A characterization of reflexive spaces of operators

Abstract

We show that for a linear space of operators M⊂eq B(H1,H2) the following assertions are equivalent. (i) M is reflexive in the sense of Loginov--Shulman. (ii) There exists an order-preserving map =(1,2) on a bilattice Bil( M) of subspaces determined by M, with P≤ 1(P,Q) and Q≤ 2(P,Q), for any pair (P,Q)∈ Bil( M), and such that an operator T∈ B(H1,H2) lies in M if and only if 2(P,Q)T1(P,Q)=0 for all (P,Q)∈ Bil( M). This extends to reflexive spaces the Erdos--Power type characterization of weakly closed bimodules over a nest algebra.