In IEEE Trans. Inform. Theory 46 (2000), 280, using characters of an elementary Abelian 2-group, a class of q-ary codes, where q is an odd prime power, is constructed. These codes share several features in common with binary Reed–Muller codes. This construction is generalized in this paper to yield codes with features that resemble those of generalized Reed–Muller codes.Accepted versio
We introduce a new infinite family of quaternary cyclic (n,(n+1)2) and (n,(n − 1)2) codes which incl...
We introduce a new infinite family of quaternary cyclic (n,(n+1)2) and (n,(n − 1)2) codes which incl...
AbstractWe introduce a new infinite family of quaternary cyclic (n, (n+1)2) and (n, (n − 1)2) codes ...
AbstractIn IEEE Trans. Inform. Theory 46 (2000), 280, using characters of an elementary Abelian 2-gr...
In this correspondance we describe a class of codes over GF(q), where q is a power of an odd prime. ...
AbstractIn IEEE Trans. Inform. Theory 46 (2000), 280, using characters of an elementary Abelian 2-gr...
Abstract In this correspondence we describe a class of codes over GF (q), where q is a power of an o...
AbstractBy means of Hall's Marriage Theorem, a class of q-ary codes are obtained through block desig...
For every prime-power q and every pair of natural numbers m ≤ n′, we construct a q-ary linear code o...
A class of binary group codes is investigated. These codes are the propelinear codes, defined over t...
AbstractWe prove that the automorphism group of Generalized Reed-Muller codes is the general linear ...
We consider here the construction of Type II codes over the abelian group ℤ4 × ℤ4. The definition of...
We consider here the construction of Type II codes over the abelian group ℤ4 × ℤ4. The definition of...
We introduce a new infinite family of quaternary cyclic (n,(n+1)2) and (n,(n − 1)2) codes which incl...
We introduce a new infinite family of quaternary cyclic (n,(n+1)2) and (n,(n − 1)2) codes which incl...
We introduce a new infinite family of quaternary cyclic (n,(n+1)2) and (n,(n − 1)2) codes which incl...
We introduce a new infinite family of quaternary cyclic (n,(n+1)2) and (n,(n − 1)2) codes which incl...
AbstractWe introduce a new infinite family of quaternary cyclic (n, (n+1)2) and (n, (n − 1)2) codes ...
AbstractIn IEEE Trans. Inform. Theory 46 (2000), 280, using characters of an elementary Abelian 2-gr...
In this correspondance we describe a class of codes over GF(q), where q is a power of an odd prime. ...
AbstractIn IEEE Trans. Inform. Theory 46 (2000), 280, using characters of an elementary Abelian 2-gr...
Abstract In this correspondence we describe a class of codes over GF (q), where q is a power of an o...
AbstractBy means of Hall's Marriage Theorem, a class of q-ary codes are obtained through block desig...
For every prime-power q and every pair of natural numbers m ≤ n′, we construct a q-ary linear code o...
A class of binary group codes is investigated. These codes are the propelinear codes, defined over t...
AbstractWe prove that the automorphism group of Generalized Reed-Muller codes is the general linear ...
We consider here the construction of Type II codes over the abelian group ℤ4 × ℤ4. The definition of...
We consider here the construction of Type II codes over the abelian group ℤ4 × ℤ4. The definition of...
We introduce a new infinite family of quaternary cyclic (n,(n+1)2) and (n,(n − 1)2) codes which incl...
We introduce a new infinite family of quaternary cyclic (n,(n+1)2) and (n,(n − 1)2) codes which incl...
We introduce a new infinite family of quaternary cyclic (n,(n+1)2) and (n,(n − 1)2) codes which incl...
We introduce a new infinite family of quaternary cyclic (n,(n+1)2) and (n,(n − 1)2) codes which incl...
AbstractWe introduce a new infinite family of quaternary cyclic (n, (n+1)2) and (n, (n − 1)2) codes ...
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