Ultrafilter selection and Corson compacta
Logic
2022-11-17 v2 General Topology
Abstract
We study the question which Boolean algebras have the property that for every generating set there is an ultrafilter selecting maximal number of its elements. We call it the ultrafilter selection property. For cardinality aleph-one the property is equivalent to the fact that the space of ultrafilters is not Corson compact. We also consider the pointwise topology on a Boolean algebra, proving a result on the Lindel\"of number in the context of the ultrafilter selection property. Finally, we discuss poset Boolean algebras, interval algebras, and semilattices in the context of ultrafilter selection properties.
Keywords
Cite
@article{arxiv.2104.09633,
title = {Ultrafilter selection and Corson compacta},
author = {Robert Bonnet and Wieslaw Kubiś and Stevo Todorčević},
journal= {arXiv preprint arXiv:2104.09633},
year = {2022}
}
Comments
Some corrections and clarifications, 33 pages