Square closed pointed vector lattices

Abstract

Given an Archimedean vector lattice E, we present one elementary property of E which is equivalent to the entire traditional list of axioms which makes E a -algebra. We call a vector lattice with this property ``square closed". More generally, we then introduce the notion of a pseudo square closed vector lattice and prove that an Archimedean vector lattice is a semiprime f-algebra if and only if it is pseudo square closed. This theory serves as an efficient tool for determining whether or not an Archimedean vector lattice is a -algebra (or a semiprime f-algebra). To illustrate this point, we generalize a well-known result for uniformly complete Archimedean vector lattices with a strong order unit by proving that every functionally complete Archimedean vector lattice with a strong order unit is a -algebra.

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