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- Cantor_tree abstract "In mathematical set theory, the Cantor tree is either the full binary tree of height ω + 1, or a topological space related to this by joining its points with intervals, that was introduced by Robert Lee Moore in the late 1920s as an example of a non-metrizable Moore space (Jones 1966).".
- Cantor_tree wikiPageExternalLink books?id=9pBcysbSU8gC.
- Cantor_tree wikiPageID "33418092".
- Cantor_tree wikiPageLength "1707".
- Cantor_tree wikiPageOutDegree "9".
- Cantor_tree wikiPageRevisionID "504985119".
- Cantor_tree wikiPageWikiLink Category:Trees_(set_theory).
- Cantor_tree wikiPageWikiLink Counterexamples_in_Topology.
- Cantor_tree wikiPageWikiLink Dover_Publications.
- Cantor_tree wikiPageWikiLink Moore_space_(topology).
- Cantor_tree wikiPageWikiLink Princeton_University_Press.
- Cantor_tree wikiPageWikiLink Robert_Lee_Moore.
- Cantor_tree wikiPageWikiLink Springer-Verlag.
- Cantor_tree wikiPageWikiLink Springer_Science+Business_Media.
- Cantor_tree wikiPageWikiLink Topological_space.
- Cantor_tree wikiPageWikiLink Tree_(set_theory).
- Cantor_tree wikiPageWikiLinkText "Cantor tree".
- Cantor_tree hasPhotoCollection Cantor_tree.
- Cantor_tree wikiPageUsesTemplate Template:Citation.
- Cantor_tree wikiPageUsesTemplate Template:For.
- Cantor_tree wikiPageUsesTemplate Template:Harv.
- Cantor_tree subject Category:Trees_(set_theory).
- Cantor_tree comment "In mathematical set theory, the Cantor tree is either the full binary tree of height ω + 1, or a topological space related to this by joining its points with intervals, that was introduced by Robert Lee Moore in the late 1920s as an example of a non-metrizable Moore space (Jones 1966).".
- Cantor_tree label "Cantor tree".
- Cantor_tree sameAs m.0h95298.
- Cantor_tree sameAs Q5034032.
- Cantor_tree sameAs Q5034032.
- Cantor_tree wasDerivedFrom Cantor_tree?oldid=504985119.
- Cantor_tree isPrimaryTopicOf Cantor_tree.