Leiden University Scholarly Publications

Ding, C.; Jeu, M. de (2023)

Direct limits in categories of normed vector lattices and Banach lattices

Article / Letter to editor

After collecting a number of results on interval and almost interval preserving lin-
ear maps and vector lattice homomorphisms, we show that direct systems in various
categories of normed vector lattices and Banach lattices have direct limits, and that
these coincide with direct limits of the systems in naturally associated other cate-
gories. For those categories where the general constructions do not work to establish
the existence of general direct limits, we describe the basic structure of those direct
limits that do exist. A direct system in the category of Banach lattices and contractive
almost interval preserving vector lattice homomorphisms has a direct limit. When
the Banach lattices in the system all have order continuous norms, then so does the
Banach lattice in a direct limit. This is used to show that a Banach function space over
a locally compact Hausdorff space has an order continuous norm when the topologies
on all compact subsets...Show moreAfter collecting a number of results on interval and almost interval preserving lin-
ear maps and vector lattice homomorphisms, we show that direct systems in various
categories of normed vector lattices and Banach lattices have direct limits, and that
these coincide with direct limits of the systems in naturally associated other cate-
gories. For those categories where the general constructions do not work to establish
the existence of general direct limits, we describe the basic structure of those direct
limits that do exist. A direct system in the category of Banach lattices and contractive
almost interval preserving vector lattice homomorphisms has a direct limit. When
the Banach lattices in the system all have order continuous norms, then so does the
Banach lattice in a direct limit. This is used to show that a Banach function space over
a locally compact Hausdorff space has an order continuous norm when the topologies
on all compact subsets are metrisable and (the images of) the continuous compactly
supported functions are dense.
Show less

Vector lattice

Normed vector lattice

Banach lattice

Direct limit

Inductive limit

(Almost) interval preserving map

Order continuous norm

All authors

Ding, C.; Jeu, M. de

Date

2023-05-20

Journal

Positivity

Volume

27

DOI

doi:10.1007/s11117-023-00992-8