We study the higher weights of codes formed from planes and biplanes. We relate the higher weights of the Hull and the code of a plane and biplane. We determine all higher weight enumerators of planes and biplanes of order less or equal to 4.</p
ABSTRACT. The four known biplanes of order 9 (k ii) are described in terms of their ovals, %-chain s...
The minimum weight of the code generated by the incidence matrix of points versus lines in a project...
We show that the binary code C of the projective Hall plane Hq2 of even order q 2 where q = 2 t , fo...
We study the higher weights of codes formed from planes and biplanes. We relate the higher weights o...
We determine the weight enumerator of the code of the projective plane of order 5 by hand. The main ...
The hyperplanes intersecting a 2-weight code in the same number of points obviously form the point s...
Many research in coding theory is focussed on linear error-correcting codes. Since these codes are s...
Projective plane of order 10 does not exist. Proof of this assertion was finished in 1989 and is bas...
AbstractAn exhaustive computer search has established the existence of precisely four biplanes with ...
We investigate self-dual codes from symmetric designs, specifically for the case when these designs ...
Let Cn−1(n,q) be the code arising from the incidence of points and hyperplanes in the Desarguesian p...
AbstractThe weight enumerator of the binary error-correcting code generated by the rows of the incid...
This thesis is an exposition of the article entitled The Fabulous (11, 5, 2) Biplane by Ezra Brown w...
We discuss the class of projective systems whose supports are the complement of the union of two lin...
Determining the weight distribution of a code is an old and fundamental topic in coding theory that ...
ABSTRACT. The four known biplanes of order 9 (k ii) are described in terms of their ovals, %-chain s...
The minimum weight of the code generated by the incidence matrix of points versus lines in a project...
We show that the binary code C of the projective Hall plane Hq2 of even order q 2 where q = 2 t , fo...
We study the higher weights of codes formed from planes and biplanes. We relate the higher weights o...
We determine the weight enumerator of the code of the projective plane of order 5 by hand. The main ...
The hyperplanes intersecting a 2-weight code in the same number of points obviously form the point s...
Many research in coding theory is focussed on linear error-correcting codes. Since these codes are s...
Projective plane of order 10 does not exist. Proof of this assertion was finished in 1989 and is bas...
AbstractAn exhaustive computer search has established the existence of precisely four biplanes with ...
We investigate self-dual codes from symmetric designs, specifically for the case when these designs ...
Let Cn−1(n,q) be the code arising from the incidence of points and hyperplanes in the Desarguesian p...
AbstractThe weight enumerator of the binary error-correcting code generated by the rows of the incid...
This thesis is an exposition of the article entitled The Fabulous (11, 5, 2) Biplane by Ezra Brown w...
We discuss the class of projective systems whose supports are the complement of the union of two lin...
Determining the weight distribution of a code is an old and fundamental topic in coding theory that ...
ABSTRACT. The four known biplanes of order 9 (k ii) are described in terms of their ovals, %-chain s...
The minimum weight of the code generated by the incidence matrix of points versus lines in a project...
We show that the binary code C of the projective Hall plane Hq2 of even order q 2 where q = 2 t , fo...
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