Talk:Fuzzy subset: Difference between revisions
imported>Ragnar Schroder No edit summary |
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[[User:Ragnar Schroder|Ragnar Schroder]] 18:53, 30 June 2007 (CDT) | [[User:Ragnar Schroder|Ragnar Schroder]] 18:53, 30 June 2007 (CDT) | ||
==Suggested modification to the article== | |||
I think the article should start with a more gentle intro before diving into expert-flavored material like the '''axiom of comprehension'''. | |||
I suggest adding an intro like this, if you find it acceptable please paste it into the beginning of the article. | |||
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The term '''fuzzy subset''' is a generalization of the subset concept from [[set theory]]. | |||
In ordinary set theory, given a [[subset]] of a [[set]] there is always a "yes" or "no" answer to the question whether any specific element is in the subset. | |||
With fuzzy subsets, one replaces this "yes"/"no" distinction with a real number in [0,1], denoting the element's "degree of belonging" there. | |||
== Introduction to the notion of fuzzy subset == | |||
Given a well defined property ''P'' and a set ''S'', the axiom of comprehension ... | |||
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[[User:Ragnar Schroder|Ragnar Schroder]] 19:34, 30 June 2007 (CDT) |
Latest revision as of 12:34, 26 September 2007
Original content?
I *assumed* this article is original content, and does not originate from Wikipedia or somewhere like that.
Ragnar Schroder 18:53, 30 June 2007 (CDT)
Suggested modification to the article
I think the article should start with a more gentle intro before diving into expert-flavored material like the axiom of comprehension.
I suggest adding an intro like this, if you find it acceptable please paste it into the beginning of the article.
The term fuzzy subset is a generalization of the subset concept from set theory.
In ordinary set theory, given a subset of a set there is always a "yes" or "no" answer to the question whether any specific element is in the subset.
With fuzzy subsets, one replaces this "yes"/"no" distinction with a real number in [0,1], denoting the element's "degree of belonging" there.
Introduction to the notion of fuzzy subset
Given a well defined property P and a set S, the axiom of comprehension ...
Ragnar Schroder 19:34, 30 June 2007 (CDT)