Commuting maps on rank-k matrices

Abstract

Let n≥2 be a natural number. Let Mn(K) be the ring of all n × n matrices over a field K. Fix natural number k satisfying 1<k≤ n. Under a mild technical assumption over K we will show that additive maps G:Mn(K) Mn(K) such that [G(x),x]=0 for every rank-k matrix x∈ Mn(K) are of form λ x + μ(x), where λ∈ Z, μ:Mn(K) Z, and Z stands for the center of Mn(K). Furthermore, we shall see an example that there are additive maps such that [G(x),x]=0 for all rank-1 matrices that are not of the form λ x + μ(x). We will also discuss the m-additive case.