Rank error-correcting code

Rank codes
Rank codes
Classification
Hierarchy	Linear block code; Rank code
Block length	n
Message length	k
Distance	n − k + 1
Alphabet size	Q = qN (q prime)
Notation	[n, k, d]-code
Algorithms
	Berlekamp–Massey; Euclidean; with Frobenius polynomials
	v; t; e;

In coding theory, rank codes (also called Gabidulin codes) are non-binary^[1] linear error-correcting codes over not Hamming but rank metric. They described a systematic way of building codes that could detect and correct multiple random rank errors. By adding redundancy with coding k-symbol word to a n-symbol word, a rank code can correct any errors of rank up to t = ⌊ (d − 1) / 2 ⌋, where d is a code distance. As an erasure code, it can correct up to d − 1 known erasures.

A rank code is an algebraic linear code over the finite field $GF(q^{N})$ similar to Reed–Solomon code.

The rank of the vector over $GF(q^{N})$ is the maximum number of linearly independent components over $GF(q)$ . The rank distance between two vectors over $GF(q^{N})$ is the rank of the difference of these vectors.

The rank code corrects all errors with rank of the error vector not greater than t.

Rank metric[edit]

Let $X^{n}$ be an n-dimensional vector space over the finite field $GF\left({q^{N}}\right)$ , where $q$ is a power of a prime and $N$ is a positive integer. Let $\left(u_{1},u_{2},\dots ,u_{N}\right)$ , with $u_{i}\in GF(q^{N})$ , be a base of $GF\left({q^{N}}\right)$ as a vector space over the field $GF\left({q}\right)$ .

Every element $x_{i}\in GF\left({q^{N}}\right)$ can be represented as $x_{i}=a_{1i}u_{1}+a_{2i}u_{2}+\dots +a_{Ni}u_{N}$ . Hence, every vector ${\vec {x}}=\left({x_{1},x_{2},\dots ,x_{n}}\right)$ over $GF\left({q^{N}}\right)$ can be written as matrix:

{\vec {x}}=\left\|{\begin{array}{*{20}c}a_{1,1}&a_{1,2}&\ldots &a_{1,n}\\a_{2,1}&a_{2,2}&\ldots &a_{2,n}\\\ldots &\ldots &\ldots &\ldots \\a_{N,1}&a_{N,2}&\ldots &a_{N,n}\end{array}}\right\|

Rank of the vector ${\vec {x}}$ over the field $GF\left({q^{N}}\right)$ is a rank of the corresponding matrix $A\left({\vec {x}}\right)$ over the field $GF\left({q}\right)$ denoted by $r\left({{\vec {x}};q}\right)$ .

The set of all vectors ${\vec {x}}$ is a space $X^{n}=A_{N}^{n}$ . The map ${\vec {x}}\to r\left({\vec {x}};q\right)$ ) defines a norm over $X^{n}$ and a rank metric:

d\left({{\vec {x}};{\vec {y}}}\right)=r\left({{\vec {x}}-{\vec {y}};q}\right)

Rank code[edit]

A set $\{x_{1},x_{2},\dots ,x_{n}\}$ of vectors from $X^{n}$ is called a code with code distance $d=\min d\left(x_{i},x_{j}\right)$ . If the set also forms a k-dimensional subspace of $X^{n}$ , then it is called a linear (n, k)-code with distance $d$ . Such a linear rank metric code always satisfies the Singleton bound $d\leq n-k+1$ with equality.

Generating matrix[edit]

There are several known constructions of rank codes, which are maximum rank distance (or MRD) codes with d = n − k + 1. The easiest one to construct is known as the (generalized) Gabidulin code, it was discovered first by Delsarte (who called it a Singleton system) and later by Gabidulin ^[2] (and Kshevetskiy ^[3] ).

Let's define a Frobenius power $[i]$ of the element $x\in GF(q^{N})$ as

x^{[i]}=x^{q^{i\mod N}}.\,

Then, every vector ${\vec {g}}=(g_{1},g_{2},\dots ,g_{n}),~g_{i}\in GF(q^{N}),~n\leq N$ , linearly independent over $GF(q)$ , defines a generating matrix of the MRD (n, k, d = n − k + 1)-code.

G=\left\|{\begin{array}{*{20}c}g_{1}&g_{2}&\dots &g_{n}\\g_{1}^{[m]}&g_{2}^{[m]}&\dots &g_{n}^{[m]}\\g_{1}^{[2m]}&g_{2}^{[2m]}&\dots &g_{n}^{[2m]}\\\dots &\dots &\dots &\dots \\g_{1}^{[(k-1)m]}&g_{2}^{[(k-1)m]}&\dots &g_{n}^{[(k-1)m]}\end{array}}\right\|,

where $\gcd(m,N)=1$ .

Applications[edit]

There are several proposals for public-key cryptosystems based on rank codes. However, most of them have been proven insecure (see e.g. Journal of Cryptology, April 2008^[4]).

Rank codes are also useful for error and erasure correction in network coding.

Notes[edit]

^ Codes for which each input symbol is from a set of size greater than 2.
^ Gabidulin, Ernst M. (1985). "Theory of codes with maximum rank distance". Problems of Information Transmission. 21 (1): 1–12.
^ Kshevetskiy, Alexander; Gabidulin, Ernst M. (4–9 September 2005). "The new construction of rank codes". Proceedings. International Symposium on Information Theory, 2005. ISIT 2005. pp. 2105–2108. doi:10.1109/ISIT.2005.1523717. ISBN 978-0-7803-9151-2. S2CID 11679865.
^ Overbeck, R. (2008). "Structural Attacks for Public Key Cryptosystems based on Gabidulin Codes". Journal of Cryptology. 21 (2): 280–301. doi:10.1007/s00145-007-9003-9. S2CID 2393853.

References[edit]

Gabidulin, Ernst M. (1985), "Theory of codes with maximum rank distance", Problems of Information Transmission, 21 (1): 1–12
Kshevetskiy, Alexander; Gabidulin, Ernst M. (4–9 September 2005). "The new construction of rank codes". Proceedings. International Symposium on Information Theory, 2005. ISIT 2005. pp. 2105–2108. doi:10.1109/ISIT.2005.1523717. ISBN 978-0-7803-9151-2. S2CID 11679865.
Gabidulin, Ernst M.; Pilipchuk, Nina I. (June 29 – July 4, 2003). "A new method of erasure correction by rank codes". IEEE International Symposium on Information Theory, 2003. Proceedings. p. 423. doi:10.1109/ISIT.2003.1228440. ISBN 978-0-7803-7728-8. S2CID 122552232.

External links[edit]

MATLAB implementation of a Rank–metric codec

[non-binary-1] Codes for which each input symbol is from a set of size greater than 2.

[2] Gabidulin, Ernst M. (1985). "Theory of codes with maximum rank distance". Problems of Information Transmission. 21 (1): 1–12.

[3] Kshevetskiy, Alexander; Gabidulin, Ernst M. (4–9 September 2005). "The new construction of rank codes". Proceedings. International Symposium on Information Theory, 2005. ISIT 2005. pp. 2105–2108. doi:10.1109/ISIT.2005.1523717. ISBN 978-0-7803-9151-2. S2CID 11679865.

[4] Overbeck, R. (2008). "Structural Attacks for Public Key Cryptosystems based on Gabidulin Codes". Journal of Cryptology. 21 (2): 280–301. doi:10.1007/s00145-007-9003-9. S2CID 2393853.

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