Matches in DBpedia 2015-10 for { <http://dbpedia.org/resource/Kuratowski_closure_axioms> ?p ?o }
Showing triples 1 to 51 of
51
with 100 triples per page.
- Kuratowski_closure_axioms abstract "In topology and related branches of mathematics, the Kuratowski closure axioms are a set of axioms that can be used to define a topological structure on a set. They are equivalent to the more commonly used open set definition. They were first introduced by Kazimierz Kuratowski.A similar set of axioms can be used to define a topological structure using only the dual notion of interior operator.".
- Kuratowski_closure_axioms wikiPageExternalLink TopSection3.pdf.
- Kuratowski_closure_axioms wikiPageID "331597".
- Kuratowski_closure_axioms wikiPageLength "5609".
- Kuratowski_closure_axioms wikiPageOutDegree "17".
- Kuratowski_closure_axioms wikiPageRevisionID "621423508".
- Kuratowski_closure_axioms wikiPageWikiLink Axiom.
- Kuratowski_closure_axioms wikiPageWikiLink Category:Closure_operators.
- Kuratowski_closure_axioms wikiPageWikiLink Category:Mathematical_axioms.
- Kuratowski_closure_axioms wikiPageWikiLink Closeness_(mathematics).
- Kuratowski_closure_axioms wikiPageWikiLink Closeness_(topology).
- Kuratowski_closure_axioms wikiPageWikiLink Continuity_(topology).
- Kuratowski_closure_axioms wikiPageWikiLink Continuous_function.
- Kuratowski_closure_axioms wikiPageWikiLink Idempotence.
- Kuratowski_closure_axioms wikiPageWikiLink Idempotent_function.
- Kuratowski_closure_axioms wikiPageWikiLink Interior_(topology).
- Kuratowski_closure_axioms wikiPageWikiLink Kazimierz_Kuratowski.
- Kuratowski_closure_axioms wikiPageWikiLink Mathematical_induction.
- Kuratowski_closure_axioms wikiPageWikiLink Mathematics.
- Kuratowski_closure_axioms wikiPageWikiLink Open_set.
- Kuratowski_closure_axioms wikiPageWikiLink Power_set.
- Kuratowski_closure_axioms wikiPageWikiLink Preclosure_operator.
- Kuratowski_closure_axioms wikiPageWikiLink Set_(mathematics).
- Kuratowski_closure_axioms wikiPageWikiLink Topological_space.
- Kuratowski_closure_axioms wikiPageWikiLink Topological_structure.
- Kuratowski_closure_axioms wikiPageWikiLink Topology.
- Kuratowski_closure_axioms wikiPageWikiLinkText "''topological'' closure operator".
- Kuratowski_closure_axioms wikiPageWikiLinkText "Kuratowski closure axioms".
- Kuratowski_closure_axioms wikiPageWikiLinkText "Kuratowski closure operator".
- Kuratowski_closure_axioms wikiPageWikiLinkText "Kuratowski closure".
- Kuratowski_closure_axioms wikiPageWikiLinkText "Kuratowski_closure_axioms".
- Kuratowski_closure_axioms wikiPageWikiLinkText "cl".
- Kuratowski_closure_axioms wikiPageWikiLinkText "closed".
- Kuratowski_closure_axioms wikiPageWikiLinkText "closure operator".
- Kuratowski_closure_axioms hasPhotoCollection Kuratowski_closure_axioms.
- Kuratowski_closure_axioms wikiPageUsesTemplate Template:Citation.
- Kuratowski_closure_axioms wikiPageUsesTemplate Template:Reflist.
- Kuratowski_closure_axioms subject Category:Closure_operators.
- Kuratowski_closure_axioms subject Category:Mathematical_axioms.
- Kuratowski_closure_axioms hypernym Set.
- Kuratowski_closure_axioms type Concept.
- Kuratowski_closure_axioms type Theory.
- Kuratowski_closure_axioms comment "In topology and related branches of mathematics, the Kuratowski closure axioms are a set of axioms that can be used to define a topological structure on a set. They are equivalent to the more commonly used open set definition. They were first introduced by Kazimierz Kuratowski.A similar set of axioms can be used to define a topological structure using only the dual notion of interior operator.".
- Kuratowski_closure_axioms label "Kuratowski closure axioms".
- Kuratowski_closure_axioms sameAs Assiomi_di_chiusura_di_Kuratowski.
- Kuratowski_closure_axioms sameAs m.01wz_k.
- Kuratowski_closure_axioms sameAs Q10286397.
- Kuratowski_closure_axioms sameAs Q10286397.
- Kuratowski_closure_axioms sameAs 庫拉托夫斯基閉包公理.
- Kuratowski_closure_axioms wasDerivedFrom Kuratowski_closure_axioms?oldid=621423508.
- Kuratowski_closure_axioms isPrimaryTopicOf Kuratowski_closure_axioms.