Relative uniform completion of a vector lattice

Abstract

In the paper, we revisit several approaches to the concept of uniform completion Xru of a vector lattice X. We show that many of these approaches yield the same result. In particular, if X is a sublattice of a uniformly complete vector lattice Z then Xru may be viewed as the intersection of all uniformly complete sublattices of Z containing X. Xru may also be constructed via a transfinite process of taking uniform adherences in Z with regulators coming from the previous adherences. If, in addition, X is majorizing in Z then Xru may be viewed as the uniform closure of X in Z. We show that Xru may also be characterized via a universal property: every positive operator from X to a uniformly complete vector lattice extends uniquely to Xru. Moreover, the class of positive operators here may be replaced with several other important classes of operators (e.g., lattice homomorphisms). We also discuss conditions when the uniform adherence of a sublattice equals its uniform closure, and present an example (based on a construction by R.N. Ball and A.W. Hager) where this fails.