Characterization of Riesz spaces with topologically full center

Abstract

Let E be a Riesz space and let E denote its order dual. The orthomorphisms Orth(E) on E, and the ideal center Z(E) of E, are naturally embedded in Orth(E) and Z(E) respectively. We construct two unital algebra and order continuous Riesz homomorphisms \[ γ:((Orth(E)))n→ Orth(E) % \] and \[ m:Z(E)→ Z(E) \] that extend the above mentioned natural inclusions respectively. Then, the range of γ is an order ideal in Orth(E) if and only if m is surjective. Furthermore, m is surjective if and only if E has a topologically full center. (That is, the σ(E,E)-closure of Z(E)x contains the order ideal generated by x for each x∈ E+.) As a consequence, E has a topologically full center Z(E) if and only if Z(E)=π· Z(E) for some idempotent π∈ Z(E).