Alternative names: Checkerboard code, Medial surface code, Rectified surface code.
Description
Variant of the surface code defined on a square lattice that has been rotated 45 degrees such that qubits are on vertices, and both \(X\)- and \(Z\)-type check operators occupy plaquettes in an alternating checkerboard pattern.
Stabilizer generators for this code are shown in Figure I.
Protection
The \([[L^2,1,L]]\) planar rotated surface code variant [1] includes the \([[9,1,3]]\) surface-17 code, named as such because 8 ancilla qubits are used for check operator measurements alongside the 9 physical qubits. The \([[L^2,2,L]]\) rotated toric code includes the \([[4,2,2]]\) code as its smallest example.Gates
Injection of the \(|Y\rangle\) state [7].Decoding
Only certain syndrome extraction schedules are distance-preserving [4].Local neural-network using 3D convolutions, combined with a separate global decoder [8].Iterative CNOT decoder [9].Fault-tolerant BP (FTBP) decoder [10].Fault Tolerance
A particular choice of CNOT gates during syndrome extraction is required to avoid hook errors and be fault-tolerant to syndrome qubit errors [4,11,12].Threshold
Thresholds for various amounts of erasure, Pauli, correlated, and measurement noise are known [13,14].Cousins
- Hypergraph product (HGP) code— The rotated code can be obtained from hypergraph product of two cyclic linear binary codes with palindromic generator polynomial [3; Exam. 7].
- Cyclic linear binary code— The rotated code can be obtained from hypergraph product of two cyclic linear binary codes with palindromic generator polynomial [3; Exam. 7].
- Heavy-hexagon code— A rotated surface code can be mapped onto a heavy square lattice, resulting in a code similar to the heavy-hexagon code [15].
- Plaquette Ising code— The plaquette Ising model can be thought of as the rotated surface code whose \(X\)-type stabilizer generators have been converted to \(Z\)-type stabilizer generators.
- Concatenated cat code— Cat codes have been concatenated with rotated surface codes [16].
- GKP-surface code— GKP codes have been concatenated with rotated surface codes [17–21].
- Tensor-network code— A tensor-network based modification of the rotated surface code improves performance against depolarizing noise by \(\approx 2\%\) [22].
- Ball-Verstraete-Cirac (BVC) code— An appropriately chosen stabilizer generator set for the BVC code contains the stabilizers of the rotated surface code [23].
- 3D surface code— There exists a rotated version of the 3D surface code, akin to the (2D) rotated surface code [24].
- XZZX surface code— The XZZX code is obtained from the rotated surface code by applying Hadamard gates on a subset of qubits such that \(XXXX\) and \(ZZZZ\) generators are both mapped to \(XZXZ\). Both rotated and XZZX codes offer improved performance over the original surface code for biased noise [25].
- Compass code— The surface-density compass code family interpolates between Bacon-Shor codes and rotated surface codes.
- Subsystem rotated surface code
Member of code lists
- 2D stabilizer codes
- Concatenated quantum codes and friends
- Hamiltonian-based codes
- Quantum codes
- Quantum codes based on homological products
- Quantum codes with fault-tolerant gadgets
- Quantum codes with notable decoders
- Quantum codes with other thresholds
- Quantum codes with transversal gates
- Quantum CSS codes
- Quantum LDPC codes
- Single-shot codes
- Stabilizer codes
- Surface code and friends
- Topological codes
Primary Hierarchy
Generalized homological-product qubit CSS codeGeneralized homological-product QLDPC CSS Stabilizer Hamiltonian-based QECC Quantum
Kitaev surface codeCDSC Twist-defect surface Lattice stabilizer Generalized homological-product QLDPC CSS Stabilizer Qubit Abelian topological Topological Hamiltonian-based QECC Quantum
Parents
The lattice of the rotated surface code can be obtained by taking the medial graph of the surface code lattice (treated as a graph) and applying a similar procedure to construct the check operators [1,26][27; Fig. 8]. Applying the quantum Tanner transformation to the surface code yields the rotated surface code [28,29]. The rotated surface code presents certain savings over the original surface code [30].
Hierarchical codes are concatenations of constant-rate QLDPC codes with rotated surface codes.
Yoked surface codes are concatenations of QMDPC codes with rotated surface codes.
Rotated surface code
Children
The \([[4,2,2]]\) code is the smallest rotated toric code. The subcodes \(\{|\overline{10}\rangle,|\overline{11}\rangle\}\) [31], \(\{|\overline{00}\rangle,|\overline{10}\rangle\}\) [32], \(\{|\overline{00}\rangle,|\overline{01}\rangle\}\) [33], and \(\{|\overline{00}\rangle,|\overline{11}\rangle\}\) [34] are small planar rotated surface codes.
References
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Page edit log
- Eric Huang (2024-03-14) — most recent
- Marcus P da Silva (2023-03-20)
- Victor V. Albert (2022-07-30)
Cite as:
“Rotated surface code”, The Error Correction Zoo (V. V. Albert & P. Faist, eds.), 2024. https://errorcorrectionzoo.org/c/rotated_surface