Multiplicative derivations on rank-s matrices for relatively small s

Abstract

Let n and s be fixed integers such that n≥ 2 and 1≤ s≤ n2. Let Mn(K) be the ring of all n× n matrices over a field K. If a map δ:Mn(K)→ Mn(K) satisfies that δ(xy)=δ(x)y+xδ(y) for any two rank-s matrices x,y∈ Mn(K), then there exists a derivation D of Mn(K) such that δ(x)=D(x) holds for each rank-k matrix x∈ Mn(K) with 0≤ k≤ s.