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• Compactification
  In [[general topology]], a '''compactification''' of a [[topological space]] is a [[compact space]] in which the original Formally, a compactification of a topological space ''X'' is a pair (''f'',''Y'') where ''Y'' is a compa
  2 KB (350 words) - 00:48, 18 February 2009
• Compactification/Definition
  121 bytes (19 words) - 17:30, 5 January 2009
• One-point compactification
  #REDIRECT [[Compactification]]
  30 bytes (2 words) - 02:50, 30 December 2008
• Stone-Čech compactification
  #REDIRECT [[Compactification]]
  30 bytes (2 words) - 02:51, 30 December 2008
• Compactification/Related Articles
  Auto-populated based on [[Special:WhatLinksHere/Compactification]]. Needs checking by a human.
  455 bytes (57 words) - 15:35, 11 January 2010

Page text matches

• One-point compactification
  #REDIRECT [[Compactification]]
  30 bytes (2 words) - 02:50, 30 December 2008
• Stone-Čech compactification
  #REDIRECT [[Compactification]]
  30 bytes (2 words) - 02:51, 30 December 2008
• Compactification
  In [[general topology]], a '''compactification''' of a [[topological space]] is a [[compact space]] in which the original Formally, a compactification of a topological space ''X'' is a pair (''f'',''Y'') where ''Y'' is a compa
  2 KB (350 words) - 00:48, 18 February 2009
• End (topology)
  ==Compactification==
  1 KB (250 words) - 01:07, 19 February 2009
• Compact space/Related Articles
  {{r|Compactification}}
  531 bytes (72 words) - 14:37, 31 October 2008
• Compactification/Related Articles
  Auto-populated based on [[Special:WhatLinksHere/Compactification]]. Needs checking by a human.
  455 bytes (57 words) - 15:35, 11 January 2010
• Product topology/Related Articles
  {{r|Compactification}}
  497 bytes (64 words) - 19:44, 11 January 2010
• Homeomorphism/Related Articles
  {{r|Compactification}}
  689 bytes (88 words) - 17:15, 11 January 2010
• Prime ends
  The '''prime end''' compactification is a method to compactify a topological disc (i.e. a simply connected open
  1 KB (224 words) - 09:13, 23 January 2009
• Hyperelliptic curve
  ...pan of the variables. The second compactification is the [[Deligne-Mumford compactification]] of the [[moduli of pointed curves]] <math>\overline{\mathcal{M}}_{0,n}</m * I. Dolgachev ''Invariant theory'' ISBN 0521525489 (binary forms compactification)
  9 KB (1,597 words) - 15:29, 4 December 2007
• Measure (mathematics)
  ...limit]]s, the dual of [[lp space|''L''^∞]] and the [[Stone-Čech compactification]]. All these are linked in one way or another to the [[axiom of choice]].
  14 KB (2,350 words) - 17:37, 10 November 2007