Haar random codes attain the quantum Hamming bound, approximately
Abstract
We study the error correcting properties of Haar random codes, in which a K-dimensional code space C ⊂eq CN is chosen at random from the Haar distribution. Our main result is that Haar random codes can approximately correct errors up to the quantum Hamming bound, meaning that a set of m Pauli errors can be approximately corrected so long as mK N. This is the strongest bound known for any family of quantum error correcting codes (QECs), and continues a line of work showing that approximate QECs can significantly outperform exact QECs [LNCY97, CGS05, BGG24]. Our proof relies on a recent matrix concentration result of Bandeira, Boedihardjo, and van Handel.
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