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• Group theory
  == History of group theory == ...are not solvable. This is one of the first important results to arise from group theory. The fact that <math>S_5</math> is not solvable gives a proof that there is
  15 KB (2,535 words) - 20:29, 14 February 2010
• Group theory/Approval
  12 bytes (1 word) - 16:02, 26 September 2007
• Group theory/Definition
  121 bytes (15 words) - 08:25, 4 September 2009
• Exponent (group theory)
  #REDIRECT [[Order (group theory)]]
  34 bytes (4 words) - 17:56, 21 November 2008
• Group theory/Bibliography
  ...m Magnus | coauthors=Abraham Karrass, Donald Solitar | title=Combinatorial Group Theory | edition=2nd revised edition | publisher=[[Dover Publications]] | date=197
  1 KB (137 words) - 02:15, 29 November 2008
• Character (group theory)
  In [[group theory]], a '''character''' may refer one of two related concepts: a [[group homom
  680 bytes (98 words) - 06:19, 15 June 2009
• Series (group theory)
  In [[group theory]], a '''series''' is a [[chain (mathematics)]] of [[subgroup]]s of a [[grou
  1 KB (198 words) - 17:19, 6 December 2008
• Center (group theory)
  31 bytes (5 words) - 12:35, 8 November 2008
• Order (group theory)
  In [[group theory]], the '''order''' of a [[group (mathematics)|group]] element is the least
  857 bytes (146 words) - 13:24, 1 February 2009
• Conjugation (group theory)
  In [[group theory]], '''conjugation''' is an operation between group elements. The '''conjug
  2 KB (294 words) - 04:53, 19 November 2008
• Conjugation (group theory)/Bibliography
  297 bytes (38 words) - 17:41, 20 November 2008
• Bona fide group theory
  901 bytes (116 words) - 19:33, 1 March 2008
• Bona Fide Group Theory
  #REDIRECT [[Bona fide group theory]]
  36 bytes (5 words) - 19:33, 1 March 2008
• Series (group theory)/Definition
  105 bytes (15 words) - 17:22, 6 December 2008
• Character (group theory)/Definition
  140 bytes (20 words) - 19:59, 7 February 2009
• Group theory/Related Articles
  Auto-populated based on [[Special:WhatLinksHere/Group theory]]. Needs checking by a human. {{r|Character (group theory)}}
  1 KB (180 words) - 17:00, 11 January 2010
• Order (group theory)/Definition
  199 bytes (32 words) - 17:17, 20 November 2008
• Conjugation (group theory)/Definition
  110 bytes (15 words) - 06:26, 4 September 2009
• Bona fide group theory/Definition
  141 bytes (19 words) - 23:06, 14 September 2009
• Bona Fide Group Theory/Approval
  12 bytes (1 word) - 21:06, 21 December 2007

Page text matches

• Group theory/Related Articles
  Auto-populated based on [[Special:WhatLinksHere/Group theory]]. Needs checking by a human. {{r|Character (group theory)}}
  1 KB (180 words) - 17:00, 11 January 2010
• Abstract algebra/Related Articles
  {{r|Group theory}}
  654 bytes (81 words) - 13:36, 29 November 2008
• Cyclic group
  In [[group theory]], a '''cyclic group''' is a [[group]] with a single generator. The elemen
  362 bytes (57 words) - 20:28, 31 January 2009
• Group (mathematics)/Related Articles
  * [[Glossary of group theory]] * [[Elementary group theory]]
  890 bytes (130 words) - 11:11, 13 February 2009
• Centre of a group
  In [[group theory]], the '''centre of a group''' is the subset of elements which [[commutativ ...tic]]. It may be described as the set of elements by which [[conjugation (group theory)|conjugation]] is trivial (the identity map); this shows the centre as the
  785 bytes (114 words) - 11:29, 13 February 2009
• Normaliser
  ...ll group elements which map the given subgroup to itself by [[Conjugation (group theory)|conjugation]].
  511 bytes (84 words) - 12:24, 29 December 2008
• Baer-Specker group
  In [[mathematics]], in the field of [[group theory]], the '''Baer-Specker group''', or '''Specker group''' is an example of an * {{cite book | author=Phillip A. Griffith | title=Infinite Abelian group theory | series=Chicago Lectures in Mathematics | publisher=University of Chicago
  1 KB (151 words) - 16:18, 4 January 2013
• Conjugacy
  In [[group theory]], '''conjugacy''' is the relation between elements of a group that states ...d by [[Max Dehn]] in 1911 as one of three fundamental decision problems in group theory; the other two being the [[group isomorphism problem]] and the [[word probl
  802 bytes (124 words) - 01:13, 18 February 2009
• Group homomorphism/Related Articles
  {{r|Character (group theory)}} {{r|Group theory}}
  762 bytes (99 words) - 17:00, 11 January 2010
• Order (mathematics)
  {{r|Order (group theory)}}
  248 bytes (33 words) - 17:37, 14 April 2010
• Derived group
  #REDIRECT [[Commutator#Group theory]]
  37 bytes (4 words) - 12:27, 8 November 2008
• Exponent (group theory)
  #REDIRECT [[Order (group theory)]]
  34 bytes (4 words) - 17:56, 21 November 2008
• Normal series
  #REDIRECT [[Series (group theory)]]
  35 bytes (4 words) - 13:05, 8 November 2008
• Exponent of a group
  #REDIRECT [[Order (group theory)]]
  34 bytes (4 words) - 07:44, 15 November 2008
• Invariant series
  #REDIRECT [[Series (group theory)]]
  35 bytes (4 words) - 13:06, 8 November 2008
• Subinvariant series
  #REDIRECT [[Series (group theory)]]
  35 bytes (4 words) - 13:07, 8 November 2008
• Subnormal series
  #REDIRECT [[Series (group theory)]]
  35 bytes (4 words) - 13:12, 8 November 2008
• Commutator subgroup
  #REDIRECT [[Commutator#Group theory]]
  37 bytes (4 words) - 12:25, 8 November 2008
• Residual property (mathematics)
  In the [[mathematics|mathematical]] field of [[group theory]], a group is '''residually ''X''''' (where ''X'' is some property of group
  959 bytes (139 words) - 15:07, 28 October 2008
• Conjugacy/Definition
  In group theory, this describes the relation between elements of a group that states that o
  168 bytes (26 words) - 01:13, 18 February 2009