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- Reflexive_closure abstract "In mathematics, the reflexive closure of a binary relation R on a set X is the smallest reflexive relation on X that contains R.For example, if X is a set of distinct numbers and x R y means \"x is less than y\", then the reflexive closure of R is the relation \"x is less than or equal to y\".".
- Reflexive_closure wikiPageID "22603618".
- Reflexive_closure wikiPageLength "947".
- Reflexive_closure wikiPageOutDegree "12".
- Reflexive_closure wikiPageRevisionID "627004515".
- Reflexive_closure wikiPageWikiLink Binary_relation.
- Reflexive_closure wikiPageWikiLink Category:Closure_operators.
- Reflexive_closure wikiPageWikiLink Category:Mathematical_relations.
- Reflexive_closure wikiPageWikiLink Category:Rewriting_systems.
- Reflexive_closure wikiPageWikiLink Equality_(mathematics).
- Reflexive_closure wikiPageWikiLink Franz_Baader.
- Reflexive_closure wikiPageWikiLink Mathematics.
- Reflexive_closure wikiPageWikiLink Reflexive_relation.
- Reflexive_closure wikiPageWikiLink Set_(mathematics).
- Reflexive_closure wikiPageWikiLink Symmetric_closure.
- Reflexive_closure wikiPageWikiLink Tobias_Nipkow.
- Reflexive_closure wikiPageWikiLink Transitive_closure.
- Reflexive_closure wikiPageWikiLinkText "Reflexive closure".
- Reflexive_closure wikiPageWikiLinkText "reflexive closure".
- Reflexive_closure wikiPageWikiLinkText "reflexive".
- Reflexive_closure wikiPageUsesTemplate Template:Plt-stub.
- Reflexive_closure subject Category:Closure_operators.
- Reflexive_closure subject Category:Mathematical_relations.
- Reflexive_closure subject Category:Rewriting_systems.
- Reflexive_closure hypernym Relation.
- Reflexive_closure type Agent.
- Reflexive_closure type Concept.
- Reflexive_closure type Relation.
- Reflexive_closure type Theory.
- Reflexive_closure comment "In mathematics, the reflexive closure of a binary relation R on a set X is the smallest reflexive relation on X that contains R.For example, if X is a set of distinct numbers and x R y means \"x is less than y\", then the reflexive closure of R is the relation \"x is less than or equal to y\".".
- Reflexive_closure label "Reflexive closure".
- Reflexive_closure sameAs Q1637549.
- Reflexive_closure sameAs Reflexive_Hülle.
- Reflexive_closure sameAs Clausura_reflexiva.
- Reflexive_closure sameAs Itxitura_bihurkari.
- Reflexive_closure sameAs Fecho_reflexivo.
- Reflexive_closure sameAs m.05zkkqb.
- Reflexive_closure sameAs எதிர்வு_அடைப்பு_உறவு.
- Reflexive_closure sameAs Рефлексивне_замикання.
- Reflexive_closure sameAs Q1637549.
- Reflexive_closure sameAs 自反闭包.
- Reflexive_closure wasDerivedFrom Reflexive_closure?oldid=627004515.
- Reflexive_closure isPrimaryTopicOf Reflexive_closure.