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- Toronto_space abstract "In mathematics, in the realm of point-set topology, a Toronto space is a topological space that is homeomorphic to every proper subspace of the same cardinality.There are five homeomorphism classes of countable Toronto spaces, namely: the discrete topology, the indiscrete topology, the cofinite topology and the upper and lower topologies on the natural numbers. The only countable Hausdorff Toronto space is the discrete space.The Toronto space problem asks for an uncountable Toronto Hausdorff space that is not discrete.".
- Toronto_space wikiPageID "5705424".
- Toronto_space wikiPageLength "1318".
- Toronto_space wikiPageOutDegree "14".
- Toronto_space wikiPageRevisionID "547031076".
- Toronto_space wikiPageWikiLink Cardinality.
- Toronto_space wikiPageWikiLink Category:Homeomorphisms.
- Toronto_space wikiPageWikiLink Category:Properties_of_topological_spaces.
- Toronto_space wikiPageWikiLink Cofiniteness.
- Toronto_space wikiPageWikiLink Discrete_space.
- Toronto_space wikiPageWikiLink General_topology.
- Toronto_space wikiPageWikiLink Hausdorff_space.
- Toronto_space wikiPageWikiLink Homeomorphism.
- Toronto_space wikiPageWikiLink Mathematics.
- Toronto_space wikiPageWikiLink Natural_number.
- Toronto_space wikiPageWikiLink Topological_space.
- Toronto_space wikiPageWikiLink Trivial_topology.
- Toronto_space wikiPageWikiLink Upper_topology.
- Toronto_space wikiPageWikiLinkText "Toronto space".
- Toronto_space wikiPageUsesTemplate Template:Reflist.
- Toronto_space wikiPageUsesTemplate Template:Topology-stub.
- Toronto_space subject Category:Homeomorphisms.
- Toronto_space subject Category:Properties_of_topological_spaces.
- Toronto_space hypernym Space.
- Toronto_space type Homeomorphism.
- Toronto_space type Mapping.
- Toronto_space type Morphism.
- Toronto_space type Property.
- Toronto_space type Space.
- Toronto_space comment "In mathematics, in the realm of point-set topology, a Toronto space is a topological space that is homeomorphic to every proper subspace of the same cardinality.There are five homeomorphism classes of countable Toronto spaces, namely: the discrete topology, the indiscrete topology, the cofinite topology and the upper and lower topologies on the natural numbers.".
- Toronto_space label "Toronto space".
- Toronto_space sameAs Q7826673.
- Toronto_space sameAs m.0f03sb.
- Toronto_space sameAs Q7826673.
- Toronto_space wasDerivedFrom Toronto_space?oldid=547031076.
- Toronto_space isPrimaryTopicOf Toronto_space.