Qutrit Dichromatic Calculus and Its Universality

Qutrit Dichromatic Calculus and Its Universality

We introduce a dichromatic calculus (RG) for qutrit systems. We show that the decomposition of the qutrit Hadamard gate is non-unique and not derivable from the dichromatic calculus. As an application of the dichromatic calculus, we depict a quantum algorithm with a single qutrit. Since it is not ea...

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Main Authors: Quanlong Wang, Xiaoning Bian
Format: Article
Language:English
Published: Open Publishing Association 2014-12-01
Series:Electronic Proceedings in Theoretical Computer Science
Online Access:http://arxiv.org/pdf/1406.3056v3
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spelling doaj-1b98c0ad66614139b7242bbb790955ae2020-11-24T21:16:03ZengOpen Publishing AssociationElectronic Proceedings in Theoretical Computer Science2075-21802014-12-01172Proc. QPL 20149210110.4204/EPTCS.172.7:30Qutrit Dichromatic Calculus and Its UniversalityQuanlong Wang0Xiaoning Bian1 Beihang University Beihang University We introduce a dichromatic calculus (RG) for qutrit systems. We show that the decomposition of the qutrit Hadamard gate is non-unique and not derivable from the dichromatic calculus. As an application of the dichromatic calculus, we depict a quantum algorithm with a single qutrit. Since it is not easy to decompose an arbitrary d by d unitary matrix into Z and X phase gates when d > 2, the proof of the universality of qudit ZX calculus for quantum mechanics is far from trivial. We construct a counterexample to Ranchin's universality proof, and give another proof by Lie theory that the qudit ZX calculus contains all single qudit unitary transformations, which implies that qudit ZX calculus, with qutrit dichromatic calculus as a special case, is universal for quantum mechanics.http://arxiv.org/pdf/1406.3056v3
collection DOAJ
language English
format Article
sources DOAJ
author Quanlong Wang
Xiaoning Bian
spellingShingle Quanlong Wang
Xiaoning Bian
Qutrit Dichromatic Calculus and Its Universality
Electronic Proceedings in Theoretical Computer Science
author_facet Quanlong Wang
Xiaoning Bian
author_sort Quanlong Wang
title Qutrit Dichromatic Calculus and Its Universality
title_short Qutrit Dichromatic Calculus and Its Universality
title_full Qutrit Dichromatic Calculus and Its Universality
title_fullStr Qutrit Dichromatic Calculus and Its Universality
title_full_unstemmed Qutrit Dichromatic Calculus and Its Universality
title_sort qutrit dichromatic calculus and its universality
publisher Open Publishing Association
series Electronic Proceedings in Theoretical Computer Science
issn 2075-2180
publishDate 2014-12-01
description We introduce a dichromatic calculus (RG) for qutrit systems. We show that the decomposition of the qutrit Hadamard gate is non-unique and not derivable from the dichromatic calculus. As an application of the dichromatic calculus, we depict a quantum algorithm with a single qutrit. Since it is not easy to decompose an arbitrary d by d unitary matrix into Z and X phase gates when d > 2, the proof of the universality of qudit ZX calculus for quantum mechanics is far from trivial. We construct a counterexample to Ranchin's universality proof, and give another proof by Lie theory that the qudit ZX calculus contains all single qudit unitary transformations, which implies that qudit ZX calculus, with qutrit dichromatic calculus as a special case, is universal for quantum mechanics.
url http://arxiv.org/pdf/1406.3056v3
work_keys_str_mv AT quanlongwang qutritdichromaticcalculusanditsuniversality
AT xiaoningbian qutritdichromaticcalculusanditsuniversality
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