Wiki vs Category - What's the difference?
wiki | category |
A collaborative website which can be directly edited merely by using a web browser, often by anyone with access to it.
To research on Wikipedia or some similar wiki.
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To conduct research on a wiki.
To contribute to a wiki.
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To participate in the wiki-based production of.
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A group, often named or numbered, to which items are assigned based on similarity or defined criteria.
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(mathematics) A collection of objects, together with a transitively closed collection of composable arrows between them, such that every object has an identity arrow, and such that arrow composition is associative.
As a proper noun wiki
is (proscribed) wikipedia.As a noun category is
a group, often named or numbered, to which items are assigned based on similarity or defined criteria.wiki
English
(wikipedia wiki)Noun
(en noun)Derived terms
* interwikiVerb
(en verb)- To get an understanding of the topics, he quickly went online and wikied each one.
Derived terms
* wikify * wikiholic * wikilink * The names of many wiki-based Web projects, e.g. Wikipedia, Wikisource, ), (WikiLeaks), (Wikibooks), (Wikimedia Foundation).References
* * * Notes:Anagrams
* ----category
English
(wikipedia category)Noun
(categories)- The traditional way of describing the similarities and differences between constituents is to say that they belong to categories'' of various types. Thus, words like ''boy'', ''girl'', ''man'', ''woman'', etc. are traditionally said to belong to the category''' of Nouns, whereas words like ''a'', ''the'', ''this'', and ''that'' are traditionally said to belong to the ' category of Determiners.
- This steep and dangerous climb belongs to the most difficult category .
- I wouldn't put this book in the same category as the author's first novel.
- One well-known category has sets as objects and functions as arrows.
- Just as a monoid consists of an underlying set with a binary operation "on top of it" which is closed, associative and with an identity, a category consists of an underlying digraph with an arrow composition operation "on top of it" which is transitively closed, associative, and with an identity at each object. In fact, a category's composition operation, when restricted to a single one of its objects, turns that object's set of arrows (which would all be loops) into a monoid.