English

When each continuous operator is regular, II

Functional Analysis 2016-09-06 v1

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 EE be an arbitrary L-space and FF be an arbitrary Banach lattice with Levi norm. Then L(E,F)=Lr(E,F), (){\cal L}(E,F)={\cal L}^r(E,F),\ (\star) that is, every continuous operator from EE to FF 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 ()(\star). Our main aim in this work is to prove a converse to this theorem by showing that for a Dedekind complete FF the Levi condition is necessary for the validity of ()(\star). As a sample of other results we mention the following. {\bf Theorem~3.6.} {\sl For a Banach lattice FF the following are equivalent: {\rm (a)} FF is Dedekind complete; {\rm (b)} For all Banach lattices EE, the space Lr(E,F){\cal L}^r(E,F) is a Dedekind complete vector lattice; {\rm (c)} For all L-spaces EE, the space Lr(E,F){\cal L}^r(E,F) 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}
}