Strong k-commutativity preserving maps on 2×2 matrices

Abstract

Let M2( F) be the algebra of 2×2 matrices over the real or complex field F. For a given positive integer k≥ 1, the k-commutator of A and B is defined by [A,B]k=[[A,B]k-1,B] with [A,B]0=A and [A,B]1=[A,B]=AB-BA. The main result is shown that a map : M2( F) M2( F) with range containing all rank one matrices satisfies that [(A),(B)]k = [A,B]k for all A, B∈ M2( F) if and only if there exist a functional h : M2( F) → F and a scalar λ ∈ F with λk+1 = 1 such that (A) = λ A + h(A)I for all A ∈ M2( F).