The continuous \(d\)-open homomorphism images and subgroups of \(\mathbb{R} \)-factorizable paratopological groups
From MaRDI portal
Publication:2049857
DOI10.1016/J.TOPOL.2021.107627zbMath1479.54064arXiv1905.09577OpenAlexW3127522679MaRDI QIDQ2049857
Publication date: 27 August 2021
Published in: Topology and its Applications (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1905.09577
Hyperspaces in general topology (54B20) Topological groups (topological aspects) (54H11) Noncompact covering properties (paracompact, Lindelöf, etc.) (54D20)
Related Items (3)
On \(bM\)-\(\omega\)-balancedness and \(\mathcal{M}\)-factorizability of para(semi)topological groups ⋮ A countably cellular topological group all of whose countable subsets are closed need not be $\mathbb{R}$-factorizable ⋮ The fineness index of topological groups and \(\mathcal{M}\)-factorizable groups
Cites Work
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Axioms of separation in semitopological groups and related functors
- Cardinal invariants and \(\mathbb R\)-factorizability in paratopological groups
- Factorization properties of paratopological groups
- Factorization theorems for topological groups and their applications
- Embedding paratopological groups into topological products
- Paratopological groups. II
- \(\mathbb R\)-factorizable groups and subgroups of Lindelöf \(P\)-groups.
- \(\mathbb{R}\)-factorizable, simply \(sm\)-factorizable paratopological groups and their quotients
- \(\mathbb R\)-factorizable paratopological groups
- A note on bounded sets and \(C\)-compact sets in paratopological groups
- Totally Lindelöf and totally \(\omega \)-narrow paratopological groups
- Pseudocompactness and uniform continuity in topological groups
- Each regular paratopological group is completely regular
- Cardinal invariants of paratopological groups
This page was built for publication: The continuous \(d\)-open homomorphism images and subgroups of \(\mathbb{R} \)-factorizable paratopological groups
