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- Sperners_theorem 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.".
- Sperners_theorem wikiPageExternalLink index.php?title=Sperner%27s_theorem.
- Sperners_theorem wikiPageExternalLink sperner.shtml.
- Sperners_theorem wikiPageExternalLink 1945-04.pdf.
- Sperners_theorem wikiPageID "748844".
- Sperners_theorem wikiPageLength "11325".
- Sperners_theorem wikiPageOutDegree "28".
- Sperners_theorem wikiPageRevisionID "708013515".
- Sperners_theorem wikiPageWikiLink Antichain.
- Sperners_theorem wikiPageWikiLink Bulletin_of_the_American_Mathematical_Society.
- Sperners_theorem wikiPageWikiLink Category:Articles_containing_proofs.
- Sperners_theorem wikiPageWikiLink Category:Factorial_and_binomial_topics.
- Sperners_theorem wikiPageWikiLink Category:Set_families.
- Sperners_theorem wikiPageWikiLink Cut-the-Knot.
- Sperners_theorem wikiPageWikiLink Dilworths_theorem.
- Sperners_theorem wikiPageWikiLink Discrete_mathematics.
- Sperners_theorem wikiPageWikiLink Elementary_symmetric_polynomial.
- Sperners_theorem wikiPageWikiLink Emanuel_Sperner.
- Sperners_theorem wikiPageWikiLink Extremal_combinatorics.
- Sperners_theorem wikiPageWikiLink Family_of_sets.
- Sperners_theorem wikiPageWikiLink Finite_set.
- Sperners_theorem wikiPageWikiLink Gaussian_binomial_coefficient.
- Sperners_theorem wikiPageWikiLink Graded_poset.
- Sperners_theorem wikiPageWikiLink Journal_of_Combinatorial_Theory.
- Sperners_theorem wikiPageWikiLink Lubell–Yamamoto–Meshalkin_inequality.
- Sperners_theorem wikiPageWikiLink Mathematische_Zeitschrift.
- Sperners_theorem wikiPageWikiLink Partially_ordered_set.
- Sperners_theorem wikiPageWikiLink Power_set.
- Sperners_theorem wikiPageWikiLink Sperner_family.
- Sperners_theorem wikiPageWikiLink Sperner_property_of_a_partially_ordered_set.
- Sperners_theorem wikiPageWikiLink Sperners_lemma.
- Sperners_theorem wikiPageWikiLinkText "Sperner theory".
- Sperners_theorem wikiPageWikiLinkText "Sperner's theorem".
- Sperners_theorem first "K.".
- Sperners_theorem id "S/s130500".
- Sperners_theorem last "Engel".
- Sperners_theorem title "Sperner theorem".
- Sperners_theorem wikiPageUsesTemplate Template:Citation.
- Sperners_theorem wikiPageUsesTemplate Template:Harvtxt.
- Sperners_theorem wikiPageUsesTemplate Template:Portal.
- Sperners_theorem wikiPageUsesTemplate Template:Springer.
- Sperners_theorem subject Category:Articles_containing_proofs.
- Sperners_theorem subject Category:Factorial_and_binomial_topics.
- Sperners_theorem subject Category:Set_families.
- Sperners_theorem 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.".
- Sperners_theorem label "Sperner's theorem".
- Sperners_theorem sameAs Q2226786.
- Sperners_theorem sameAs Satz_von_Sperner.
- Sperners_theorem sameAs Sperner-tétel.
- Sperners_theorem sameAs 슈페르너의_정리.
- Sperners_theorem sameAs m.0yt1p55.
- Sperners_theorem sameAs Q2226786.
- Sperners_theorem wasDerivedFrom Sperners_theorem?oldid=708013515.
- Sperners_theorem isPrimaryTopicOf Sperners_theorem.