Nonlinear -Jordan-Type Derivations on von Neumann Algebras

Abstract

Let H be a complex Hilbert space, B(H) be the algebra of all bounded linear operators on H and A ⊂eq B(H) be a von Neumann algebra without central summands of type I1. For arbitrary elements A, B∈ A, one can define their -Jordan product in the sense of A B = AB+BA. Let pn(x1,x2,·s,xn) be the polynomial defined by n indeterminates x1, ·s, xn and their -Jordan products. In this article, it is shown that a mapping δ: A B(H) satisfies the condition δ(pn(A1, A2,·s, An))=Σk=1n pn(A1,·s, Ak-1, δ(Ak), Ak+1,·s, An) for all A1, A2,·s, An ∈ A if and only if δ is an additive -derivation.