Difference between revisions of "Universal abstraction"
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==Category Theory== | ==Category Theory== | ||
[[Category Theory]]<ref>William Lawvere, Stephen Schanuel, Conceptual Mathematics: A first introduction to categories, 2nd Edition, Cambridge Press, 2009</ref> is the foundational reasoning mechanism to represent and infer decisions from data. | [[Category Theory]]<ref>William Lawvere, Stephen Schanuel, Conceptual Mathematics: A first introduction to categories, 2nd Edition, Cambridge Press, 2009</ref> is the foundational reasoning mechanism to represent and infer decisions from data. It provides mathematics a universally grounded notation and encoding standard. It is a formal language based on one type of symbol, and one symbol type only, the [[arrow]], or [[hyperlink]]. | ||
==Hyperlink Relationships== | ==Hyperlink Relationships== | ||
Revision as of 06:53, 24 June 2021
The core essence of universal abstraction is expanding your scope of awareness to encompass as much content as possible, for the purpose of being able to do more with less. Simplicity allows for automation and scalability.
Page, Services, Files
Category Theory
Category Theory[1] is the foundational reasoning mechanism to represent and infer decisions from data. It provides mathematics a universally grounded notation and encoding standard. It is a formal language based on one type of symbol, and one symbol type only, the arrow, or hyperlink.
Hyperlink Relationships
Pulling { { } }
{ { Template : page name } } = { { transclusion : transclusion name } }
Pushing [ [ ] ]
[ [ Property name : : Property value ] ] = [ [ predicate : : subject ] ]
Properties can assign varying datatypes
[ [ Category : page name ] ] = [ [ hierarchy : classification ] ]
References
- ↑ William Lawvere, Stephen Schanuel, Conceptual Mathematics: A first introduction to categories, 2nd Edition, Cambridge Press, 2009