Finitely presented lattice-ordered abelian groups with order-unit

Abstract

Let G be an -group (which is short for ``lattice-ordered abelian group''). Baker and Beynon proved that G is finitely presented iff it is finitely generated and projective. In the category U of unital -groups---those -groups having a distinguished order-unit u---only the ()-direction holds in general. Morphisms in U are unital -homomorphisms, i.e., hom\-o\-mor\-phisms that preserve the order-unit and the lattice structure. We show that a unital -group (G,u) is finitely presented iff it has a basis, i.e., G is generated by an abstract Schauder basis over its maximal spectral space. Thus every finitely generated projective unital -group has a basis B. As a partial converse, a large class of projectives is constructed from bases satisfying B=0. Without using the Effros-Handelman-Shen theorem, we finally show that the bases of any finitely presented unital -group (G,u) provide a direct system of simplicial groups with 1-1 positive unital homomorphisms, whose limit is (G,u).