The productively Lindelöf property in the remainders of topological spaces
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Publication:5742718
DOI10.3906/mat-1704-104zbMath1424.54057OpenAlexW2884740046MaRDI QIDQ5742718
Publication date: 8 May 2019
Published in: TURKISH JOURNAL OF MATHEMATICS (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.3906/mat-1704-104
compactificationtopological groupremaindercontinuum hypothesisproductively LindelöfOhio completecountable typeČech complete
Noncompact covering properties (paracompact, Lindelöf, etc.) (54D20) Extensions of spaces (compactifications, supercompactifications, completions, etc.) (54D35) Cardinality properties (cardinal functions and inequalities, discrete subsets) (54A25) Remainders in general topology (54D40) Other set-theoretic hypotheses and axioms (03E65)
Cites Work
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- Productively Lindelöf and indestructibly Lindelöf spaces
- Menger remainders of topological groups
- On productively Lindelöf spaces
- Lindelöf spaces which are Menger, Hurewicz, Alster, productive, or \(D\)
- Some properties of compactifications
- More on remainders close to metrizable spaces
- Remainders in compactifications and generalized metrizability properties
- General topology II. Compactness. Homologies of general spaces. Transl. from the Russian by J. M. Lysko
- Combinatorics of open covers. I: Ramsey theory
- Remainders of rectifiable spaces
- Spaces of continuous functions over a \(\Psi\)-space
- A \(C_p\)-theory problem book. Topological and function spaces
- Nonnormality of remainders of some topological groups
- The Influence of a Small Cardinal on the Product of a Lindelof Space and the Irrationals
- A study of remainders of topological groups
- Construction of a Hurewicz metric space whose square is not a Hurewicz space
- On the class of all spaces of weight not greater than ω_1 whose Cartesian product with every Lindelöf space is Lindelöf
- Some of the combinatorics related to Michael’s problem
- Remainders of Locally Cech-complete Spaces and Homogeneity
- Σ-spaces
- On a class of spaces containing all metric spaces and all locally bicompact spaces
- On Countably Paracompact Spaces
