AbstractProperties of the weight distribution of low-dimensional generalized Reed–Muller codes are used to obtain restrictions on the weight distribution of linear codes over arbitrary fields. These restrictions are used in non-existence proofs for ternary linear code with parameters [74,10,44] [82,6,53] and [96,6,62]
Abstract. In this paper we determine completely the structure of linear codes over Z=NZ of constant ...
AbstractRecently some methods have been proposed to find the distance and weight distribution of cyc...
AbstractConsider an (n,k) linear code with symbols from GF(2m). If each code symbol is represented b...
AbstractProperties of the weight distribution of low-dimensional generalized Reed–Muller codes are u...
This paper is about weight distribution of a code and zeta polynomials. Some computations and exampl...
Weight spectra of random equiprobable linear codes over GF(p) are con- cerned. For a random linear ...
In this paper we determine completely the structure of linear codes over Z=NZ of constant weight. Na...
AbstractThe Gleason-Pierce theorem characterizes those fields for which formally self-dual divisible...
International audienceWe propose new results on low weight codewords of affine and projective genera...
In this paper, the 3-rank of the incidence matrices of 2-designs supported by the minimum weight cod...
International audienceWe study the combinatorial function L(k, q), the maximum number of nonzero wei...
This study is an exposition of Chapter 5 of the book entitled Elements of Algebraic Coding Theory by...
AbstractThe main result of the paper is expressions for the support weight distributions of a linear...
In this paper, we apply two-to-one functions over b F 2n in two generic constructions of binary line...
In this correspondence, the weight distribution of a class of linear codes based on perfect nonlinea...
Abstract. In this paper we determine completely the structure of linear codes over Z=NZ of constant ...
AbstractRecently some methods have been proposed to find the distance and weight distribution of cyc...
AbstractConsider an (n,k) linear code with symbols from GF(2m). If each code symbol is represented b...
AbstractProperties of the weight distribution of low-dimensional generalized Reed–Muller codes are u...
This paper is about weight distribution of a code and zeta polynomials. Some computations and exampl...
Weight spectra of random equiprobable linear codes over GF(p) are con- cerned. For a random linear ...
In this paper we determine completely the structure of linear codes over Z=NZ of constant weight. Na...
AbstractThe Gleason-Pierce theorem characterizes those fields for which formally self-dual divisible...
International audienceWe propose new results on low weight codewords of affine and projective genera...
In this paper, the 3-rank of the incidence matrices of 2-designs supported by the minimum weight cod...
International audienceWe study the combinatorial function L(k, q), the maximum number of nonzero wei...
This study is an exposition of Chapter 5 of the book entitled Elements of Algebraic Coding Theory by...
AbstractThe main result of the paper is expressions for the support weight distributions of a linear...
In this paper, we apply two-to-one functions over b F 2n in two generic constructions of binary line...
In this correspondence, the weight distribution of a class of linear codes based on perfect nonlinea...
Abstract. In this paper we determine completely the structure of linear codes over Z=NZ of constant ...
AbstractRecently some methods have been proposed to find the distance and weight distribution of cyc...
AbstractConsider an (n,k) linear code with symbols from GF(2m). If each code symbol is represented b...
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