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Algebraic-geometry codes, one-point codes, and evaluation codes

Authors:	Maria Bras-Amorós

Institution:	(1) Universitat Autònoma de Barcelona, Barcelona, Spain

Abstract:	One-point codes are those algebraic-geometry codes for which the associated divisor is a non-negative multiple of a single point. Evaluation codes were defined in order to give an algebraic generalization of both one-point algebraic-geometry codes and Reed–Muller codes. Given an ${\mathbb{F}}_q$ -algebra A, an order function $\rho$ on A and given a surjective ${\mathbb{F}}_q$ -morphism of algebras $\varphi: A\rightarrow {\mathbb{F}}_q^{n}$ , the ith evaluation code with respect to $A,\rho,\varphi$ is defined as the code $C_i=\varphi(\{f\in A: \rho(f)\leq i\})$ . In this work it is shown that under a certain hypothesis on the $\mathbb{F}_q$ -algebra A, not only any evaluation code is a one-point code, but any sequence of evaluation codes is a sequence of one-point codes. This hypothesis on A is that its field of fractions is a function field over $\mathbb{F}_q$ and that A is integrally closed. Moreover, we see that a sequence of algebraic-geometry codes G _i with associated divisors $\Gamma_i$ is the sequence of evaluation codes associated to some ${\mathbb{F}}_q$ -algebra A, some order function $\rho$ and some surjective morphism $\varphi$ with $\{f\in A: \rho(f)\leq i\}={\mathcal{L}}(\Gamma_i)$ if and only if it is a sequence of one-point codes.

Keywords:	Algebraic-geometry code One-point code Evaluation code
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