Difference between revisions of "ZX-calculus"
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{{WikiEntry|key=ZX-calculus|qCode=63888551}} is a graphical language for quantum processes. There is a website:[https://zxcalculus.com/ zxcalculus.com] on this subject matter. | {{WikiEntry|key=ZX-calculus|qCode=63888551}} is a graphical language for quantum processes. | ||
=Some Useful Tutorials= | |||
There is a website:[https://zxcalculus.com/ zxcalculus.com] on this subject matter. It contains the following sections: | |||
# [https://zxcalculus.com/intro.html Tutorial Section] | |||
# [https://zxcalculus.com/pyzx.html PyZX Demo Section] | |||
# [https://zxcalculus.com/map.html ZX-calculus Info Map] | |||
=A Textbook on ZX-calculus= | |||
[[Bob Coecke]]'s book on [[Book/Picturing Quantum Processes|Picturing Quantum Processes]]<ref name="PQP">{{:Book/Picturing Quantum Processes}}</ref> has section 9.4<ref extends="PQP">Section 9.4 '''ZX-Calculus''', p.581~P.610</ref> dedicated on [[ZX-calculus]]. | |||
==ZX-calculus is Universal== | |||
In section 9.4.5<ref extends="PQP">Section 9.4.5 '''ZX for the God(esse)s:Completeness''', p.601~p.608</ref> of this book, the notion of [[universality]] is discussed, and this section contains proofs. | |||
<noinclude> | |||
=References= | |||
<references/> | |||
=Related Pages= | |||
[[Category:Categorical Quantum Mechanics]] | [[Category:Categorical Quantum Mechanics]] | ||
[[Category:Universality]] | |||
[[Category:Visual Programming]] | |||
</noinclude> |
Latest revision as of 14:39, 19 March 2022
ZX-calculus(Q63888551) is a graphical language for quantum processes.
Some Useful Tutorials
There is a website:zxcalculus.com on this subject matter. It contains the following sections:
A Textbook on ZX-calculus
Bob Coecke's book on Picturing Quantum Processes[1] has section 9.4Cite error: Invalid <ref>
tag; invalid names, e.g. too many dedicated on ZX-calculus.
ZX-calculus is Universal
In section 9.4.5Cite error: Invalid <ref>
tag; invalid names, e.g. too many of this book, the notion of universality is discussed, and this section contains proofs.
References
- ↑ Coecke, Bob; Kissinger, Aleks (2017). Picturing Quantum Processes. local page: Cambridge University Press. ISBN 978-1316219317.