Pivoting makes the ZX-calculus complete for real stabilizers

Duncan, Ross and Perdrix, Simon (2014) Pivoting makes the ZX-calculus complete for real stabilizers. Electronic Proceedings in Theoretical Computer Science, 171. pp. 50-62. ISSN 2075-2180 (https://doi.org/10.4204/EPTCS.171.5)

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Abstract

We show that pivoting property of graph states cannot be derived from the axioms of the ZX-calculus, and that pivoting does not imply local complementation of graph states. Therefore the ZX-calculus augmented with pivoting is strictly weaker than the calculus augmented with the Euler decomposition of the Hadamard gate. We derive an angle-free version of the ZX-calculus and show that it is complete for real stabilizer quantum mechanics.

ORCID iDs

Duncan, Ross ORCID: https://orcid.org/0000-0001-6758-1573

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• Item metadata

  Item type:	Article
  ID code:	54746
  Dates:	Date Event 27 December 2014 Published
  Subjects:	Science > Mathematics > Electronic computers. Computer science
  Department:	Faculty of Science > Computer and Information Sciences
  Depositing user:	Pure Administrator
  Date deposited:	11 Dec 2015 01:25
  Last modified:	11 Nov 2024 11:14
  Related URLs:	http://eptcs.web.cse.unsw.edu.au/paper.c...
  URI:	https://strathprints.strath.ac.uk/id/eprint/54746