True Galois-qudit stabilizer code

True Galois-qudit stabilizer code[1–3]

Alternative names: Linear stabilizer code.

Description

A \([[n,k,d]]_q\) stabilizer code whose stabilizer's Galois symplectic representation forms a linear subspace. In other words, the set of \(q\)-ary vectors representing the stabilizer group is closed under both addition and multiplication by elements of \(GF(q)\). In contrast, Galois-qudit stabilizer codes admit sets of vectors that are closed under addition only.

The number of generators \(r\) for a true stabilizer code is a multiple of \(m\) (recall that \(q=p^m\) for Galois qudits). As a result, the number \(k=n-r/m\) of logical qudits is an integer.

Each code can be represented by a stabilizer generator matrix \(H=(A|B)\), where each row \((a|b)\) is the Galois symplectic representation of a stabilizer generator.

Protection

Detects errors on up to \(d-1\) qudits, and corrects erasure errors on up to \(d-1\) qudits.

Notes

See Ref. [4,5] for introductions to various stabilizer code constructions.

Cousin

Linear \(q\)-ary code— A true Galois-qudit stabilizer code is the closest quantum analogue of a linear code over \(GF(q)\) because the \(q\)-ary vectors corresponding to the Galois symplectic representation of the stabilizers form a linear subspace.

Member of code lists

Primary Hierarchy

Quantum Domain

Galois-qudit Kingdom

Galois-qudit codeQECC Quantum

Galois-qudit USt code

Galois-qudit stabilizer codeStabilizer Hamiltonian-based QECC Quantum

Parents

Galois-qudit stabilizer code

True Galois-qudit stabilizer code

Children

Qubit stabilizer codeBB Homological Fermion-into-qubit Quantum Reed-Muller Color Twist-defect color CDSC Twist-defect surface Kitaev surface

True Galois-qudit stabilizer codes for \(q=2\) correspond to qubit stabilizer codes.

\([[5,1,3]]_q\) Galois-qudit code

\([[6,2,3]]_{q}\) code

The code is a non-CSS stabilizer code in general [6].

\([[7,3,3]]_{q}\) code

Galois-qudit BCH code

Galois-qudit BCH codes can be constructed via the CSS construction or the Hermitian construction.

Galois-qudit CSS codeQuantum Reed-Muller Color Homological Quantum QR code BB Kitaev surface

Galois-qudit CSS codes are true stabilizer codes [3].

Quantum duadic codeQuantum QR code

Quantum duadic codes can be constructed via the CSS construction or the Hermitian construction.

Quantum AG code

Quantum AG codes can be constructed via the Galois-qudit CSS construction or the Galois-qudit Hermitian construction.

Galois-qudit quantum RM codeQuantum Reed-Muller

Galois-qudit RM codes can be constructed via the Galois-qudit CSS construction or the Galois-qudit Hermitian construction.

Galois-qudit GRS code

Galois-qudit GRS codes can be constructed via the CSS construction or the Hermitian construction.

Quantum Gabidulin code

Hermitian Galois-qudit code

Hermitian codes are true stabilizer codes because they are based on Hermitian self-orthogonal linear (as opposed to additive) codes over \(GF(q^2)\).

References

[1]: A. Ashikhmin and E. Knill, “Nonbinary quantum stabilizer codes”, IEEE Transactions on Information Theory 47, 3065 (2001) DOI
[2]: A. Ketkar, A. Klappenecker, S. Kumar, and P. K. Sarvepalli, “Nonbinary stabilizer codes over finite fields”, (2005) arXiv:quant-ph/0508070
[3]: D. Gottesman. Surviving as a quantum computer in a classical world (2024) URL
[4]: A. Klappenecker, “Algebraic quantum coding theory”, Quantum Error Correction 307 (2013) DOI
[5]: M. F. Ezerman, "Quantum Error-Control Codes." Concise Encyclopedia of Coding Theory (Chapman and Hall/CRC, 2021) DOI
[6]: Z. Wang, S. Yu, H. Fan, and C. H. Oh, “Quantum error-correcting codes over mixed alphabets”, Physical Review A 88, (2013) arXiv:1205.4253 DOI

Page edit log

Victor V. Albert (2022-07-22) — most recent
Daniel Gottesman (2022-02-17)
Victor V. Albert (2022-02-17)

Cite as:

“True Galois-qudit stabilizer code”, The Error Correction Zoo (V. V. Albert & P. Faist, eds.), 2022. https://errorcorrectionzoo.org/c/galois_true_stabilizer

Github: https://github.com/errorcorrectionzoo/eczoo_data/edit/main/codes/quantum/qudits_galois/stabilizer/galois_true_stabilizer.yml.