3D surface code

3D surface code[1,2]

Also known as 3D toric code, 3D cubic code, Bosonic-charge bosonic-loop (BcBl) surface code.

Description

A generalization of the Kitaev surface code defined on a 3D lattice.

3D toric code often either refers to the construction on the three-dimensional torus or is an alternative name for the general construction. The construction on surfaces with boundaries is often called the 3D planar code. There exists a rotated version of the 3D surface code, the 3D rotated surface code, akin to the (2D) rotated surface code [3]. The welded surface code [4] consists of several 3D surface codes stitched together in a way that the distance scales faster than the linear size of the system.

Related models [5,6] on lattices with certain colorability are equivalent to several copies of the 3D surface code [7].

Protection

The planar 3D surface code family on a cubic lattice of length \(L\) has parameters \([[2L(L-1)^2+L^3,1,d_X=L^2,d_Z=L]]\), while the 3D toric code has parameters \([[3L^3,3,d_X=L^2,d_Z=L]]\).

Transversal Gates

Transversal CZ and CCZ gates [8,9].

Gates

CZ gate for toric code on a Klein bottle [10].Lattice surgery [9].3D and Hybrid 2D-3D surface code computation using lattice surgery and without magic-state distillation [9].Fault-tolerant Hadamard gate using teleportation and error correction [9].

Decoding

Flip decoder and its modification p-flip [11].Tensor-network decoder [12].Efficient MWPM decoder for 3D toric and 3D welded surface codes [13].Generalization of linear-time ML erasure decoder [14] to 3D surface codes [13].

Fault Tolerance

Fault-tolerant Hadamard gate using teleportation and error correction [9].

Code Capacity Threshold

Independent \(X,Z\) noise: \(12\%\) for bit-flip and \(3\%\) for phase-flip channels with MWPM decoder for 3D toric code [13], and \(17.2\%\) and \(3.3\%\) with RG decoder for 3D toric code [15].Erasure noise: \(24.8\%\) with generalization of linear-time ML erasure decoder [14] to 3D surface codes [13]. No threshold was observed for the 3D welded surface code [13].

Threshold

Phenomenological noise model for the 3D toric code: \(2.90(2)\%\) under BP-OSD decoder [16], \(7.1\%\) under improved BP-OSD [17], \(7.3\%\) under RG [15], and \(2.6\%\) under flip decoder [11]. For 3D surface code: \(3.08(4)\%\) under flip decoder [16].

Parents

Homological code
3D lattice stabilizer code
Abelian topological code — The 3D Kitaev surface code realizes 3D \(\mathbb{Z}_2\) gauge theory with bosonic charge and loop excitations (BcBl). The welded surface code does not satisfy homogeneous topological order [18].
XYZ product code — The 3D planar (3D toric) code can be obtained from a hypergraph product of three repetition (cyclic) codes [19; Exam. A.1], but done in a different way than the Chamon code; see [20; Sec. 3.4].

Cousins

Chamon model code — The Chamon and 3D surface codes can both be built out of a hypergraph product of three repetition codes; see [20; Sec. 3.4].
Rotated surface code — There exists a rotated version of the 3D surface code, akin to the (2D) rotated surface code [3].
Self-correcting quantum code — The 3D welded surface code is partially self-correcting with a power-law energy barrier [4]. The 3D toric code is a classical self-correcting memory, whose protected bit admits a membrane-like logical operator [21], but it is not a quantum self-correcting memory [22].
\([[8,3,2]]\) CSS code — The \([[8,3,2]]\) code can be concatenated with a 3D surface code to yield a \([[O(d^3),3,2d]]\) code family that admits a transversal implementation of the logical \(CCZ\) gate [23].
3D color code — The 3D color code is equivalent to multiple decoupled copies of the 3D surface code via a local constant-depth Clifford circuit [8,24,25]. This process can be viewed as an ungauging [26–28,28] of certain symmetries. This mapping can also be done via code concatenation [9].
3D fermionic surface code — The 3D (fermionic) surface code is a CSS (non-CSS) code which realizes a \(\mathbb{Z}_2\) gauge theory in 3D (with an emergent fermion).
Fractal surface code — Fractal surface codes are obtained by removing qubits from the 3D surface code on a cubic lattice.
3D subsystem surface code

References

[1]: E. Dennis et al., “Topological quantum memory”, Journal of Mathematical Physics 43, 4452 (2002) arXiv:quant-ph/0110143 DOI
[2]: A. Hamma, P. Zanardi, and X.-G. Wen, “String and membrane condensation on three-dimensional lattices”, Physical Review B 72, (2005) arXiv:cond-mat/0411752 DOI
[3]: E. Huang et al., “Tailoring Three-Dimensional Topological Codes for Biased Noise”, PRX Quantum 4, (2023) arXiv:2211.02116 DOI
[4]: K. P. Michnicki, “3D Topological Quantum Memory with a Power-Law Energy Barrier”, Physical Review Letters 113, (2014) arXiv:1406.4227 DOI
[5]: H. Bombin and M. A. Martin-Delgado, “Exact topological quantum order inD=3and beyond: Branyons and brane-net condensates”, Physical Review B 75, (2007) arXiv:cond-mat/0607736 DOI
[6]: I. H. Kim, “Local non-CSS quantum error correcting code on a three-dimensional lattice”, (2013) arXiv:1012.0859
[7]: A. Dua et al., “Sorting topological stabilizer models in three dimensions”, Physical Review B 100, (2019) arXiv:1908.08049 DOI
[8]: A. Kubica, B. Yoshida, and F. Pastawski, “Unfolding the color code”, New Journal of Physics 17, 083026 (2015) arXiv:1503.02065 DOI
[9]: M. Vasmer and D. E. Browne, “Three-dimensional surface codes: Transversal gates and fault-tolerant architectures”, Physical Review A 100, (2019) arXiv:1801.04255 DOI
[10]: M. Barkeshli et al., “Higher-group symmetry in finite gauge theory and stabilizer codes”, SciPost Physics 16, (2024) arXiv:2211.11764 DOI
[11]: T. R. Scruby and K. Nemoto, “Local Probabilistic Decoding of a Quantum Code”, Quantum 7, 1093 (2023) arXiv:2212.06985 DOI
[12]: C. Piveteau, C. T. Chubb, and J. M. Renes, “Tensor Network Decoding Beyond 2D”, (2023) arXiv:2310.10722
[13]: A. Kulkarni and P. K. Sarvepalli, “Decoding the three-dimensional toric codes and welded codes on cubic lattices”, Physical Review A 100, (2019) arXiv:1808.03092 DOI
[14]: N. Delfosse and G. Zémor, “Linear-time maximum likelihood decoding of surface codes over the quantum erasure channel”, Physical Review Research 2, (2020) arXiv:1703.01517 DOI
[15]: K. Duivenvoorden, N. P. Breuckmann, and B. M. Terhal, “Renormalization Group Decoder for a Four-Dimensional Toric Code”, IEEE Transactions on Information Theory 65, 2545 (2019) arXiv:1708.09286 DOI
[16]: A. O. Quintavalle et al., “Single-Shot Error Correction of Three-Dimensional Homological Product Codes”, PRX Quantum 2, (2021) arXiv:2009.11790 DOI
[17]: O. Higgott and N. P. Breuckmann, “Improved Single-Shot Decoding of Higher-Dimensional Hypergraph-Product Codes”, PRX Quantum 4, (2023) arXiv:2206.03122 DOI
[18]: J. Haah, “A degeneracy bound for homogeneous topological order”, SciPost Physics 10, (2021) arXiv:2009.13551 DOI
[19]: L. Berent et al., “Analog Information Decoding of Bosonic Quantum Low-Density Parity-Check Codes”, PRX Quantum 5, (2024) arXiv:2311.01328 DOI
[20]: A. Leverrier, S. Apers, and C. Vuillot, “Quantum XYZ Product Codes”, Quantum 6, 766 (2022) arXiv:2011.09746 DOI
[21]: O. Landon-Cardinal et al., “Perturbative instability of quantum memory based on effective long-range interactions”, Physical Review A 91, (2015) arXiv:1501.04112 DOI
[22]: Y. Li et al., “Phase diagram of the three-dimensional subsystem toric code”, (2023) arXiv:2305.06389
[23]: D. Hangleiter et al., “Fault-tolerant compiling of classically hard IQP circuits on hypercubes”, (2024) arXiv:2404.19005
[24]: B. Yoshida, “Classification of quantum phases and topology of logical operators in an exactly solved model of quantum codes”, Annals of Physics 326, 15 (2011) arXiv:1007.4601 DOI
[25]: A. B. Aloshious, A. N. Bhagoji, and P. K. Sarvepalli, “On the Local Equivalence of 2D Color Codes and Surface Codes with Applications”, (2018) arXiv:1804.00866
[26]: M. Levin and Z.-C. Gu, “Braiding statistics approach to symmetry-protected topological phases”, Physical Review B 86, (2012) arXiv:1202.3120 DOI
[27]: L. Bhardwaj, D. Gaiotto, and A. Kapustin, “State sum constructions of spin-TFTs and string net constructions of fermionic phases of matter”, Journal of High Energy Physics 2017, (2017) arXiv:1605.01640 DOI
[28]: W. Shirley, K. Slagle, and X. Chen, “Foliated fracton order from gauging subsystem symmetries”, SciPost Physics 6, (2019) arXiv:1806.08679 DOI

Page edit log

Aleksander Kubica (2022-05-16) — most recent
Victor V. Albert (2022-05-16)

Cite as:

“3D surface code”, The Error Correction Zoo (V. V. Albert & P. Faist, eds.), 2022. https://errorcorrectionzoo.org/c/3d_surface

Github: https://github.com/errorcorrectionzoo/eczoo_data/edit/main/codes/quantum/qubits/stabilizer/topological/surface/higher_d/3d_surface.yml.