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- Ultraconnected_space abstract "In mathematics, a topological space is said to be ultraconnected if no pair of nonempty closed sets of is disjoint. Equivalently, a space is ultraconnected if and only if the closures of two disjoint points always have non trivial intersection. Hence, no space with more than 1 point is ultraconnected.All ultraconnected spaces are path-connected (but not necessarily arc connected), normal, limit point compact, and pseudocompact.".
- Ultraconnected_space wikiPageID "8101374".
- Ultraconnected_space wikiPageRevisionID "523008249".
- Ultraconnected_space hasPhotoCollection Ultraconnected_space.
- Ultraconnected_space id "5814".
- Ultraconnected_space title "Ultraconnected space".
- Ultraconnected_space subject Category:Properties_of_topological_spaces.
- Ultraconnected_space type Abstraction100002137.
- Ultraconnected_space type Possession100032613.
- Ultraconnected_space type PropertiesOfTopologicalSpaces.
- Ultraconnected_space type Property113244109.
- Ultraconnected_space type Relation100031921.
- Ultraconnected_space comment "In mathematics, a topological space is said to be ultraconnected if no pair of nonempty closed sets of is disjoint. Equivalently, a space is ultraconnected if and only if the closures of two disjoint points always have non trivial intersection. Hence, no space with more than 1 point is ultraconnected.All ultraconnected spaces are path-connected (but not necessarily arc connected), normal, limit point compact, and pseudocompact.".
- Ultraconnected_space label "Ultraconnected space".
- Ultraconnected_space sameAs m.026rhq6.
- Ultraconnected_space sameAs Q7880520.
- Ultraconnected_space sameAs Q7880520.
- Ultraconnected_space sameAs Ultraconnected_space.
- Ultraconnected_space wasDerivedFrom Ultraconnected_space?oldid=523008249.
- Ultraconnected_space isPrimaryTopicOf Ultraconnected_space.