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Quantum Error Correction And Reversible Operations

Gottesman, Phys. M. Cornell University Library We gratefully acknowledge support fromthe Simons Foundation and member institutions arXiv.org > quant-ph > arXiv:quant-ph/9811082 All papers Titles Authors Abstracts Full text Help pages (Help | Advanced search) A 54, 2629 (1996).PubMedGoogle Scholar11.C. Source

The system returned: (22) Invalid argument The remote host or network may be down. He received his Ph.D. Rev. Gerd Leuchs studied physics and mathematics at the University of Cologne and received his Ph.D. http://arxiv.org/abs/quant-ph/9811082

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P. H. In the past decade he has built up a research center for quantum information at the Institute for Algorithms and Cognitive Systems (IAKS). Please try the request again.

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A 54, 3824 (1996).PubMedGoogle Scholar12.E. https://books.google.com/books?id=XV9sAAAAQBAJ&pg=PA631&lpg=PA631&dq=Quantum+Error+Correction+And+Reversible+Operations&source=bl&ots=zr6MpainSP&sig=-GOqqXI__0Ssi_ogTiRf4m5dN7o&hl=en&sa=X&ved=0ahUKEwieo_CZgcTQAhUH0WMKHc Nielsen (1), Carlton M. The author also includes a derivation of well-known bounds on the parameters of quantum error correcting code. Part of Springer Nature.

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Olkin, Inequalities: Theory of Majorization and Its Applications (Academic, New York, 1979).Google ScholarCopyright information© Plenum Publishing Corporation 1999Authors and AffiliationsCarlton M. Caves11.Center for Advanced Studies, Department of Physics and AstronomyUniversity of New MexicoAlbuquerque About this However, the discovery of quantum error correction and the proof of the accuracy threshold theorem nearly ten years ago gave rise to extensive development and research aimed at creating a working, Appl. 10, 285 (1975).Google Scholar22.M. have a peek here The review provides an opportunity to introduce an efficient formalism for handling superoperators.

in 1978. Hellwig and K. London A 454, 385 (1998).Google Scholar15.E.

Caves (Submitted on 30 Nov 1998) Abstract: I give a pedagogical account of Shor's nine-bit code for correcting arbitrary errors on single qubits, and I review work that determines when it

Nielsen, C. Some bounds on entanglement fidelity, which might prove useful in analyses of approximate error correction, are presented and proved.quantum informationquantum computationdecoherencesuperoperatorsREFERENCES1.W. Schumacher, and H. Preskill, Proc.

Rev. Comments: 31 pages, REVTEX, one figure in LaTeX, submitted to Proceedings of the ITP Conference on Quantum Coherence and Decoherence Subjects: Quantum Physics (quant-ph) DOI: 10.1098/rspa.1998.0160 Citeas: arXiv:quant-ph/9706064 (or arXiv:quant-ph/9706064v1 Steane, Phys. http://johnlautner.net/quantum-error/quantum-error-correction-ppt.html Nielsen and C.

W. Journal of SuperconductivityDecember 1999, Volume 12, Issue 6, pp 707–718Quantum Error Correction and Reversible OperationsAuthorsAuthors and affiliationsCarlton M. CavesArticleDOI: 10.1023/A:1007720606911Cite this article as: Caves, C.M. A prescription for thermodynamically efficient error correction is given. BrunCambridge University Press, 12.09.2013 - 666 Seiten 0 Rezensionenhttps://books.google.de/books/about/Quantum_Error_Correction.html?hl=de&id=XV9sAAAAQBAJQuantum computation and information is one of the most exciting developments in science and technology of the last twenty years.

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