Difference between revisions of "Representable Functor"
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{{WikiEntry|key=Representable Functor|qCode=386320}} often related to the idea of '''representability''', is a mathematical idea that all data types can be uniquely referenced onto a set-based representation, meaning that all data entries can be mapped onto a unique entry in a set. | {{WikiEntry|key=Representable Functor|qCode=386320}} often related to the idea of '''representability''', is a mathematical idea that all data types can be uniquely referenced onto a set-based representation, meaning that all data entries can be mapped onto a unique entry in a set. | ||
=Representable Data in Physical Reality= | |||
The way to represent concepts or ideas in symbolically precise terms can borrow the experience from [[Mathematics]] and [[Physics]]<ref>{{:Video/Mathematical Foundations of Quantum Mechanics — Ch. 1: Why Linear Algebra?}}</ref>. | |||
<noinclude> | |||
=References= | |||
<references/> | |||
=Related Pages= | |||
[[Category:Category Theory]] | [[Category:Category Theory]] | ||
[[Category:Representable Functor]] | [[Category:Representable Functor]] | ||
</noinclude> | |||
Latest revision as of 09:14, 6 May 2022
Representable Functor(Q386320) often related to the idea of representability, is a mathematical idea that all data types can be uniquely referenced onto a set-based representation, meaning that all data entries can be mapped onto a unique entry in a set.
Representable Data in Physical Reality
The way to represent concepts or ideas in symbolically precise terms can borrow the experience from Mathematics and Physics[1].
References
- ↑ Sandoval, Brandon (Nov 24, 2021). Quantum Sense, ed. Mathematical Foundations of Quantum Mechanics — Ch. 1: Why Linear Algebra?. local page: Quantum Sense.