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- Metacompact_space abstract "In mathematics, in the field of general topology, a topological space is said to be metacompact if every open cover has a point finite open refinement. That is, given any open cover of the topological space, there is a refinement which is again an open cover with the property that every point is contained only in finitely many sets of the refining cover.A space is countably metacompact if every countable open cover has a point finite open refinement.".
- Metacompact_space wikiPageID "5074872".
- Metacompact_space wikiPageRevisionID "544373017".
- Metacompact_space hasPhotoCollection Metacompact_space.
- Metacompact_space subject Category:Compactness_(mathematics).
- Metacompact_space subject Category:Properties_of_topological_spaces.
- Metacompact_space type Abstraction100002137.
- Metacompact_space type Possession100032613.
- Metacompact_space type PropertiesOfTopologicalSpaces.
- Metacompact_space type Property113244109.
- Metacompact_space type Relation100031921.
- Metacompact_space comment "In mathematics, in the field of general topology, a topological space is said to be metacompact if every open cover has a point finite open refinement. That is, given any open cover of the topological space, there is a refinement which is again an open cover with the property that every point is contained only in finitely many sets of the refining cover.A space is countably metacompact if every countable open cover has a point finite open refinement.".
- Metacompact_space label "Metacompact space".
- Metacompact_space sameAs 메타콤팩트_공간.
- Metacompact_space sameAs m.0d1ks5.
- Metacompact_space sameAs Q6822437.
- Metacompact_space sameAs Q6822437.
- Metacompact_space sameAs Metacompact_space.
- Metacompact_space wasDerivedFrom Metacompact_space?oldid=544373017.
- Metacompact_space isPrimaryTopicOf Metacompact_space.