Talk:Measure (mathematics): Difference between revisions
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imported>Aleksander Halicz (remarks) |
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It is really enjoyable for a non mathematiciation to see this here, and easy to read too [[User:David Tribe|David Tribe]] 16:27, 25 January 2007 (CST) | It is really enjoyable for a non mathematiciation to see this here, and easy to read too [[User:David Tribe|David Tribe]] 16:27, 25 January 2007 (CST) | ||
== remarks == | |||
Just a few thoughts to remember (how to reorganize this) | |||
* separate particular examples from general classes (now Dirac measure is at the same logical level as Borel or Radon measure) | |||
* sigma-finite and completeness are more or less at the same logical level (classes of measures) | |||
*counterexamples should be moved to the lead to give some motivation or explication for the need of the sigma-algebras. | |||
* application - it would be nice to mention that some basic probability theory may be viewed as a direct application of the measure theory (identifying basic correspondence, definition of probability, types of convergence etc) | |||
[[User:Aleksander Halicz|Aleksander Halicz]] 03:38, 7 February 2007 (CST) | |||
Revision as of 03:38, 7 February 2007
It is really enjoyable for a non mathematiciation to see this here, and easy to read too David Tribe 16:27, 25 January 2007 (CST)
remarks
Just a few thoughts to remember (how to reorganize this)
- separate particular examples from general classes (now Dirac measure is at the same logical level as Borel or Radon measure)
- sigma-finite and completeness are more or less at the same logical level (classes of measures)
- counterexamples should be moved to the lead to give some motivation or explication for the need of the sigma-algebras.
- application - it would be nice to mention that some basic probability theory may be viewed as a direct application of the measure theory (identifying basic correspondence, definition of probability, types of convergence etc)
Aleksander Halicz 03:38, 7 February 2007 (CST)