Nonsurjective zero product preservers between matrix spaces over an arbitrary field

Abstract

A map between matrices is said to be zero product preserving if (A)(B) = 0 whenever AB = 0. In this paper, we give concrete descriptions of an additive/linear zero product preserver : Mn(F) → Mr(F) between matrix algebras of different dimensions over an arbitrary field F. In particular, we show that if is linear and preserves zero products then (A)= Spmatrix R1 A & 0 0 & 0(A)pmatrix S-1, for some invertible matrices R1 in Mk(F), S in Mr(F) and a zero product preserving linear map 0: Mn(F) → Mr-nk(F) into nilpotent matrices. If (In) is invertible, then 0 is vacuous. In general, the structure of 0 could be quite arbitrary, especially when 0( Mn(F)) has trivial multiplication, i.e., 0(X)0(Y) = 0 for all X, Y in Mn(F). We show that if 0(In) = 0 or r-nk n+1, then 0( Mn(F)) indeed has trivial multiplication. More generally, we characterize subspaces V of square matrices satisfying XY = 0 for any X, Y ∈ V. Similar results for double zero product preserving maps are obtained.