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- N-ary_group abstract "In mathematics, and in particular universal algebra, the concept of n-ary group (also called n-group or multiary group) is a generalization of the concept of group to a set G with an n-ary operation instead of a binary operation. By an n-ary operation is meant any set map f: Gn → G from the n-th Cartesian power of G to G. The axioms for an n-ary group are defined in such a way that they reduce to those of a group in the case n = 2. The earliest work on these structures was done in 1904 by Kasner and in 1928 by Dörnte; the first systematic account of (what were then called) polyadic groups was given in 1940 by Emil Leon Post in a famous 143-page paper in the Transactions of the American Mathematical Society.".
- N-ary_group wikiPageID "23340612".
- N-ary_group wikiPageLength "6561".
- N-ary_group wikiPageOutDegree "9".
- N-ary_group wikiPageRevisionID "661804563".
- N-ary_group wikiPageWikiLink Arity.
- N-ary_group wikiPageWikiLink Axiom.
- N-ary_group wikiPageWikiLink Category:Algebraic_structures.
- N-ary_group wikiPageWikiLink Emil_Leon_Post.
- N-ary_group wikiPageWikiLink Group_(mathematics).
- N-ary_group wikiPageWikiLink Magma_(algebra).
- N-ary_group wikiPageWikiLink Mathematics.
- N-ary_group wikiPageWikiLink Universal_algebra.
- N-ary_group wikiPageWikiLinkText "''n''-ary group".
- N-ary_group wikiPageWikiLinkText "n-ary group".
- N-ary_group wikiPageWikiLinkText "polyadic, or ''n''-ary, groups".
- N-ary_group wikiPageUsesTemplate Template:=.
- N-ary_group wikiPageUsesTemplate Template:Reflist.
- N-ary_group subject Category:Algebraic_structures.
- N-ary_group hypernym Generalization.
- N-ary_group comment "In mathematics, and in particular universal algebra, the concept of n-ary group (also called n-group or multiary group) is a generalization of the concept of group to a set G with an n-ary operation instead of a binary operation. By an n-ary operation is meant any set map f: Gn → G from the n-th Cartesian power of G to G. The axioms for an n-ary group are defined in such a way that they reduce to those of a group in the case n = 2.".
- N-ary_group label "N-ary group".
- N-ary_group sameAs Q4369853.
- N-ary_group sameAs m.06w976l.
- N-ary_group sameAs Полиадическая_группа.
- N-ary_group sameAs Q4369853.
- N-ary_group wasDerivedFrom N-ary_group?oldid=661804563.
- N-ary_group isPrimaryTopicOf N-ary_group.