Limits of vector lattices
Abstract
If is a compact Hausdorff space so that the Banach lattice is isometrically lattice isomorphic to a dual of some Banach lattice, then can be decomposed as the -direct sum of the carriers of a maximal singular family of order continuous functionals on . In order to generalise this result to the vector lattice of continuous, real valued functions on a realcompact space , we consider direct and inverse limits in suitable categories of vector lattices. We develop a duality theory for such limits and apply this theory to show that is lattice isomorphic to the order dual of some vector lattice if and only if can be decomposed as the inverse limit of the carriers of all order continuous functionals on . In fact, we obtain a more general result: A Dedekind complete vector lattice is perfect if and only if it is lattice isomorphic to the inverse limit of the carriers of a suitable family of order continuous functionals on . A number of other applications are presented, including a decomposition theorem for order dual spaces in terms of spaces of Radon measures.
Cite
@article{arxiv.2207.05459,
title = {Limits of vector lattices},
author = {Walt van Amstel and Jan Harm van der Walt},
journal= {arXiv preprint arXiv:2207.05459},
year = {2023}
}