When each continuous operator is regular, II
Abstract
The following theorem is essentially due to L.~Kantorovich and B. Vulikh and it describes one of the most important classes of Banach lattices between which each continuous operator is regular. {\bf Theorem 1.1.} {\sl Let be an arbitrary L-space and be an arbitrary Banach lattice with Levi norm. Then that is, every continuous operator from to is regular.} In spite of the importance of this theorem it has not yet been determined to what extent the Levi condition is essential for the validity of equality . Our main aim in this work is to prove a converse to this theorem by showing that for a Dedekind complete the Levi condition is necessary for the validity of . As a sample of other results we mention the following. {\bf Theorem~3.6.} {\sl For a Banach lattice the following are equivalent: {\rm (a)} is Dedekind complete; {\rm (b)} For all Banach lattices , the space is a Dedekind complete vector lattice; {\rm (c)} For all L-spaces , the space is a vector lattice.}
Cite
@article{arxiv.math/9606210,
title = {When each continuous operator is regular, II},
author = {Yuri A. Abramovich and Anthony W. Wickstead},
journal= {arXiv preprint arXiv:math/9606210},
year = {2016}
}