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- Feebly_compact_space abstract "In mathematics, a topological space is feebly compact if every locally finite cover by nonempty open sets is finite.Some facts: Every compact space is feebly compact. Every feebly compact paracompact space is compact. Every feebly compact space is pseudocompact but the converse is not necessarily true. For a completely regular Hausdorff space the properties of being feebly compact and pseudocompact are equivalent. Any maximal feebly compact space is submaximal.".
- Feebly_compact_space wikiPageID "5705488".
- Feebly_compact_space wikiPageRevisionID "575486968".
- Feebly_compact_space hasPhotoCollection Feebly_compact_space.
- Feebly_compact_space subject Category:Compactness_(mathematics).
- Feebly_compact_space subject Category:Properties_of_topological_spaces.
- Feebly_compact_space type Abstraction100002137.
- Feebly_compact_space type Possession100032613.
- Feebly_compact_space type PropertiesOfTopologicalSpaces.
- Feebly_compact_space type Property113244109.
- Feebly_compact_space type Relation100031921.
- Feebly_compact_space comment "In mathematics, a topological space is feebly compact if every locally finite cover by nonempty open sets is finite.Some facts: Every compact space is feebly compact. Every feebly compact paracompact space is compact. Every feebly compact space is pseudocompact but the converse is not necessarily true. For a completely regular Hausdorff space the properties of being feebly compact and pseudocompact are equivalent. Any maximal feebly compact space is submaximal.".
- Feebly_compact_space label "Feebly compact space".
- Feebly_compact_space sameAs m.0f03w2.
- Feebly_compact_space sameAs Q5441165.
- Feebly_compact_space sameAs Q5441165.
- Feebly_compact_space sameAs Feebly_compact_space.
- Feebly_compact_space wasDerivedFrom Feebly_compact_space?oldid=575486968.
- Feebly_compact_space isPrimaryTopicOf Feebly_compact_space.