Strong 3-Commutativity Preserving Maps on Standard Operator Algebras

Abstract

Let X be a Banach space of dimension ≥ 2 over the real or complex field F and A a standard operator algebra in B(X). A map : A → A is said to be strong 3-commutativity preserving if [(A),(B)]3 = [A,B]3 for all A, B∈ A, where [A,B]3 is the 3-commutator of A,B defined by [A,B]3=[[[A,B],B],B]. The main result in this paper is shown that, if is a surjective map on A, then is strong 3-commutativity preserving if and only if there exist a functional h : A → F and a scalar λ ∈ F with λ4 = 1 such that (A) = λ A + h(A)I for all A ∈ A.