Simply \textit{sm}-factorizable (para)topological groups and their quotients
DOI10.1016/j.topol.2020.107537zbMath1479.22003OpenAlexW3112713102MaRDI QIDQ820694
Li-Hong Xie, Mikhail G. Tkachenko
Publication date: 27 September 2021
Published in: Topology and its Applications (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/j.topol.2020.107537
P-groupweakly Lindelöf(para)topological groupR-factorizablesimply sm-factorizablestrongly submetrizable
Structure of general topological groups (22A05) Topological groups (topological aspects) (54H11) Cardinality properties (cardinal functions and inequalities, discrete subsets) (54A25) Real-valued functions in general topology (54C30) Other topological algebraic systems and their representations (22A30)
Cites Work
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- \(C\)-compact and \(r\)-pseudocompact subsets of paratopological groups
- Axioms of separation in semitopological groups and related functors
- Factorization properties of paratopological groups
- Subgroups of products of paratopological groups
- Axioms of separation in paratopological groups and reflection functors
- Applications of the reflection functors in paratopological groups
- \(C\)-extensions of topological groups
- Feebly compact paratopological groups and real-valued functions
- Topological groups and related structures
- Embedding paratopological groups into topological products
- Paratopological groups. II
- Paratopological groups
- \(\mathbb{R}\)-factorizable, simply \(sm\)-factorizable paratopological groups and their quotients
- Simply \(sm\)-factorizable (para)topological groups and their completions
- \(\mathbb R\)-factorizable paratopological groups
- The separable quotient problem for topological groups
- Completions of paratopological groups and bounded sets
- Lindelöf \(\Sigma\)-spaces and \(\mathbb R\)-factorizable paratopological groups
- Totally Lindelöf and totally \(\omega \)-narrow paratopological groups
- Pseudocompactness and uniform continuity in topological groups
- Group reflection and precompact paratopological groups
- Subgroups of paratopological groups and feebly compact groups
- Each regular paratopological group is completely regular
- Hereditarily Compact Spaces
- Cardinal invariants of paratopological groups
- Oscillator topologies on a paratopological group and related number invariants
- Estimates for the Number of Real-Valued Continuous Functions
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