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- De_Groot_dual abstract "In mathematics, in particular in topology, the de Groot dual (after Johannes de Groot) of a topology τ on a set X is the topology τ* whose closed sets are generated by compact saturated subsets of (X, τ).".
- De_Groot_dual wikiPageID "26592825".
- De_Groot_dual wikiPageLength "513".
- De_Groot_dual wikiPageOutDegree "9".
- De_Groot_dual wikiPageRevisionID "508662202".
- De_Groot_dual wikiPageWikiLink Category:Topology.
- De_Groot_dual wikiPageWikiLink Closed_set.
- De_Groot_dual wikiPageWikiLink Closed_sets.
- De_Groot_dual wikiPageWikiLink Compact_space.
- De_Groot_dual wikiPageWikiLink Johannes_de_Groot.
- De_Groot_dual wikiPageWikiLink Mathematics.
- De_Groot_dual wikiPageWikiLink Saturated_set.
- De_Groot_dual wikiPageWikiLink Set_(mathematics).
- De_Groot_dual wikiPageWikiLink Subset.
- De_Groot_dual wikiPageWikiLink Topology.
- De_Groot_dual wikiPageWikiLinkText "De Groot dual".
- De_Groot_dual wikiPageWikiLinkText "de Groot dual".
- De_Groot_dual hasPhotoCollection De_Groot_dual.
- De_Groot_dual subject Category:Topology.
- De_Groot_dual hypernym *.
- De_Groot_dual type HistoricBuilding.
- De_Groot_dual type Field.
- De_Groot_dual comment "In mathematics, in particular in topology, the de Groot dual (after Johannes de Groot) of a topology τ on a set X is the topology τ* whose closed sets are generated by compact saturated subsets of (X, τ).".
- De_Groot_dual label "De Groot dual".
- De_Groot_dual sameAs m.0bhcjm_.
- De_Groot_dual sameAs Q5244397.
- De_Groot_dual sameAs Q5244397.
- De_Groot_dual wasDerivedFrom De_Groot_dual?oldid=508662202.
- De_Groot_dual isPrimaryTopicOf De_Groot_dual.