Linear rank preservers of tensor products of rank one matrices

Abstract

Let n1,…,nk be integers larger than or equal to 2. We characterize linear maps φ: Mn1·s nk→ Mn1·s nk such that rank\,(φ(A1 ·s Ak))=1whenever rank\, (A1 ·s Ak)=1 for all Ai ∈ Mni,\, i = 1,…,k. Applying this result, we extend two recent results on linear maps that preserving the rank of special classes of matrices.