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Quantum Error Correction Fault Tolerance

Achieving perfect completeness in classical-witness quantum Merlin-Arthur proof systems

arXiv
Authors: Stephen P. Jordan, Hirotada Kobayashi, Daniel Nagaj, Harumichi Nishimura

Year

2011

Paper ID

29588

Status

Preprint

Abstract Read

~2 min

Abstract Words

66

Citations

N/A

Abstract

This paper proves that classical-witness quantum Merlin-Arthur proof systems can achieve perfect completeness. That is, QCMA = QCMA1. This holds under any gate set with which the Hadamard and arbitrary classical reversible transformations can be exactly implemented, e.g., {Hadamard, Toffoli, NOT}. The proof is quantumly nonrelativizing, and uses a simple but novel quantum technique that additively adjusts the success probability, which may be of independent interest.

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References & Citation Signals

[1] DOI https://doi.org/arXiv:1111.5306 [2] arXiv https://arxiv.org/abs/1111.5306 [3] Publisher https://arxiv.org/abs/1111.5306

Local Citation Graph (Related-Paper Links)

Current Paper #29588 #35400 Building a spin quantum bit reg... #35396 Fault tolerance with noisy and ... #35393 Topological quantum hashing wit... #35390 Clustered error correction of c...

External citation index: OpenAlex citation signal

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