]> 2020-02-28T16:25:39+00:00 Isomorphic groups 0 en 1 Term 2010-08-07T14:43:31Z 2455416.1135532 Isomorphic groups 0 1 table 2 [[Defining ingredient::Isomorphic groups]] Isomorphic groups 0 2 table 5 [[Fact about:: <q>[[Page::Isomorphic groups]] [[Number::1]]</q> ]] Isomorphic groups 0 2 table 3 [[Fact about.Page::Isomorphic groups]] Isomorphic groups 0 1 table 2 [[Survey article about::Isomorphic groups]] Isomorphic groups 0 2 list 3 [[Survey article about.Defining ingredient::Isomorphic groups]] Isomorphic groups 0 1 list 2 [[Analogue of::Isomorphic groups]] Isomorphic groups 0 1 list 2 [[Variation of::Isomorphic groups]] Isomorphic groups 0 1 list 2 [[Opposite of::Isomorphic groups]] Isomorphic groups Group isomorphic to its automorphism group 0 en Group isomorphic to its automorphism group Group isomorphic to its inner automorphism group 0 en Group isomorphic to its inner automorphism group Group isomorphic to its square 0 en Group isomorphic to its square Group isomorphic to its cube 0 en Group isomorphic to its cube Isomorph-dominating subgroup 0 en Isomorph-dominating subgroup 0 Finitely generated abelian groups are elementarily equivalent iff they are isomorphic#Isomorphic groups 0 Finite groups are elementarily equivalent iff they are isomorphic#Isomorphic groups 0 Isotopic groups are isomorphic#Isomorphic groups 0 There exist abelian groups whose isomorphism classes of direct powers have any given period#Isomorphic groups 1-isomorphic groups 0 en 1-isomorphic groups Directed power graph-equivalent groups 0 en Directed power graph-equivalent groups Undirected power graph-equivalent groups 0 en Undirected power graph-equivalent groups Question:Normal subgroup quotient group determine whole group 116 en Normal subgroup quotient group determine whole group Question:Isomorphic normal subgroups isomorphic quotient groups equivalent as subgroups 116 en Isomorphic normal subgroups isomorphic quotient groups equivalent as subgroups Question:Normal subgroup quotient group determine whole group counterfactual 116 en Normal subgroup quotient group determine whole group counterfactual Isomorphic group 0 en Isomorphic group Defining ingredient 132 en Defining ingredient Page 132 en Page Weaker than 132 en Weaker than Question about 132 en Question about