Add to ORKGConstant-weight codes play an important role in coding theory. Binary constant-weight codes have been extensively investigated. Nonbinary constant-weight codes have also attracted recent attention due to several important applications requiring nonbinary alphabets. However, they are still much less understood than binary constant-weight codes. In this thesis, we make a thorough study on known constructions of nonbinary constant- weight codes, and provide new constructions for two in fite families of optimal codes. The first construction shows that Aq(n, 2w - 1, w) = (q - 1)n/w for all sufficiently large n satisfying w|(q - 1)n. The second construction uses a novel idea based on sequences to construct optimal q-ary (q, 4, 3)-codes for...
Abstract—We demonstrate that certain Johnson-type bounds are asymptotically exact for a variety of c...
AbstractWe consider optimal constant weight codes over arbitrary alphabets. Some of these codes are ...
Abstract—In this article we construct an infinite family of linear error correcting codes over Fq fo...
This paper introduces a new combinatorial construction for q-ary constant-weight codes which yields ...
Constant-composition codes are a special class of constant-weight codes with very strong constraints...
AbstractFor any prime power q > 2 we construct a family of linear codes over an alphabet of q letter...
Let A(n,d,w) denote the maximum possible number of codewords in an (n,d,w) constant-weight binary co...
This thesis presents new methods for finding optimal and near-optimal constant weight binary codes w...
Abstract—An optimal constant-composition or constant-weight code of weight has linear size if and o...
Abstract. We consider the problem of classification of optimal ternary constant-weight codes. We use...
This work was partially supported by the Bulgarian National Science Fund under Grant I–618/96.Optima...
Abstract: We give a new upper bound on the maximum size $A_q(n,d)$ of a code of word length $n$ and ...
For every prime-power q and every pair of natural numbers m ≤ n′, we construct a q-ary linear code o...
For q,n,d ∈ N, let Aq(n,d) be the maximum size of a code C⊆[q]n with minimum distance at least d. We...
We give a new upper bound on the maximum size $A_q(n,d)$ of a code of word length $n$ and minimum Ha...
Abstract—We demonstrate that certain Johnson-type bounds are asymptotically exact for a variety of c...
AbstractWe consider optimal constant weight codes over arbitrary alphabets. Some of these codes are ...
Abstract—In this article we construct an infinite family of linear error correcting codes over Fq fo...
This paper introduces a new combinatorial construction for q-ary constant-weight codes which yields ...
Constant-composition codes are a special class of constant-weight codes with very strong constraints...
AbstractFor any prime power q > 2 we construct a family of linear codes over an alphabet of q letter...
Let A(n,d,w) denote the maximum possible number of codewords in an (n,d,w) constant-weight binary co...
This thesis presents new methods for finding optimal and near-optimal constant weight binary codes w...
Abstract—An optimal constant-composition or constant-weight code of weight has linear size if and o...
Abstract. We consider the problem of classification of optimal ternary constant-weight codes. We use...
This work was partially supported by the Bulgarian National Science Fund under Grant I–618/96.Optima...
Abstract: We give a new upper bound on the maximum size $A_q(n,d)$ of a code of word length $n$ and ...
For every prime-power q and every pair of natural numbers m ≤ n′, we construct a q-ary linear code o...
For q,n,d ∈ N, let Aq(n,d) be the maximum size of a code C⊆[q]n with minimum distance at least d. We...
We give a new upper bound on the maximum size $A_q(n,d)$ of a code of word length $n$ and minimum Ha...
Abstract—We demonstrate that certain Johnson-type bounds are asymptotically exact for a variety of c...
AbstractWe consider optimal constant weight codes over arbitrary alphabets. Some of these codes are ...
Abstract—In this article we construct an infinite family of linear error correcting codes over Fq fo...