1, φ(A2), …, An) \] for all A1, A2, …, An ∈ with A1A2=P In this article, it is shown that the map φ is of the form φ(A)=WA+(A) for all A∈ , where W∈ Z(), and : () (() is the center of ) is an additive map such that (pn(A1, A2, …, An) )=0 for any A1, A2, …, An ∈ with A1A2=P. As an application, we characterize generalized Lie n-derivations on arbitrary von Neumann algebras.

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