核心概念
The error correctability of CSS codes obtained from classical cyclic codes can be improved by lifting the syndrome decoder for codes over the symbol-pair metric.
摘要
The paper presents a novel approach to improve the error correction capability of CSS (Calderbank-Shor-Steane) quantum error-correcting codes by leveraging the relationship between the symplectic weight and the symbol-pair weight.
Key highlights:
- The authors establish a connection between the symplectic weight and the symbol-pair weight, which allows them to lift decoders for classical codes over the symbol-pair metric to decoders for stabilizer quantum codes.
- They propose a new decoding algorithm for CSS codes derived from classical cyclic codes satisfying the dual-containing property (C⊥Euc ⊆ C). The algorithm uses the syndrome decoding of codes over the symbol-pair metric to correct errors with weight up to ⌊(dp-1)/2⌋ in the symplectic weight and ⌊(dH-1)/2⌋ in the Hamming weight.
- The authors show that their decoding scheme can correct a larger set of errors compared to the previous decoding schemes for CSS codes, as the symbol-pair distance of cyclic codes is at least 3/2 times their Hamming distance.
- The paper provides an illustrative example demonstrating the improvement in error correction capability using the proposed decoding scheme.
統計資料
The symbol-pair weight of a vector x := (x0, x1, ..., xn-1) ∈ Fn2 is defined as:
wtsp(x) := |{i : (xi, xi+1) ≠ (0, 0)}|
The symplectic weight of a vector (a|b) := ((a0, ..., an-1)|(b0, ..., bn-1)) ∈ (Fn2)2 is defined as:
wtsymp(a|b) := |{1 ≤ i ≤ n : (ai, bi) ≠ (0, 0)}|
For a binary cyclic code C, the following relation holds:
dp(C) ≥ 3dH(C)/2
引述
"The relation between stabilizer codes and binary codes provided by Gottesman and Calderbank et al. is a celebrated result, as it allows the lifting of classical codes to quantum codes."
"An equivalent way to state this result is that the work allows us to lift decoders for classical codes over the Hamming metric to decoders for stabilizer quantum codes."
"A natural question to consider: Can we do something similar with decoders for classical codes considered over other metrics? i.e., Can we lift decoders for classical codes over other metrics to obtain decoders for stabilizer quantum codes?"