On subspaces whose weak* derived sets are proper and norm dense
Functional Analysis
2024-08-05 v1
Abstract
We study long chains of iterated weak* derived sets, that is sets of all weak* limits of bounded nets, of subspaces with the additional property that the penultimate weak* derived set is a proper norm dense subspace of the dual. We extend the result of Ostrovskii and show, that in the dual of any non-quasi-reflexive Banach space containing an infinite-dimensional subspace with separable dual, we can find for any countable successor ordinal {\alpha} a subspace, whose weak* derived set of order {\alpha} is proper and norm dense.
Cite
@article{arxiv.2203.00288,
title = {On subspaces whose weak* derived sets are proper and norm dense},
author = {Zdeněk Silber},
journal= {arXiv preprint arXiv:2203.00288},
year = {2024}
}