Title of article
A method for efficiently computing the number of codewords of fixed weights in linear codes Original Research Article
Author/Authors
Iliya Bouyukliev، نويسنده , , Valentin Bakoev، نويسنده ,
Issue Information
روزنامه با شماره پیاپی سال 2008
Pages
19
From page
2986
To page
3004
Abstract
The problem of computing the number of codewords of weights not exceeding a given integer in linear codes over a finite field is considered. An efficient method for solving this problem is proposed and discussed in detail. It builds and uses a sequence of different generator matrices, as many as possible, so that the identity matrix takes disjoint places in them. The efficiency of the method is achieved by optimizations in three main directions: (1) the number of the generated codewords, (2) the check whether a given codeword is generated more than once, and (3) the operations for generating and computing these codewords. Since the considered problem generalizes the well-known problems “Weight Distribution” and “Minimum Distance”, their efficient solutions are considered as applications of the algorithms from the method.
Keywords
Codewords generating , Weight spectrum algorithm , Minimum distance algorithm , Linear code
Journal title
Discrete Applied Mathematics
Serial Year
2008
Journal title
Discrete Applied Mathematics
Record number
886883
Link To Document