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- In the branch of [[mathematics]] known as [[measure theory]], the '''Caratheodory extension theorem''' states that a countably additive non-negative set function on an algebra <blockquote>(Caratheodory extension theorem) Let ''X'' be a set and <math>\mathcal{F}_0</math> be an algebra of subsets2 KB (324 words) - 16:34, 27 November 2008
- 12 bytes (1 word) - 20:26, 25 September 2007
- 125 bytes (17 words) - 16:42, 26 July 2008
- 282 bytes (38 words) - 16:42, 26 July 2008
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- In the branch of [[mathematics]] known as [[measure theory]], the '''Caratheodory extension theorem''' states that a countably additive non-negative set function on an algebra <blockquote>(Caratheodory extension theorem) Let ''X'' be a set and <math>\mathcal{F}_0</math> be an algebra of subsets2 KB (324 words) - 16:34, 27 November 2008
- {{r|Caratheodory extension theorem}}681 bytes (87 words) - 18:24, 11 January 2010
- {{r|Caratheodory extension theorem}}771 bytes (95 words) - 18:24, 11 January 2010
- {{r|Caratheodory extension theorem}}812 bytes (100 words) - 20:22, 11 January 2010
- * [[Caratheodory extension theorem]]14 KB (2,350 words) - 17:37, 10 November 2007
- See [[Caratheodory extension theorem]] for details.18 KB (2,797 words) - 14:37, 30 January 2011