Dual code

For players of both rugby codes, see List of dual-code rugby internationals.

In coding theory, the dual code of a linear code

C\subset \mathbb {F} _{q}^{n}

is the linear code defined by

C^{\perp }=\{x\in \mathbb {F} _{q}^{n}\mid \langle x,c\rangle =0\;\forall c\in C\}

where

\langle x,c\rangle =\sum _{i=1}^{n}x_{i}c_{i}

is a scalar product. In linear algebra terms, the dual code is the annihilator of C with respect to the bilinear form <,>. The dimension of C and its dual always add up to the length n:

\dim C+\dim C^{\perp }=n.

A generator matrix for the dual code is a parity-check matrix for the original code and vice versa. The dual of the dual code is always the original code.

Self-dual codes

A self-dual code is one which is its own dual. This implies that n is even and dim C = n/2. If a self-dual code is such that each codeword's weight is a multiple of some constant $c > 1$ , then it is of one of the following four types:^[1]

Type I codes are binary self-dual codes which are not doubly even. Type I codes are always even (every codeword has even Hamming weight).
Type II codes are binary self-dual codes which are doubly even.
Type III codes are ternary self-dual codes. Every codeword in a Type III code has Hamming weight divisible by 3.
Type IV codes are self-dual codes over F₄. These are again even.

Codes of types I, II, III, or IV exist only if the length n is a multiple of 2, 8, 4, or 2 respectively.

If a self-dual code has a generator matrix of the form $G=[I_{k}|A]$ , then the dual code $C^{\perp }$ has generator matrix $[-{\bar {A}}^{T}|I_{k}]$ , where $I_{k}$ is the $(n/2)\times (n/2)$ identity matrix and ${\bar {a}}=a^{q}\in \mathbb {F} _{q}$ .

References

↑ Conway, J.H.; Sloane,N.J.A. (1988). Sphere packings, lattices and groups. Grundlehren der mathematischen Wissenschaften. 290. Springer-Verlag. p. 77. ISBN 0-387-96617-X.

Hill, Raymond (1986). A first course in coding theory. Oxford Applied Mathematics and Computing Science Series. Oxford University Press. p. 67. ISBN 0-19-853803-0.
Pless, Vera (1982). Introduction to the theory of error-correcting codes. Wiley-Interscience Series in Discrete Mathematics. John Wiley & Sons. p. 8. ISBN 0-471-08684-3.
J.H. van Lint (1992). Introduction to Coding Theory. GTM. 86 (2nd ed.). Springer-Verlag. p. 34. ISBN 3-540-54894-7.

External links

MATH32031: Coding Theory - Dual Code - pdf with some examples and explanations

This article is issued from Wikipedia - version of the 6/9/2016. The text is available under the Creative Commons Attribution/Share Alike but additional terms may apply for the media files.