Renyu Wang scite author profile

Renyu Wang

2Publications

1Citation Statement Received

168Citation Statements Given

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University of California, Riverside

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Distance Bounds for Generalized Bicycle Codes

Wang

Pryadko

2022

Symmetry

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Generalized bicycle (GB) codes is a class of quantum error-correcting codes constructed from a pair of binary circulant matrices. Unlike for other simple quantum code ansätze, unrestricted GB codes may have linear distance scaling. In addition, low-density parity-check GB codes have a naturally overcomplete set of low-weight stabilizer generators, which is expected to improve their performance in the presence of syndrome measurement errors. For such GB codes with a given maximum generator weight w, we constructed upper distance bounds by mapping them to codes local in D≤w−1 dimensions, and lower existence bounds which give d≥O(n1/2). We have also conducted an exhaustive enumeration of GB codes for certain prime circulant sizes in a family of two-qubit encoding codes with row weights 4, 6, and 8; the observed distance scaling is consistent with A(w)n1/2+B(w), where n is the code length and A(w) is increasing with w.

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Distance bounds for generalized bicycle codes

Wang¹,

Pryadko²

2022

Preprint

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Generalized bicycle (GB) codes is a class of quantum error-correcting codes constructed from a pair of binary circulant matrices. Unlike for other simple quantum code ansätze, unrestricted GB codes may have linear distance scaling. In addition, low-density parity-check GB codes have a naturally overcomplete set of low-weight stabilizer generators, which is expected to improve their performance in the presence of syndrome measurement errors. For such GB codes with a given maximum generator weight w, we constructed upper distance bounds by mapping them to codes local in D ≤ w − 1 dimensions, and lower existence bounds which give d ≥ O(n 1/2 ). We have also done an exhaustive enumeration of GB codes for certain prime circulant sizes in a family of two-qubit encoding codes with row weights 4, 6, and 8; the observed distance scaling is consistent with A(w)n 1/2 + B(w), where n is the code length and A(w) is increasing with w.

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Renyu Wang

Distance Bounds for Generalized Bicycle Codes

Distance bounds for generalized bicycle codes

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