Parameters and generator matrices are given for the codes obtained by applying Goppa's algebraic-geometric construction method to Hermitian curves in PG(2,q), whereq = 2^{2s}for somesin {bf N}. Automorphisms of these codes are also discussed, and some results on self-duality and weak self-duality are given
AbstractParameters and generator matrices are given for the codes obtained by applying Goppa's algeb...
Algebraic Geometry is a branch of mathematics applied in so many disciplines including Coding Theory...
Given a linear code, it is important both to identify fast decoding algorithms and to estimate the r...
Parameters and generator matrices are given for the codes obtained by applying Goppa's algebraic-geo...
Parameters and generator matrices are given for the codes obtained by applying Goppa's algebraic-geo...
Parameters and generator matrices are given for the codes obtained by applying Goppa's algebraic-geo...
Parameters and generator matrices are given for the codes obtained by applying Goppa's algebraic-geo...
Hermitian functional and differential codes defined over divisors with strong combinatorial and alge...
Hermitian functional and differential codes defined over divisors with strong combinatorial and alge...
Hermitian functional and differential codes defined over divisors with strong combinatorial and alge...
AbstractParameters and generator matrices are given for the codes obtained by applying Goppa's algeb...
A short description is first given of the fascinating use of Hermitian curves and normal rational cu...
We investigate one-point algebraic geometry codes defined from curves related to the Hermitian curve...
We discuss some recent constructions of codes from algebraic curves due to Xing, Niederreiter, and L...
Let Χ be an algebraic curve of genus g ≥ 2 defined over a field Fq of characteristic p > 0. From Χ, ...
AbstractParameters and generator matrices are given for the codes obtained by applying Goppa's algeb...
Algebraic Geometry is a branch of mathematics applied in so many disciplines including Coding Theory...
Given a linear code, it is important both to identify fast decoding algorithms and to estimate the r...
Parameters and generator matrices are given for the codes obtained by applying Goppa's algebraic-geo...
Parameters and generator matrices are given for the codes obtained by applying Goppa's algebraic-geo...
Parameters and generator matrices are given for the codes obtained by applying Goppa's algebraic-geo...
Parameters and generator matrices are given for the codes obtained by applying Goppa's algebraic-geo...
Hermitian functional and differential codes defined over divisors with strong combinatorial and alge...
Hermitian functional and differential codes defined over divisors with strong combinatorial and alge...
Hermitian functional and differential codes defined over divisors with strong combinatorial and alge...
AbstractParameters and generator matrices are given for the codes obtained by applying Goppa's algeb...
A short description is first given of the fascinating use of Hermitian curves and normal rational cu...
We investigate one-point algebraic geometry codes defined from curves related to the Hermitian curve...
We discuss some recent constructions of codes from algebraic curves due to Xing, Niederreiter, and L...
Let Χ be an algebraic curve of genus g ≥ 2 defined over a field Fq of characteristic p > 0. From Χ, ...
AbstractParameters and generator matrices are given for the codes obtained by applying Goppa's algeb...
Algebraic Geometry is a branch of mathematics applied in so many disciplines including Coding Theory...
Given a linear code, it is important both to identify fast decoding algorithms and to estimate the r...
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