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- Dedekind_group wikiPageExternalLink purl?GDZPPN002256258.
- Dedekind_group wikiPageID "153106".
- Dedekind_group wikiPageLength "3327".
- Dedekind_group wikiPageOutDegree "21".
- Dedekind_group wikiPageRevisionID "664201238".
- Dedekind_group wikiPageWikiLink Abelian_group.
- Dedekind_group wikiPageWikiLink American_Mathematical_Monthly.
- Dedekind_group wikiPageWikiLink Bulletin_of_the_American_Mathematical_Society.
- Dedekind_group wikiPageWikiLink Category:Group_theory.
- Dedekind_group wikiPageWikiLink Category:Properties_of_groups.
- Dedekind_group wikiPageWikiLink Direct_product_of_groups.
- Dedekind_group wikiPageWikiLink Elementary_abelian_group.
- Dedekind_group wikiPageWikiLink Finite_group.
- Dedekind_group wikiPageWikiLink George_Abram_Miller.
- Dedekind_group wikiPageWikiLink Group_(mathematics).
- Dedekind_group wikiPageWikiLink Group_theory.
- Dedekind_group wikiPageWikiLink Mathematische_Annalen.
- Dedekind_group wikiPageWikiLink Normal_subgroup.
- Dedekind_group wikiPageWikiLink Order_(group_theory).
- Dedekind_group wikiPageWikiLink Quaternion.
- Dedekind_group wikiPageWikiLink Quaternion_group.
- Dedekind_group wikiPageWikiLink Reinhold_Baer.
- Dedekind_group wikiPageWikiLink Richard_Dedekind.
- Dedekind_group wikiPageWikiLink Subgroup.
- Dedekind_group wikiPageWikiLink Torsion_group.
- Dedekind_group wikiPageWikiLink William_Rowan_Hamilton.
- Dedekind_group wikiPageWikiLinkText "Dedekind group".
- Dedekind_group wikiPageUsesTemplate Template:Citation.
- Dedekind_group wikiPageUsesTemplate Template:Harv.
- Dedekind_group wikiPageUsesTemplate Template:Reflist.
- Dedekind_group subject Category:Group_theory.
- Dedekind_group subject Category:Properties_of_groups.
- Dedekind_group hypernym G.
- Dedekind_group type Device.
- Dedekind_group type Property.
- Dedekind_group comment "In group theory, a Dedekind group is a group G such that every subgroup of G is normal.All abelian groups are Dedekind groups.A non-abelian Dedekind group is called a Hamiltonian group.The most familiar (and smallest) example of a Hamiltonian group is the quaternion group of order 8, denoted by Q8.Dedekind and Baer have shown (in the finite and respectively infinite order case) that every Hamiltonian group is a direct product of the form G = Q8 × B × D, where B is an elementary abelian 2-group, and D is a periodic abelian group with all elements of odd order.Dedekind groups are named after Richard Dedekind, who investigated them in (Dedekind 1897), proving a form of the above structure theorem (for finite groups). ".
- Dedekind_group label "Dedekind group".
- Dedekind_group sameAs Q1573561.
- Dedekind_group sameAs Hamiltonsche_Gruppe.
- Dedekind_group sameAs Groupe_hamiltonien_(théorie_des_groupes).
- Dedekind_group sameAs Gruppo_hamiltoniano.
- Dedekind_group sameAs 데데킨트_군.
- Dedekind_group sameAs Hamiltoniaanse_groep.
- Dedekind_group sameAs Grupa_Hamiltona.
- Dedekind_group sameAs m.013zt2.
- Dedekind_group sameAs Q1573561.
- Dedekind_group wasDerivedFrom Dedekind_group?oldid=664201238.
- Dedekind_group isPrimaryTopicOf Dedekind_group.