Parity-check matrix
In coding theory, a parity-check matrix of a linear block code C is a matrix which describes the linear relations that the components of a codeword must satisfy. It can be used to decide whether a particular vector is a codeword and is also used in decoding algorithms.
Definition
Formally, a parity check matrix, H of a linear code C is a generator matrix of the dual code, C⊥. This means that a codeword c is in C if and only if the matrix-vector product Hc⊤ = 0 (some authors[1] would write this in an equivalent form, cH⊤ = 0.)
The rows of a parity check matrix are the coefficients of the parity check equations.[2] That is, they show how linear combinations of certain digits (components) of each codeword equal zero. For example, the parity check matrix
- ,
compactly represents the parity check equations,
- ,
that must be satisfied for the vector to be a codeword of C.
From the definition of the parity-check matrix it directly follows the minimum distance of the code is the minimum number d such that every d - 1 columns of a parity-check matrix H are linearly independent while there exist d columns of H that are linearly dependent.
Creating a parity check matrix
The parity check matrix for a given code can be derived from its generator matrix (and vice versa).[3] If the generator matrix for an [n,k]-code is in standard form
- ,
then the parity check matrix is given by
- ,
because
- .
Negation is performed in the finite field Fq. Note that if the characteristic of the underlying field is 2 (i.e., 1 + 1 = 0 in that field), as in binary codes, then -P = P, so the negation is unnecessary.
For example, if a binary code has the generator matrix
- ,
then its parity check matrix is
- .
It can be verified that G is a matrix, while H is a matrix.
Syndromes
For any (row) vector x of the ambient vector space, s = Hx⊤ is called the syndrome of x. The vector x is a codeword if and only if s = 0. The calculation of syndromes is the basis for the syndrome decoding algorithm.[4]
See also
Notes
- for instance, Roman 1992, p. 200
- Roman 1992, p. 201
- Pless 1998, p. 9
- Pless 1998, p. 20
References
- Hill, Raymond (1986). A first course in coding theory. Oxford Applied Mathematics and Computing Science Series. Oxford University Press. pp. 69. ISBN 0-19-853803-0.
- Pless, Vera (1998), Introduction to the Theory of Error-Correcting Codes (3rd ed.), Wiley Interscience, ISBN 0-471-19047-0
- Roman, Steven (1992), Coding and Information Theory, GTM, 134, Springer-Verlag, ISBN 0-387-97812-7
- J.H. van Lint (1992). Introduction to Coding Theory. GTM. 86 (2nd ed.). Springer-Verlag. pp. 34. ISBN 3-540-54894-7.