Jordan embeddings and linear rank preservers of structural matrix algebras

Abstract

We consider subalgebras A of the algebra Mn of n × n complex matrices that contain all diagonal matrices, known in the literature as the structural matrix algebras (SMAs). Let A ⊂eq Mn be an arbitrary SMA. We first show that any commuting family of diagonalizable matrices in A can be intrinsically simultaneously diagonalized (i.e. the corresponding similarity can be chosen from A). Using this, we then characterize when one SMA Jordan-embeds into another and in that case we describe the form of such Jordan embeddings. As a consequence, we obtain a description of Jordan automorphisms of SMAs, generalizing Coelho's result on their algebra automorphisms. Next, motivated by the results of Marcus-Moyls and Molnar-Semrl, connecting the linear rank-one preservers with Jordan embeddings Mn Mn and Tn Mn (where Tn is the algebra of n × n upper-triangular matrices) respectively, we show that any linear unital rank-one preserver A Mn is necessarily a Jordan embedding. As the converse fails in general, we also provide a necessary and sufficient condition for when it does hold true. Finally, we obtain a complete description of linear rank preservers A Mn, as maps of the form X S(PX + (I-P)Xt)T, for some invertible matrices S,T ∈ Mn and a central idempotent P∈A.