AbstractIt is shown that the row spaces of certain generalized weighing matrices, Bhaskar Rao designs, and generalized Hadamard matrices over a finite field of order q are hermitian self-orthogonal codes. Certain matrices of minimum rank yield optimal codes. In the special case when q=4, the codes are linked to quantum error-correcting codes, including some codes with optimal parameters
AbstractIn a previous paper, the authors proved that any set of representatives of the distinct 1-di...
In a previous paper, the authors proved that any set of representatives of the distinct 1-dimensiona...
By means of a construction method outlined by Harada and Tonchev, we determine some non-binary self-...
It is shown that the row spaces of certain generalized weighing matrices, Bhaskar Rao designs, and g...
AbstractIt is shown that the row spaces of certain generalized weighing matrices, Bhaskar Rao design...
Matrix-product codes over finite fields are an important class of long linear codes by combining sev...
After the pioneering work of Shor and Steane, we are able to establish links between quantum codes a...
AbstractA general method unifying known constructions of binary self-orthogonal codes from combinato...
The problem of finding quantum-error-correcting codes is transformed into the problem of finding add...
AbstractIt is proved that any set of representatives of the distinct one-dimensional subspaces in th...
Abstract Orthogonal designs and their special cases such as weighing matrices and Hadamard matrices ...
In this paper, we take advantage of a class of one-generator generalized quasi-cyclic (GQC) codes of...
It is proved that any set of representatives of the distinct one-dimensional subspaces in the dual c...
In this work, we determine self dual and self orthogonal codes arising from constacyclic codes over ...
Abstract—In this article we construct an infinite family of linear error correcting codes over Fq fo...
AbstractIn a previous paper, the authors proved that any set of representatives of the distinct 1-di...
In a previous paper, the authors proved that any set of representatives of the distinct 1-dimensiona...
By means of a construction method outlined by Harada and Tonchev, we determine some non-binary self-...
It is shown that the row spaces of certain generalized weighing matrices, Bhaskar Rao designs, and g...
AbstractIt is shown that the row spaces of certain generalized weighing matrices, Bhaskar Rao design...
Matrix-product codes over finite fields are an important class of long linear codes by combining sev...
After the pioneering work of Shor and Steane, we are able to establish links between quantum codes a...
AbstractA general method unifying known constructions of binary self-orthogonal codes from combinato...
The problem of finding quantum-error-correcting codes is transformed into the problem of finding add...
AbstractIt is proved that any set of representatives of the distinct one-dimensional subspaces in th...
Abstract Orthogonal designs and their special cases such as weighing matrices and Hadamard matrices ...
In this paper, we take advantage of a class of one-generator generalized quasi-cyclic (GQC) codes of...
It is proved that any set of representatives of the distinct one-dimensional subspaces in the dual c...
In this work, we determine self dual and self orthogonal codes arising from constacyclic codes over ...
Abstract—In this article we construct an infinite family of linear error correcting codes over Fq fo...
AbstractIn a previous paper, the authors proved that any set of representatives of the distinct 1-di...
In a previous paper, the authors proved that any set of representatives of the distinct 1-dimensiona...
By means of a construction method outlined by Harada and Tonchev, we determine some non-binary self-...
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