Strong skew commutativity preserving maps on von Neumann algebras
Abstract
Let M be a von Neumann algebra without central summands of type I1. Assume that : M→ M is a surjective map. It is shown that is strong skew commutativity preserving (that is, satisfies (A)(B)-(B)(A)*=AB-BA* for all A,B∈ M) if and only if there exists some self-adjoint element Z in the center of M with Z2=I such that (A)=ZA for all A∈ M. The strong skew commutativity preserving maps on prime involution rings and prime involution algebras are also characterized.
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