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- Regular_space abstract "In topology and related fields of mathematics, a topological space X is called a regular space if every non-empty closed subset C of X and a point p not contained in C admit non-overlapping open neighborhoods. Thus p and C can be separated by neighborhoods. This condition is known as Axiom T3. The term \"T3 space\" usually means \"a regular Hausdorff space\". These conditions are examples of separation axioms.".
- Regular_space thumbnail Regular_space.svg?width=300.
- Regular_space wikiPageID "53058".
- Regular_space wikiPageLength "8555".
- Regular_space wikiPageOutDegree "57".
- Regular_space wikiPageRevisionID "681005930".
- Regular_space wikiPageWikiLink Base_(topology).
- Regular_space wikiPageWikiLink Category:Properties_of_topological_spaces.
- Regular_space wikiPageWikiLink Category:Separation_axioms.
- Regular_space wikiPageWikiLink Category:Topology.
- Regular_space wikiPageWikiLink Clopen_set.
- Regular_space wikiPageWikiLink Closed_set.
- Regular_space wikiPageWikiLink Counterexample.
- Regular_space wikiPageWikiLink Disjoint_sets.
- Regular_space wikiPageWikiLink Empty_set.
- Regular_space wikiPageWikiLink Glossary_of_topology.
- Regular_space wikiPageWikiLink Hausdorff_space.
- Regular_space wikiPageWikiLink History_of_the_separation_axioms.
- Regular_space wikiPageWikiLink Inductive_dimension.
- Regular_space wikiPageWikiLink Interior_(topology).
- Regular_space wikiPageWikiLink Kolmogorov_space.
- Regular_space wikiPageWikiLink Locally_compact_space.
- Regular_space wikiPageWikiLink Locally_regular_space.
- Regular_space wikiPageWikiLink Mathematical_analysis.
- Regular_space wikiPageWikiLink Mathematics.
- Regular_space wikiPageWikiLink Neighbourhood_(mathematics).
- Regular_space wikiPageWikiLink Neighbourhood_system.
- Regular_space wikiPageWikiLink Non-Hausdorff_manifold.
- Regular_space wikiPageWikiLink Normal_space.
- Regular_space wikiPageWikiLink Paracompact_space.
- Regular_space wikiPageWikiLink Point_(geometry).
- Regular_space wikiPageWikiLink Pseudonormal_space.
- Regular_space wikiPageWikiLink Semiregular_space.
- Regular_space wikiPageWikiLink Separated_sets.
- Regular_space wikiPageWikiLink Separation_axiom.
- Regular_space wikiPageWikiLink Subset.
- Regular_space wikiPageWikiLink T1_space.
- Regular_space wikiPageWikiLink Theorem.
- Regular_space wikiPageWikiLink Topological_indistinguishability.
- Regular_space wikiPageWikiLink Topological_space.
- Regular_space wikiPageWikiLink Topology.
- Regular_space wikiPageWikiLink Trivial_topology.
- Regular_space wikiPageWikiLink Tychonoff_corkscrew.
- Regular_space wikiPageWikiLink Tychonoff_space.
- Regular_space wikiPageWikiLink Urysohn_and_completely_Hausdorff_spaces.
- Regular_space wikiPageWikiLink Zero-dimensional_space.
- Regular_space wikiPageWikiLink File:Regular_space.svg.
- Regular_space wikiPageWikiLinkText "Extension by continuity".
- Regular_space wikiPageWikiLinkText "Regular space".
- Regular_space wikiPageWikiLinkText "Regular".
- Regular_space wikiPageWikiLinkText "regular Hausdorff".
- Regular_space wikiPageWikiLinkText "regular space".
- Regular_space wikiPageWikiLinkText "regular topological space".
- Regular_space wikiPageWikiLinkText "regular".
- Regular_space wikiPageWikiLinkText "regularity".
- Regular_space wikiPageUsesTemplate Template:Reflist.
- Regular_space wikiPageUsesTemplate Template:Separation_axioms.
- Regular_space subject Category:Properties_of_topological_spaces.
- Regular_space subject Category:Separation_axioms.
- Regular_space subject Category:Topology.
- Regular_space type Field.
- Regular_space type Property.
- Regular_space type Space.
- Regular_space comment "In topology and related fields of mathematics, a topological space X is called a regular space if every non-empty closed subset C of X and a point p not contained in C admit non-overlapping open neighborhoods. Thus p and C can be separated by neighborhoods. This condition is known as Axiom T3. The term \"T3 space\" usually means \"a regular Hausdorff space\". These conditions are examples of separation axioms.".
- Regular_space label "Regular space".
- Regular_space sameAs Q1193403.
- Regular_space sameAs Espai_regular.
- Regular_space sameAs Regulärer_Raum.
- Regular_space sameAs Espacio_regular.
- Regular_space sameAs Espace_régulier.
- Regular_space sameAs מרחב_רגולרי.
- Regular_space sameAs Spazio_regolare.
- Regular_space sameAs 정칙_공간.
- Regular_space sameAs Reguliere_ruimte.
- Regular_space sameAs Przestrzeń_regularna.
- Regular_space sameAs Espaço_regular.
- Regular_space sameAs m.0dy30.
- Regular_space sameAs T3-rum.
- Regular_space sameAs Q1193403.
- Regular_space sameAs 正則空間.
- Regular_space wasDerivedFrom Regular_space?oldid=681005930.
- Regular_space depiction Regular_space.svg.
- Regular_space isPrimaryTopicOf Regular_space.