Approaching the Quantum Singleton Bound with Approximate Error Correction
Quantum Physics
2022-12-21 v1
Abstract
It is well known that no quantum error correcting code of rate can correct adversarial errors on more than a fraction of symbols. But what if we only require our codes to *approximately* recover the message? We construct efficiently-decodable approximate quantum codes against adversarial error rates approaching the quantum Singleton bound of , for any constant rate . Moreover, the size of the alphabet is a constant independent of the message length and the recovery error is exponentially small in the message length. Central to our construction is a notion of quantum list decoding and an implementation involving folded quantum Reed-Solomon codes.
Cite
@article{arxiv.2212.09935,
title = {Approaching the Quantum Singleton Bound with Approximate Error Correction},
author = {Thiago Bergamaschi and Louis Golowich and Sam Gunn},
journal= {arXiv preprint arXiv:2212.09935},
year = {2022}
}