Quantum (Mar 2020)

Continuous groups of transversal gates for quantum error correcting codes from finite clock reference frames

  • Mischa P. Woods,
  • Álvaro M. Alhambra

DOI
https://doi.org/10.22331/q-2020-03-23-245
Journal volume & issue
Vol. 4
p. 245

Abstract

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Following the introduction of the task of $\textit{reference frame error}$ $\textit{correction}$ \cite{hayden2017error}, we show how, by using reference frame alignment with clocks, one can add a continuous Abelian group of transversal logical gates to $any$ error-correcting code. With this we further explore a way of circumventing the no-go theorem of Eastin and Knill, which states that if local errors are correctable, the group of transversal gates must be of finite order. We are able to do this by introducing a small error on the decoding procedure that decreases with the dimension of the frames used. Furthermore, we show that there is a direct relationship between how small this error can be and how accurate quantum clocks can be: the more accurate the clock, the smaller the error; and the no-go theorem would be violated if time could be measured perfectly in quantum mechanics. The asymptotic scaling of the error is studied under a number of scenarios of reference frames and error models. The scheme is also extended to errors at unknown locations, and we show how to achieve this by simple majority voting related error correction schemes on the reference frames. In the Outlook, we discuss our results in relation to the AdS/CFT correspondence and the Page-Wooters mechanism.