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Main Authors: Giacopello, Davide, Bonanzinga, Maddalena, Szewczak, Piotr
Format: Preprint
Published: 2025
Subjects:
Online Access:https://arxiv.org/abs/2511.10252
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author Giacopello, Davide
Bonanzinga, Maddalena
Szewczak, Piotr
author_facet Giacopello, Davide
Bonanzinga, Maddalena
Szewczak, Piotr
contents A topological space is totally paracompact if any base of this space contains a locally finite subcover. We focus on a problem of Curtis whether in the class of regular Lindelöf spaces total paracompactness is equivalent to the Menger covering property. To this end we consider topological spaces with certain dense subsets. It follows from our results that the above equivalence holds in the class of Lindelöf GO-spaces defined on subsets of reals. We also provide a game-theoretical proof that any regular Menger space is totally paracompact and show that in the class of first-countable spaces the Menger game and a partial open neighborhood assignment game of Aurichi are equivalent. We also show that if $\mathfrak{b}=ω_1$, then there is an uncountable subspace of the Sorgenfrey line whose all finite powers are Lindelöf, which is a strengthening of a famous result due to Michael.
format Preprint
id arxiv_https___arxiv_org_abs_2511_10252
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle Totally paracompact spaces and the Menger covering property
Giacopello, Davide
Bonanzinga, Maddalena
Szewczak, Piotr
General Topology
54D20
A topological space is totally paracompact if any base of this space contains a locally finite subcover. We focus on a problem of Curtis whether in the class of regular Lindelöf spaces total paracompactness is equivalent to the Menger covering property. To this end we consider topological spaces with certain dense subsets. It follows from our results that the above equivalence holds in the class of Lindelöf GO-spaces defined on subsets of reals. We also provide a game-theoretical proof that any regular Menger space is totally paracompact and show that in the class of first-countable spaces the Menger game and a partial open neighborhood assignment game of Aurichi are equivalent. We also show that if $\mathfrak{b}=ω_1$, then there is an uncountable subspace of the Sorgenfrey line whose all finite powers are Lindelöf, which is a strengthening of a famous result due to Michael.
title Totally paracompact spaces and the Menger covering property
topic General Topology
54D20
url https://arxiv.org/abs/2511.10252