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• Georg Cantor
  511 bytes (72 words) - 13:06, 16 March 2011
• Georg Cantor/Definition
  150 bytes (17 words) - 13:07, 16 March 2011
• Georg Cantor/Related Articles
  827 bytes (133 words) - 13:07, 16 March 2011

Page text matches

• Cardinal number/Related Articles
  {{r|Georg Cantor}}
  370 bytes (47 words) - 17:50, 26 June 2009
• Cantor's diagonal argument/Definition
  Proof due to Georg Cantor showing that there are uncountably many sets of natural numbers.
  126 bytes (18 words) - 16:27, 26 July 2008
• Schröder-Bernstein theorem/Bibliography
  Georg Cantor, ''Beiträge zur Begründung der transfinitien Mengenlehre. (Erster Artikel <br>&nbsp; Georg Cantor, ''Gesammelte Abhandlungen''. Herausgegeben von Ernst Zermelo. Berlin, 1932
  2 KB (256 words) - 08:18, 20 October 2010
• Cantor's diagonal argument/Related Articles
  {{r|Georg Cantor}}
  307 bytes (44 words) - 16:27, 26 July 2008
• Cantor set/Related Articles
  {{r|Georg Cantor}}
  338 bytes (47 words) - 14:45, 26 July 2008
• Transfinite number
  The term was first used by [[Georg Cantor]] when he discovered different "sizes" of the infinite.
  495 bytes (72 words) - 18:31, 20 June 2009
• Set theory/Related Articles
  {{r|Georg Cantor}}
  477 bytes (65 words) - 07:22, 22 July 2011
• Galileo's paradox
  ...e when applied to [[infinity|infinite]] sets. In the nineteenth century [[Georg Cantor|Cantor]], using the same methods, showed that while Galileo's result was co
  1 KB (198 words) - 01:29, 12 July 2008
• Set (mathematics)/Related Articles
  {{r|Georg Cantor}}
  507 bytes (65 words) - 07:17, 22 July 2011
• Schröder-Bernstein theorem
  {{Image|Cantor1895.MA46.484-BC.jpg|right|600px|Georg Cantor (1895) states the theorem (B.)}} * '''1895''' [[Georg Cantor]] states the theorem in his first paper on set theory and transfinite numbe
  8 KB (1,281 words) - 15:39, 23 September 2013
• Schröder-Bernstein theorem/Citable Version
  {{Image|Cantor1895.MA46.484-BC.jpg|right|600px|Georg Cantor (1895) states the theorem (B.)}} * '''1895''' [[Georg Cantor]] states the theorem in his first paper on set theory and transfinite numbe
  8 KB (1,275 words) - 15:34, 23 September 2013
• Cardinality
  [[Georg Cantor]], when investigating subsets of the real line, discovered
  2 KB (347 words) - 18:14, 26 June 2009
• Aleph-0
  [[Georg Cantor]], who first introduced these numbers,
  1 KB (214 words) - 13:35, 6 July 2009
• Continuum hypothesis
  This statement was first made by [[Georg Cantor]] (1877) when he studied subsets of the real line. == Georg Cantor 1877 ==
  8 KB (1,289 words) - 20:20, 15 July 2009
• Topology
  ...n topology depends strongly on the ideas of [[set theory]], developed by [[Georg Cantor]] in the later part of the 19th century. [[Henri Poincaré]] published Anal
  1 KB (206 words) - 14:09, 29 December 2008
• Kurt Gödel
  ...ut less well known) was his work in [[set theory]], where he proved that [[Georg Cantor]]'s puzzling [[Continuum Hypothesis]] was consistent with the [[Axiom of Ch
  3 KB (375 words) - 15:26, 11 May 2011
• Countable set/Citable Version
  was first observed by [[Georg Cantor]] late in the nineteenth century when he studied sets of real numbers.
  10 KB (1,462 words) - 17:24, 25 August 2013
• Countable set
  was first observed by [[Georg Cantor]] late in the nineteenth century when he studied sets of real numbers.
  10 KB (1,462 words) - 17:25, 25 August 2013
• Continuum hypothesis/Bibliography
  <br> Georg Cantor, ''Ein Beitrag zur Mannigfaltigkeitslehre''.
  4 KB (568 words) - 15:50, 14 July 2009
• Bijective function
  ...lements if and only if there exists a bijection from one set to another. [[Georg Cantor]] generalized this simple observation to [[infinite set]]s and introduced t
  4 KB (618 words) - 22:24, 7 February 2010