Nonsurjective maps between rectangular matrix spaces preserving disjointness, triple products, or norms

Abstract

Let Mm,n be the space of m× n real or complex rectangular matrices. Two matrices A, B ∈ Mm,n are disjoint if A*B = 0n and AB* = 0m. In this paper, a characterization is given for linear maps : Mm,n → Mr,s sending disjoint matrix pairs to disjoint matrix pairs, i.e., A, B ∈ Mm,n are disjoint ensures that (A), (B) ∈ Mr,s are disjoint. More precisely, it is shown that preserves disjointness if and only if is of the form (A) = Upmatrix A Q1 & 0 & 0 0 & At Q2 & 0 0 & 0 & 0 pmatrixV for some unitary matrices U ∈ Mr,r and V∈ Ms,s, and positive diagonal matrices Q1, Q2, where Q1 or Q2 may be vacuous. The result is used to characterize nonsurjective linear maps that preserve the JB*-triple product, or just the zero triple product, on rectangular matrices, defined by \A,B,C\ = 12(AB*C+CB*A). The result is also applied to characterize linear maps between rectangular matrix spaces of different sizes preserving the Schatten p-norms or the Ky Fan k-norms.