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- Q2226786 subject Q8266681.
- Q2226786 subject Q8442255.
- Q2226786 subject Q8732951.
- Q2226786 abstract "Sperner's theorem, in discrete mathematics, describes the largest possible families of finite sets none of which contain any other sets in the family. It is one of the central results in extremal set theory, and is named after Emanuel Sperner, who published it in 1928.This result is sometimes called Sperner's lemma, but the name "Sperner's lemma" also refers to an unrelated result on coloring triangulations. To differentiate the two results, the result on the size of a Sperner family is now more commonly known as Sperner's theorem.".
- Q2226786 wikiPageExternalLink index.php?title=Sperner%27s_theorem.
- Q2226786 wikiPageExternalLink sperner.shtml.
- Q2226786 wikiPageExternalLink 1945-04.pdf.
- Q2226786 wikiPageWikiLink Q1050579.
- Q2226786 wikiPageWikiLink Q1134776.
- Q2226786 wikiPageWikiLink Q121416.
- Q2226786 wikiPageWikiLink Q1872826.
- Q2226786 wikiPageWikiLink Q205170.
- Q2226786 wikiPageWikiLink Q2235316.
- Q2226786 wikiPageWikiLink Q272404.
- Q2226786 wikiPageWikiLink Q2928101.
- Q2226786 wikiPageWikiLink Q3186905.
- Q2226786 wikiPageWikiLink Q431937.
- Q2226786 wikiPageWikiLink Q474715.
- Q2226786 wikiPageWikiLink Q5422299.
- Q2226786 wikiPageWikiLink Q5527834.
- Q2226786 wikiPageWikiLink Q5591878.
- Q2226786 wikiPageWikiLink Q67293.
- Q2226786 wikiPageWikiLink Q733336.
- Q2226786 wikiPageWikiLink Q739925.
- Q2226786 wikiPageWikiLink Q7576398.
- Q2226786 wikiPageWikiLink Q819142.
- Q2226786 wikiPageWikiLink Q8266681.
- Q2226786 wikiPageWikiLink Q8442255.
- Q2226786 wikiPageWikiLink Q847858.
- Q2226786 wikiPageWikiLink Q8732951.
- Q2226786 comment "Sperner's theorem, in discrete mathematics, describes the largest possible families of finite sets none of which contain any other sets in the family. It is one of the central results in extremal set theory, and is named after Emanuel Sperner, who published it in 1928.This result is sometimes called Sperner's lemma, but the name "Sperner's lemma" also refers to an unrelated result on coloring triangulations.".
- Q2226786 label "Sperner's theorem".