Search results
Jump to navigation
Jump to search
Page title matches
- The '''Cantor set''' is a set that may be generated by removing the middle third of a [[line The Cantor set may be considered a [[topological space]], [[homeomorphism|homeomorphic]] t2 KB (306 words) - 16:51, 31 January 2011
- 12 bytes (1 word) - 23:33, 21 December 2007
- | pagename = Cantor set | abc = Cantor set967 bytes (108 words) - 07:59, 15 March 2024
- 12 bytes (1 word) - 05:03, 7 January 2008
- 163 bytes (23 words) - 14:36, 26 July 2008
- 338 bytes (47 words) - 14:45, 26 July 2008
Page text matches
- The '''Cantor set''' is a set that may be generated by removing the middle third of a [[line The Cantor set may be considered a [[topological space]], [[homeomorphism|homeomorphic]] t2 KB (306 words) - 16:51, 31 January 2011
- | pagename = Cantor set | abc = Cantor set967 bytes (108 words) - 07:59, 15 March 2024
- {{r|Cantor set}}504 bytes (66 words) - 19:06, 11 January 2010
- {{r|Cantor set}}502 bytes (64 words) - 17:06, 11 January 2010
- {{r|Cantor set}}689 bytes (88 words) - 17:15, 11 January 2010
- ...examples of [[subset]]s of the real line with unusual properties — these [[Cantor set]]s are also now recognised as fractals. Iterated functions in the [[complex A relatively simple class of examples is given by the [[Cantor set]]s, [[Sierpinski triangle]] and [[Sierpinski carpet|carpet]], [[Menger spon14 KB (2,043 words) - 12:19, 11 June 2009
- * The [[Cantor set]]3 KB (379 words) - 13:22, 6 January 2013
- ...ntervals. The intersection of all the intermediate steps is the mid-third Cantor set. Obviously this is the fixed-point set under the two maps: ''S''<sub>1</su15 KB (2,549 words) - 09:18, 17 February 2012