ScienceDirect - Annals of Physics : Wavefunctions for topological quantum registers

Annals of Physics
Volume 322, Issue 1, January 2007, Pages 201-235
January Special Issue 2007

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doi:10.1016/j.aop.2006.07.015

Wavefunctions for topological quantum registers

E. Ardonne^a^,^b^,^, and K. Schoutens^c

^aMicrosoft station Q, Kavli Institute for Theoretical Physics, University of California, Santa Barbara, CA 93106, USA ^bCenter for the Physics of Information, California Institute of Technology, Pasadena, CA 91125, USA ^cInstitute for Theoretical Physics, Valckenierstraat 65, 1018 XE Amsterdam, The Netherlands

Received 18 June 2006;

accepted 24 July 2006.

Available online 4 October 2006.

References and further reading may be available for this article. To view references and further reading you must purchase this article.

Abstract

We present explicit wavefunctions for quasi-hole excitations over a variety of non-abelian quantum Hall states: the Read–Rezayi states with k greater-or-equal, slanted 3 clustering properties and a paired spin-singlet quantum Hall state. Quasi-holes over these states constitute a topological quantum register, which can be addressed by braiding quasi-holes. We obtain the braid properties by direct inspection of the quasi-hole wavefunctions. We establish that the braid properties for the paired spin-singlet state are those of ‘Fibonacci anyons’, and thus suitable for universal quantum computation. Our derivations in this paper rely on explicit computations in the parafermionic conformal field theories that underly these particular quantum Hall states.

Article Outline

1. Introduction
2. General form of quasi-hole wavefunctions
3. Quasi-hole wavefunctions for the k = 3 Read–Rezayi states 3.1. The CFT formulation 3.2. The quasi-hole wavefunctions 3.3. Braid behaviour
4. Quasi-hole wavefunctions for a paired spin-singlet state 4.1. A paired spin-singlet quantum Hall state 4.2. The CFT formulation 4.3. Evaluating quasi-hole wavefunctions 4.3.1. The case n₃ = 4 4.3.2. The case n_↑ = n_↓ = 2 4.3.3. The case n_↑ = 4 4.3.4. The case n_↑ = 3, n_↓ = 1 4.4. Braiding relations
5. Quantum group approach 5.1. The case su (2)_k 5.2. The case su (3)₂ 5.3. su (3)₂ parafermion correlators
Acknowledgements
Appendix A. Detailed structure of the su (2)_k parafermion theory
Appendix B. Detailed structure of the su (3)₂ parafermion theory
References

Annals of Physics
Volume 322, Issue 1, January 2007, Pages 201-235
January Special Issue 2007

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