A simple approach to approximate quantum error correction based on the transpose channel
Abstract
We demonstrate that there exists a universal, near-optimal recovery map---the transpose channel---for approximate quantum error-correcting codes, where optimality is defined using the worst-case fidelity. Using the transpose channel, we provide an alternative interpretation of the standard quantum error correction (QEC) conditions, and generalize them to a set of conditions for approximate QEC (AQEC) codes. This forms the basis of a simple algorithm for finding AQEC codes. Our analytical approach is a departure from earlier work relying on exhaustive numerical search for the optimal recovery map, with optimality defined based on entanglement fidelity. For the practically useful case of codes encoding a single qubit of information, our algorithm is particularly easy to implement.
Cite
@article{arxiv.0909.0931,
title = {A simple approach to approximate quantum error correction based on the transpose channel},
author = {Hui Khoon Ng and Prabha Mandayam},
journal= {arXiv preprint arXiv:0909.0931},
year = {2013}
}
Comments
9 pages, 2 figures. More concise version, with added references and modified title.