We consider the design of quasi-uniform codes from dihedral 2-groups. Quasi-uniform codes have the distinctive feature of allowing codeword coefficients to live in different alphabets. We obtain a bound on the minimum distance of quasiuniform codes coming from p-groups as a function of the number of p-ary codeword components. We study possible applications of such codes to storage, where the minimum distance is important to allow object retrieval, yet binary coefficients are preferred for fast computations, for example during repairs.Accepted versio
This thesis shows how certain classes of binary constant weight codes can be represented geometrical...
It has been well-known that the class of quasi-cyclic (QC) codes contain many good codes. In thispap...
A length n group code over a group G is a subgroup of Gn under component-wise group operation. Group...
International audienceDihedral codes, particular cases of quasi-cyclic codes, have a nice algebraic ...
This thesis is dedicated to the study of information inequalities and quasi-uniform codes using grou...
In this correspondence, in an extension of Piret's bound for codes over phase-shift keying (PSK) sig...
We give a general lower bound for the minimum distance of q-ary quasi-cyclic codes of length ml and ...
As a generalization of cyclic codes, quasi-cyclic codes contain many good linear codes. Extensive se...
One of the most important and challenging problems in coding theory is to construct codes with optim...
In this work, we find a form for the homogeneous weight over the ring R-k,R-m, using the related the...
The asymptotic Elias upper bound of codes designed for Hamming distance is well known. Piret [3] and...
The asymptotic Elias upper bound of codes designed for Hamming distance is well known. Piret and Eri...
By means of local search techniques, five quasi-cyclic codes have been found that have a higher mini...
The study of group codes as an ideal in a group algebra has been developed long time ago. If char(F)...
A length n group code over a group G is a subgroup of G<sup> n</sup> under component-wise group oper...
This thesis shows how certain classes of binary constant weight codes can be represented geometrical...
It has been well-known that the class of quasi-cyclic (QC) codes contain many good codes. In thispap...
A length n group code over a group G is a subgroup of Gn under component-wise group operation. Group...
International audienceDihedral codes, particular cases of quasi-cyclic codes, have a nice algebraic ...
This thesis is dedicated to the study of information inequalities and quasi-uniform codes using grou...
In this correspondence, in an extension of Piret's bound for codes over phase-shift keying (PSK) sig...
We give a general lower bound for the minimum distance of q-ary quasi-cyclic codes of length ml and ...
As a generalization of cyclic codes, quasi-cyclic codes contain many good linear codes. Extensive se...
One of the most important and challenging problems in coding theory is to construct codes with optim...
In this work, we find a form for the homogeneous weight over the ring R-k,R-m, using the related the...
The asymptotic Elias upper bound of codes designed for Hamming distance is well known. Piret [3] and...
The asymptotic Elias upper bound of codes designed for Hamming distance is well known. Piret and Eri...
By means of local search techniques, five quasi-cyclic codes have been found that have a higher mini...
The study of group codes as an ideal in a group algebra has been developed long time ago. If char(F)...
A length n group code over a group G is a subgroup of G<sup> n</sup> under component-wise group oper...
This thesis shows how certain classes of binary constant weight codes can be represented geometrical...
It has been well-known that the class of quasi-cyclic (QC) codes contain many good codes. In thispap...
A length n group code over a group G is a subgroup of Gn under component-wise group operation. Group...