Álgebras munidas de função peso e códigos de Goppa pontuais
TL;DRAbstract
The main objective of this text is to present the central result of R. Matsumoto concerning those algebra with a weight function being affine coordinate ring of an affine algebraic curve with exactly one place at infinity. From that statement one can conclude that the evaluation codes, introduced by Ho /holdt, van Lint e Pellikaan, constructed on this algebra are particular cases of geometric Goppa codes, that is, one point AG codes. For this, we use results of the algebraic function fields theory, geometric Goppa codes and commutative algebra. The introduction of the concepts of order and weight functions enable us to describe the evaluation codes and thus to determine lower bounds for the minimum distance of its duals codes, in same cases, are better than the Goppa's bounds.
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The main objective of this text is to present the central result of R. Matsumoto concerning those algebra with a weight function being affine coordinate ring of an affine algebraic curve with exactly one place at infinity. From that statement one can conclude that the evaluation codes, introduced by Ho /holdt, van Lint e Pellikaan, constructed on this algebra are particular cases of geometric Goppa codes, that is, one point AG codes. For this, we use results of the algebraic function fields theory, geometric Goppa codes and commutative algebra. The introduction of the concepts of order and weight functions enable us to describe the evaluation codes and thus to determine lower bounds for the minimum distance of its duals codes, in same cases, are better than the Goppa's bounds.
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