Free vector lattices over vector spaces as function lattices
Abstract
We show that a free vector lattice over a real vector space can be realised canonically as a vector lattice of real-valued positively homogeneous functions on any linear subspace of its dual space that separates the points of . This is used to give intuition for the known fact that the free Banach lattice over a Banach space can be realised as a Banach lattice of positively homogeneous functions on . It is also applied to improve the well-known result that free vector lattices over non-empty sets can be realised as vector lattices of real-valued functions. For infinite sets, the underlying spaces for such realisations can be chosen to be smaller than the usual ones.
Keywords
Cite
@article{arxiv.2005.01978,
title = {Free vector lattices over vector spaces as function lattices},
author = {Marcel de Jeu},
journal= {arXiv preprint arXiv:2005.01978},
year = {2023}
}
Comments
10 pages; minor modifications; final version. To appear in Birkhauser's Trends in Mathematics series in `Ordered Structures with Applications in Economics and Finance' (M.A. Ben Amor and B.A. Watson, Eds.); proceedings of the online `Conference on Ordered Structures with Applications in Economy and Finance', May 3--7, 2021