Difference between revisions of "Categorical quantum mechanics"
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{{WikiEntry|key=Categorical quantum mechanics|qCode=5051814}} is a formalism to represent [[quantum mechanics]] using [[Category Theory]], or pictorial diagrams as [[Bob Coecke]] formulated it. Due to its close relation to [[Linear Algebra]], it would be useful to relate this theoretical framework with [[Semi-Tensor Product]]<ref>{{:Book/Analysis and Control of Boolean Networks A Semi-tensor Product Approach}}</ref> invented by [[Daizhan Cheng]]. | {{WikiEntry|key=Categorical quantum mechanics|qCode=5051814}} is a formalism to represent [[quantum mechanics]] using [[Category Theory]], or pictorial diagrams as [[Bob Coecke]] formulated it. This idea can also be related to [[Feynman Diagram]]. Due to its close relation to [[Linear Algebra]], it would be useful to relate this theoretical framework with [[Semi-Tensor Product]]<ref>{{:Book/Analysis and Control of Boolean Networks A Semi-tensor Product Approach}}</ref> invented by [[Daizhan Cheng]]. | ||
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Revision as of 17:07, 26 February 2022
Categorical quantum mechanics(Q5051814) is a formalism to represent quantum mechanics using Category Theory, or pictorial diagrams as Bob Coecke formulated it. This idea can also be related to Feynman Diagram. Due to its close relation to Linear Algebra, it would be useful to relate this theoretical framework with Semi-Tensor Product[1] invented by Daizhan Cheng.
References
- ↑ Cheng, Daizhan; Qi, Hongsheng; Li, Zhiqiang (2011). Analysis and Control of Boolean Networks:A Semi-tensor Product Approach. local page: Springer-Verlag. ISBN 978-0-85729-097-7.