Difference between revisions of "Video/What is...representation theory?"
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According to this video, the main thesis of [[Representation Theory]] is the linear approximation of algebraic objects. It would be useful to refer to the [[Semi-tensor product]] as developed by [[Daizhan Cheng]]. See following references: | According to this video, the main thesis of [[Representation Theory]] is the linear approximation of algebraic objects. It would be useful to refer to the [[Semi-tensor product]]([[STP]]) as developed by [[Daizhan Cheng]]. See following references: | ||
# [[Book/Analysis and Control of Boolean Networks A Semi-tensor Product Approach|Analysis and Control of Boolean Networks A Semi-tensor Product Approach]]<ref>{{:Book/Analysis and Control of Boolean Networks A Semi-tensor Product Approach}}</ref> | # [[Book/Analysis and Control of Boolean Networks A Semi-tensor Product Approach|Analysis and Control of Boolean Networks A Semi-tensor Product Approach]]<ref>{{:Book/Analysis and Control of Boolean Networks A Semi-tensor Product Approach}}</ref> | ||
# [[Paper/A BRIEF TUTORIAL EXPOSITION OF SEMI-TENSOR PRODUCTS OF MATRICES|A BRIEF TUTORIAL EXPOSITION OF SEMI-TENSOR PRODUCTS OF MATRICES]]<ref>{{:Paper/A BRIEF TUTORIAL EXPOSITION OF SEMI-TENSOR PRODUCTS OF MATRICES}}</ref> | # [[Paper/A BRIEF TUTORIAL EXPOSITION OF SEMI-TENSOR PRODUCTS OF MATRICES|A BRIEF TUTORIAL EXPOSITION OF SEMI-TENSOR PRODUCTS OF MATRICES]]<ref>{{:Paper/A BRIEF TUTORIAL EXPOSITION OF SEMI-TENSOR PRODUCTS OF MATRICES}}</ref> | ||
=Theory of Groups of Finite Order= | |||
The end of this video extensively discusses the idea of [[William Burnside]]'s work on [[Book/Theory of Groups of Finite Order|Theory of Groups of Finite Order]]. | |||
Revision as of 23:21, 29 March 2022
Tubbenhauer, Daniel (Mar 30, 2022). What is...representation theory?. local page: VisualMath.
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According to this video, the main thesis of Representation Theory is the linear approximation of algebraic objects. It would be useful to refer to the Semi-tensor product(STP) as developed by Daizhan Cheng. See following references:
- Analysis and Control of Boolean Networks A Semi-tensor Product Approach[1]
- A BRIEF TUTORIAL EXPOSITION OF SEMI-TENSOR PRODUCTS OF MATRICES[2]
Theory of Groups of Finite Order
The end of this video extensively discusses the idea of William Burnside's work on Theory of Groups of Finite Order.
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.
- ↑ Rushdi, Ali Muhammad; Ghaleb, Fares (August 28, 2017). "A BRIEF TUTORIAL EXPOSITION OF SEMI-TENSOR PRODUCTS OF MATRICES". local page: Research Gate.