Matches in DBpedia 2016-04 for { <http://dbpedia.org/resource/Normal_subgroup> ?p ?o }
- Normal_subgroup abstract "In abstract algebra, a normal subgroup is a subgroup which is invariant under conjugation by members of the group of which it is a part. In other words, a subgroup H of a group G is normal in G if and only if gH = Hg for all g in G, i.e., the sets of left and right cosets coincide. Normal subgroups (and only normal subgroups) can be used to construct quotient groups from a given group.Évariste Galois was the first to realize the importance of the existence of normal subgroups.".
- Normal_subgroup wikiPageExternalLink n067690.htm.
- Normal_subgroup wikiPageExternalLink normal-subgroups-and-quotient-groups.
- Normal_subgroup wikiPageExternalLink normal.html.
- Normal_subgroup wikiPageExternalLink Chapter1.pdf.
- Normal_subgroup wikiPageID "21918".
- Normal_subgroup wikiPageLength "9508".
- Normal_subgroup wikiPageOutDegree "77".
- Normal_subgroup wikiPageRevisionID "699803363".
- Normal_subgroup wikiPageWikiLink Abelian_group.
- Normal_subgroup wikiPageWikiLink Abnormal_subgroup.
- Normal_subgroup wikiPageWikiLink Abstract_algebra.
- Normal_subgroup wikiPageWikiLink Ascendant_subgroup.
- Normal_subgroup wikiPageWikiLink Automorphism.
- Normal_subgroup wikiPageWikiLink C-normal_subgroup.
- Normal_subgroup wikiPageWikiLink Category:Subgroup_properties.
- Normal_subgroup wikiPageWikiLink Center_(group_theory).
- Normal_subgroup wikiPageWikiLink Central_factor.
- Normal_subgroup wikiPageWikiLink Centralizer_and_normalizer.
- Normal_subgroup wikiPageWikiLink Characteristic_subgroup.
- Normal_subgroup wikiPageWikiLink Commutator_subgroup.
- Normal_subgroup wikiPageWikiLink Complete_lattice.
- Normal_subgroup wikiPageWikiLink Conjugacy_class.
- Normal_subgroup wikiPageWikiLink Conjugate-permutable_subgroup.
- Normal_subgroup wikiPageWikiLink Conjugate_closure.
- Normal_subgroup wikiPageWikiLink Contranormal_subgroup.
- Normal_subgroup wikiPageWikiLink Core_(group_theory).
- Normal_subgroup wikiPageWikiLink Coset.
- Normal_subgroup wikiPageWikiLink Dedekind_group.
- Normal_subgroup wikiPageWikiLink Descendant_subgroup.
- Normal_subgroup wikiPageWikiLink Dihedral_group.
- Normal_subgroup wikiPageWikiLink Direct_factor.
- Normal_subgroup wikiPageWikiLink Domain_of_a_function.
- Normal_subgroup wikiPageWikiLink Euclidean_group.
- Normal_subgroup wikiPageWikiLink Fully_characteristic_subgroup.
- Normal_subgroup wikiPageWikiLink Greatest_element.
- Normal_subgroup wikiPageWikiLink Group_(mathematics).
- Normal_subgroup wikiPageWikiLink Group_homomorphism.
- Normal_subgroup wikiPageWikiLink Ideal_(ring_theory).
- Normal_subgroup wikiPageWikiLink Imperfect_group.
- Normal_subgroup wikiPageWikiLink Index_of_a_subgroup.
- Normal_subgroup wikiPageWikiLink Inner_automorphism.
- Normal_subgroup wikiPageWikiLink Isomorphism.
- Normal_subgroup wikiPageWikiLink Isomorphism_theorem.
- Normal_subgroup wikiPageWikiLink Israel_Nathan_Herstein.
- Normal_subgroup wikiPageWikiLink Kernel_(algebra).
- Normal_subgroup wikiPageWikiLink Lattice_(order).
- Normal_subgroup wikiPageWikiLink Logical_equivalence.
- Normal_subgroup wikiPageWikiLink Malnormal_subgroup.
- Normal_subgroup wikiPageWikiLink Modular_lattice.
- Normal_subgroup wikiPageWikiLink Modular_subgroup.
- Normal_subgroup wikiPageWikiLink Orthogonal_group.
- Normal_subgroup wikiPageWikiLink Paranormal_subgroup.
- Normal_subgroup wikiPageWikiLink Perfect_group.
- Normal_subgroup wikiPageWikiLink Polynormal_subgroup.
- Normal_subgroup wikiPageWikiLink Pronormal_subgroup.
- Normal_subgroup wikiPageWikiLink Quasinormal_subgroup.
- Normal_subgroup wikiPageWikiLink Quotient_group.
- Normal_subgroup wikiPageWikiLink Rubiks_Cube_group.
- Normal_subgroup wikiPageWikiLink Seminormal_subgroup.
- Normal_subgroup wikiPageWikiLink Simple_group.
- Normal_subgroup wikiPageWikiLink Subgroup.
- Normal_subgroup wikiPageWikiLink Subnormal_subgroup.
- Normal_subgroup wikiPageWikiLink Subset.
- Normal_subgroup wikiPageWikiLink T-group_(mathematics).
- Normal_subgroup wikiPageWikiLink Transitive_relation.
- Normal_subgroup wikiPageWikiLink Translation_(geometry).
- Normal_subgroup wikiPageWikiLink Union_(set_theory).
- Normal_subgroup wikiPageWikiLink Up_to.
- Normal_subgroup wikiPageWikiLink Évariste_Galois.
- Normal_subgroup wikiPageWikiLinkText "Normal subgroup".
- Normal_subgroup wikiPageWikiLinkText "normal subgroup".
- Normal_subgroup wikiPageWikiLinkText "normal".
- Normal_subgroup wikiPageWikiLinkText "normality".
- Normal_subgroup title "normal subgroup".
- Normal_subgroup urlname "NormalSubgroup".
- Normal_subgroup wikiPageUsesTemplate Template:Group_theory_sidebar.
- Normal_subgroup wikiPageUsesTemplate Template:MathWorld.
- Normal_subgroup wikiPageUsesTemplate Template:More_inline.
- Normal_subgroup wikiPageUsesTemplate Template:Multicol.
- Normal_subgroup wikiPageUsesTemplate Template:Multicol-break.
- Normal_subgroup wikiPageUsesTemplate Template:Multicol-end.
- Normal_subgroup wikiPageUsesTemplate Template:Redirect-distinguish.
- Normal_subgroup wikiPageUsesTemplate Template:Reflist.
- Normal_subgroup subject Category:Subgroup_properties.
- Normal_subgroup hypernym Subgroup.
- Normal_subgroup type EthnicGroup.
- Normal_subgroup type Property.
- Normal_subgroup type Redirect.
- Normal_subgroup type Thing.
- Normal_subgroup comment "In abstract algebra, a normal subgroup is a subgroup which is invariant under conjugation by members of the group of which it is a part. In other words, a subgroup H of a group G is normal in G if and only if gH = Hg for all g in G, i.e., the sets of left and right cosets coincide. Normal subgroups (and only normal subgroups) can be used to construct quotient groups from a given group.Évariste Galois was the first to realize the importance of the existence of normal subgroups.".
- Normal_subgroup label "Normal subgroup".
- Normal_subgroup differentFrom Fully_characteristic_subgroup.
- Normal_subgroup sameAs Q743179.
- Normal_subgroup sameAs Нармальная_падгрупа.
- Normal_subgroup sameAs Нормална_група.
- Normal_subgroup sameAs Subgrup_normal.
- Normal_subgroup sameAs Normální_podgrupa.
- Normal_subgroup sameAs Normalteiler.
- Normal_subgroup sameAs Subgrupo_normal.