kódhosszt

Kódhosszt is a term used in coding theory to refer to the length of a code, i.e., the number of symbols in each codeword. In mathematical notation, the code length is usually denoted by n. For a code C over an alphabet of size q, codewords are elements of the vector space F_q^n, and every codeword has length n. If the code is linear, it is commonly described by parameters [n, k, d], where n is the code length, k the dimension, and d the minimum distance.

The code length is a fixed characteristic of a given code and together with the dimension k

Longer codes (larger n) can offer greater absolute error-correcting power for a fixed q, but may require

Common examples illustrate the concept: a binary Hamming code has length n = 2^r − 1, and Reed–Solomon

Etymology: in Hungarian, kódhosszt is the accusative form of kódhossz, meaning code length. See also code length,