Maximum distance separable (MDS) code

Maximum distance separable (MDS) code[1]

Description

A \(q\)-ary linear code whose parameters satisfy the Singleton bound with equality.

An \([n,k,d]_q\) code is MDS if parameters \(n\), \(k\), \(d\), and \(q\) are such that the Singleton bound \begin{align} d \leq n-k+1 \tag*{(1)}\end{align} becomes an equality. Equivalently, a code with minimum distance \(d\) and dual distance \(d'\) is MDS precisely when \(d+d'=n+2\) and all distances occur [2; Thm. 12.3.1]. A code is called almost MDS (AMDS) when \(d=n-k\). A bound for general (i.e., nonlinear or unrestricted) \(q\)-ary codes can also be formulated; see [3; Thm. 1.9.10]. A code is near MDS (NMDS) if both the code and its dual are AMDS.

The codes \( [n,1,n]_q, [n,n-1,2]_q, [n,n,1]_q \) for any \(q\) are MDS codes. These are called the trivial MDS codes [4; Sec. 3.3.2]. The only binary MDS codes are the trivial ones. Many, but not all, \(q\)-ary MDS codes are related to RS codes and their extensions; see, e.g., [5; Prob. 11.11].

Protection

Given \(n\) and \(k\), MDS codes have the highest distance possible of all codes and so have the best possible error-correction properties.

Realizations

Automatic repeat request (ARQ) data transmission protocols [6; Ch. 7].

Notes

See Refs. [7][5; Sec. 11.4 notes][8; Ch. 11 notes] for more on MDS codes and the MDS conjecture.An MDS code with \(k=2\) is equivalent to a set of \(n-k\) mutually orthogonal Latin squares of order \(q\) [8; Ch. 11 notes].

Cousins

Dual linear code— A linear binary or \(q\)-ary \([n,k,n-k+1]\) code is MDS if and only if its dual \([n,n-k,k+1]\) is MDS [3; Thm. 1.9.13].
Projective geometry code— A linear code is MDS (almost MDS) if and only if columns of its parity-check matrix form an \(n\)-arc (\(n\)-track) in projective space [9–12]. The dual of a MDS code is an MDS code, so MDS codes are projective. All \([9,3]\) MDS codes have been tabulated [13] in terms of 9-arcs in the projective plane.
MDS array code— MDS array codes are MDS codes when each matrix codeword is treated as a vector by converting each column into a single coordinate via subpacketization.
Distributed computation code— The first matrix multiplication code encoded each entry of the matrices to be multiplied into an MDS code [14].
Maximum-sum-rank distance (MSRD) code— MSRD codes generalize MDS codes from the Hamming metric to the sum-rank metric.
Maximum-rank distance (MRD) code— MRD codes are matrix-code analogues of MDS codes.
Algebraic-geometry (AG) code— Near MDS \([n,k,d]_{p^m}\) AG codes exist when \(n,p,m\) satisfy certain relations according to the Tsfasman-Vladut bound [15–17].
Elliptic code— Elliptic codes can be MDS [18; Exam. 15.5.3][16; pg. 310][15; Sec. 4.4.2].
Extended GRS code— A GRS code can be extended to an MDS code [19; Thm. 5.3.4]. Extended and doubly extended narrow-sense RS codes are MDS [19; Thms. 5.3.2 and 5.3.4], and there is an equivalence between the two for odd prime \(q\) [20].
Narrow-sense RS code— Extended and doubly extended narrow-sense RS codes are MDS [19; Thms. 5.3.2 and 5.3.4][5; Ch. 11], and there is an equivalence between the two for odd prime \(q\) [20].
Reed-Solomon (RS) code— Reed-Solomon codes are important examples of MDS codes, and for prime \(q\), every \([q+1,k,q-k+2]_q\) MDS code is Reed-Solomon; for non-prime \(q\), non-equivalent maximal-length MDS codes also exist [20][4; Sec. 3.3.2][5; Ch. 11].
Generalized Srivastava code— Generalized Srivastava codes for \(m=1\) are MDS codes [8; pg. 359].
Quantum maximum-distance-separable (MDS) code— Quantum MDS codes are quantum analogues of MDS codes.
Perfect-tensor code— MDS codes can be used to obtain cluster states that are AME with minimal support [21–26].
Quantum tensor-product code— MDS codes can be used to construct quantum tensor-product codes [27].
EA MDS code— MDS codes give rise to families of EA Galois-qudit codes that saturate the original (erroneous) EAQECC Singleton bound [28].

Member of code lists

Primary Hierarchy

Classical Domain

Galois-field Kingdom

\(q\)-ary codeECC

Additive \(q\)-ary codeECC

Linear \(q\)-ary codeECC

Parents

Linear \(q\)-ary code

Optimal LRCLRC Distributed-storage ECC

The generalized Singleton bound becomes the Singleton bound for \(k=r\), so optimal LRCs with that constraint are MDS.

Universally optimal \(q\)-ary codeUniversally optimal ECC

MDS codes are LP universally optimal codes [29].

Orthogonal array (OA)ECC \(t\)-design

An MDS code is an OA\(_{1}(k,n,q)\) [4; Thm. 3.3.19].

Maximum distance separable (MDS) code

Children

Repetition code

Binary repetition codes are trivial MDS codes [2; Thm. 12.3.1][4; Sec. 3.3.2].

Generalized RS (GRS) code

GRS codes have distance \(n-k+1\), saturating the Singleton bound.

Roth-Lempel code

Roth-Lempel codes are examples of MDS codes that are not GRS codes.

\([10,5,6]_9\) Glynn code

The Glynn code is a rare example of an MDS code that is not related to an RS code.

\([6,3,4]_4\) Hexacode

The hexacode is an MDS code [19; Exer. 578].

Hirschfeld code

The Hirschfeld code is a rare example of an MDS code that is not related to an RS code.

\([n,n-1,2]_q\) \(q\)-ary parity-check code

\([4,2,3]_4\) RS\(_4\) code

\([4,2,3]_3\) Tetracode

The tetracode is a unique MDS code [30,31].

Griesmer code

Singleton bound implies the Griesmer bound.

References

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[9]: R. C. Bose (1947). Mathematical theory of the symmetrical factorial design. Sankhyā: The Indian Journal of Statistics, 107-166
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[11]: J. W. P. Hirschfeld and L. Storme, “The Packing Problem in Statistics, Coding Theory and Finite Projective Spaces: Update 2001”, Developments in Mathematics 201 (2001) DOI
[12]: A. Beutelspacher and U. Rosenbaum. Projective geometry: from foundations to applications. Cambridge University Press, 1998
[13]: A. V. Iampolskaia, A. N. Skorobogatov, and E. A. Sorokin, “Formula for the number of [9,3] MDS codes”, IEEE Transactions on Information Theory 41, 1667 (1995) DOI
[14]: K. Lee, M. Lam, R. Pedarsani, D. Papailiopoulos, and K. Ramchandran, “Speeding Up Distributed Machine Learning Using Codes”, IEEE Transactions on Information Theory 64, 1514 (2018) arXiv:1512.02673 DOI
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[18]: A. Couvreur, H. Randriambololona, “Algebraic Geometry Codes and Some Applications.” Concise Encyclopedia of Coding Theory (Chapman and Hall/CRC, 2021) DOI
[19]: W. C. Huffman and V. Pless, Fundamentals of Error-Correcting Codes (Cambridge University Press, 2003) DOI
[20]: S. Ball, “On sets of vectors of a finite vector space in which every subset of basis size is a basis”, Journal of the European Mathematical Society 14, 733 (2012) DOI
[21]: A. V. Thapliyal, Multipartite maximally entangled states, minimal entanglement generating states and entropic inequalities unpublished presentation (2003)
[22]: W. Helwig and W. Cui, “Absolutely Maximally Entangled States: Existence and Applications”, (2013) arXiv:1306.2536
[23]: W. Helwig, “Absolutely Maximally Entangled Qudit Graph States”, (2013) arXiv:1306.2879
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[25]: Z. Raissi, C. Gogolin, A. Riera, and A. Acín, “Optimal quantum error correcting codes from absolutely maximally entangled states”, Journal of Physics A: Mathematical and Theoretical 51, 075301 (2018) arXiv:1701.03359 DOI
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[28]: J. Fan, H. Chen, and J. Xu, “Constructions of q-ary entanglement-assisted quantum MDS codes with minimum distance greater than q + 1”, (2016) arXiv:1602.02235
[29]: H. Cohn and Y. Zhao, “Energy-Minimizing Error-Correcting Codes”, IEEE Transactions on Information Theory 60, 7442 (2014) arXiv:1212.1913 DOI
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Markus Grassl (2024-07-11) — most recent
Victor V. Albert (2024-07-11)
Victor V. Albert (2022-08-09)
Victor V. Albert (2022-04-28)
Victor V. Albert (2021-12-16)
Eric Kubischta (2021-12-15)

Cite as:

“Maximum distance separable (MDS) code”, The Error Correction Zoo (V. V. Albert & P. Faist, eds.), 2024. https://errorcorrectionzoo.org/c/mds

Github: https://github.com/errorcorrectionzoo/eczoo_data/edit/main/codes/classical/q-ary_digits/distributed_storage/mds.yml.