Difference between revisions of "Adjoint Functors"
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Adjoint Functors are dual mathematical constructs that are dedicated to teasing out the notion of [[symmetry]] and [[symmetry-breaking]] in the language of [[Category Theory]]. | Adjoint Functors are dual mathematical constructs that are dedicated to teasing out the notion of [[symmetry]] and [[symmetry-breaking]] in the language of [[Category Theory]]. | ||
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=References= | |||
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=Related Pages= | |||
[[Category:Symmetry]] | |||
[[Category:Category Theory]] | |||
[[Category:Invariance]] | |||
[[Category:Equivalence]] | |||
[[Category:Adjuctions]] | |||
[[Category:Self Reference]] | |||
[[Category:Isomorphism]] | |||
{{SemanticMarker | |||
|category=Category Theory | |||
}} | |||
</noinclude> | |||
Latest revision as of 07:43, 15 June 2022
Adjoint Functors are dual mathematical constructs that are dedicated to teasing out the notion of symmetry and symmetry-breaking in the language of Category Theory.
References
Related Pages
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Last Edited: 15 Jun 2022
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