Finitely presented lattice-ordered abelian groups with order-unit
Abstract
Let be an -group (which is short for ``lattice-ordered abelian group''). Baker and Beynon proved that is finitely presented iff it is finitely generated and projective. In the category of {\it unital} -groups---those -groups having a distinguished order-unit ---only the -direction holds in general. Morphisms in are {\it unital -homomorphisms,} i.e., hom\-o\-mor\-phisms that preserve the order-unit and the lattice structure. We show that a unital -group is finitely presented iff it has a basis, i.e., is generated by an abstract Schauder basis over its maximal spectral space. Thus every finitely generated projective unital -group has a basis . As a partial converse, a large class of projectives is constructed from bases satisfying . Without using the Effros-Handelman-Shen theorem, we finally show that the bases of any finitely presented unital -group provide a direct system of simplicial groups with 1-1 positive unital homomorphisms, whose limit is .
Cite
@article{arxiv.1006.4188,
title = {Finitely presented lattice-ordered abelian groups with order-unit},
author = {Leonardo Cabrer and Daniele Mundici},
journal= {arXiv preprint arXiv:1006.4188},
year = {2010}
}