Difference between revisions of "Monoidal category"

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{{WikiEntry|key=Monoidal category|qCode=1945014}} is a category that admits [[tensor product]]s. It is an important construct that has significant applications in various fields. In particularly, [[Bob Coecke]]'s work on [[Book/Picturing Quantum Processes|Picturing Quantum Processes]]<ref>{{:Book/Picturing Quantum Processes}}</ref> and [[Quantum Natural Language Processing]]<ref>{{:Video/Bob Coecke, From Quantum Linguistics to Spacetime Linguistics, and Cognition}}</ref> make extensive use of [[Monoidal Category]]. That means it has direct application to compilation and interpretation of complex information systems, that covers almost any engineered system of practical interesting. [[Richard Borcherds]] has a video on [[Monoidal Category]]<ref>{{:Video/Categories 6 Monoidal categories}}</ref>.  
{{WikiEntry|key=Monoidal category|qCode=1945014}} is a category that admits [[tensor product]]s. It is an important construct that has significant applications in various fields. In particularly, [[Bob Coecke]]'s work on [[Book/Picturing Quantum Processes|Picturing Quantum Processes]]<ref>{{:Book/Picturing Quantum Processes}}</ref> and [[Quantum Natural Language Processing]]<ref>{{:Video/Bob Coecke, From Quantum Linguistics to Spacetime Linguistics, and Cognition}}</ref> make extensive use of [[Monoidal Category]]. That means it has direct application to compilation and interpretation of complex information systems, that covers almost any engineered system of practical interesting. [[Richard Borcherds]] has a video on [[Monoidal Category]]<ref>{{:Video/Categories 6 Monoidal categories}}</ref>.  
=Monoidal Category as a Two Dimensional Algebra?=
=Monoidal Category as a Two Dimensional Algebra?=
[[Daniel Tubbenhauer]]'s [[VisualMath]] also has a video on [[Video/What are…monoidal categories?|What are…monoidal categories?]]<ref>{{:Video/What are…monoidal categories?}}</ref>. At the end of the video, he stated that [[Monoidal Category]] can be used as a way to model a Two-Dimensional Algebra.
{{:Monoidal Category as a Two Dimensional Algebra}}
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There are a few variations of monoidal categories:
There are a few variations of monoidal categories:
=Symmetrical Monoidal Category=
=Symmetrical Monoidal Category=



Revision as of 09:53, 20 March 2022

Monoidal category(Q1945014) is a category that admits tensor products. It is an important construct that has significant applications in various fields. In particularly, Bob Coecke's work on Picturing Quantum Processes[1] and Quantum Natural Language Processing[2] make extensive use of Monoidal Category. That means it has direct application to compilation and interpretation of complex information systems, that covers almost any engineered system of practical interesting. Richard Borcherds has a video on Monoidal Category[3].

Monoidal Category as a Two Dimensional Algebra?

Daniel Tubbenhauer's VisualMath also has a video on What are…monoidal categories?[4]. At the end of the video, he stated that Monoidal Category can be used as a way to model a Two-Dimensional Algebra.


Content related to Monoidal Category:

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There are a few variations of monoidal categories:

Symmetrical Monoidal Category

Braided Monoidal Category

References

Related Pages