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• Characteristic subgroup
  Any characteristic subgroup of a group is [[normal subgroup|normal]], but the converse does not always ...haracteristic subgroup. Thus, for instance, the [[centre of a group]] is a characteristic subgroup. The center is defined as the set of elements that commute with all element
  2 KB (358 words) - 02:37, 18 November 2008
• Characteristic subgroup/Approval
  12 bytes (1 word) - 05:05, 26 September 2007
• Characteristic subgroup/Definition
  112 bytes (17 words) - 16:19, 6 November 2008
• Characteristic subgroup/Bibliography
  138 bytes (18 words) - 17:04, 6 November 2008
• Characteristic subgroup/Related Articles
  656 bytes (94 words) - 12:34, 8 November 2008

Page text matches

• Characteristic (mathematics)
  {{r|Characteristic subgroup}}
  191 bytes (21 words) - 12:52, 31 May 2009
• Frattini subgroup
  ...attini is a [[subgroup]], which is [[normal subgroup|normal]] and indeed [[characteristic subgroup|characteristic]].
  583 bytes (84 words) - 05:33, 22 January 2009
• Characteristic subgroup
  Any characteristic subgroup of a group is [[normal subgroup|normal]], but the converse does not always ...haracteristic subgroup. Thus, for instance, the [[centre of a group]] is a characteristic subgroup. The center is defined as the set of elements that commute with all element
  2 KB (358 words) - 02:37, 18 November 2008
• Fully invariant subgroup
  #REDIRECT [[Characteristic subgroup]]
  37 bytes (3 words) - 02:38, 18 November 2008
• Centre of a group
  ...centre is a [[subgroup]], which is [[normal subgroup|normal]] and indeed [[characteristic subgroup|characteristic]]. It may be described as the set of elements by which [[co
  785 bytes (114 words) - 11:29, 13 February 2009
• Frattini subgroup/Related Articles
  {{r|Characteristic subgroup}}
  483 bytes (61 words) - 16:40, 11 January 2010
• Commutator
  ...th> or <math>[G,G]</math>. It is [[normal subgroup|normal]] and indeed [[characteristic subgroup|characteristic]] and the quotient ''G''/[''G'',''G''] is [[Abelian group|ab
  1 KB (217 words) - 15:16, 11 December 2008
• Subgroup/Related Articles
  {{r|Characteristic subgroup}}
  997 bytes (156 words) - 14:41, 14 November 2008
• Normal subgroup
  A [[characteristic subgroup]] of a group is a subgroup which is invariant under all [[automorphism of a
  5 KB (785 words) - 09:22, 30 July 2009
• Group theory/Related Articles
  {{r|Characteristic subgroup}}
  1 KB (180 words) - 17:00, 11 January 2010
• Group homomorphism/Related Articles
  {{r|Characteristic subgroup}}
  762 bytes (99 words) - 17:00, 11 January 2010
• Normal subgroup/Related Articles
  {{r|Characteristic subgroup}}
  872 bytes (138 words) - 15:32, 14 November 2008
• Subgroup
  {{r|Characteristic subgroup}}
  4 KB (631 words) - 07:56, 15 November 2008
• Automorphism/Related Articles
  {{r|Characteristic subgroup}}
  525 bytes (65 words) - 11:10, 11 January 2010
• Group theory
  ...center]] of the group. The inner automorphism subgroup is normal, indeed [[characteristic subgroup|characteristic]], inside <math>Aut(G)</math>, and the quotient group <math>
  15 KB (2,535 words) - 20:29, 14 February 2010