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1	Corpos de funções algébricas sobre corpos finitos / Algebraic Function Fields over finite fields Campos, Alex Freitas de 22 November 2017 (has links) Este trabalho é essencialmente sobre pontos racionais em curvas algébricas sobre corpos finitos ou, equivalentemente, lugares racionais em corpos de funções algébricas em uma variável sobre corpos finitos. O objetivo é a demonstração da existência de constantes aq e bq ∈ R> 0 tais que se g ≥ aq. N + bq, então existe uma curva sobre Fq de gênero g com N pontos racionais. / This work is essentially about rational points on algebraic curves over finite fields or, equivalently, rational places on algebraic function fields of one variable over finite fields. The aim is the proof of the existence of constants aq and bq ∈ R> 0 such that if g ≥ aq ∈ aq . N+bq then there exists a curve over Fq of genus g with N rational points. Artin-Schreier extensions Corpos finitos Extensões de Artin-Schreier Finite fields Pontos racionais rational points
2	Corpos de funções algébricas sobre corpos finitos / Algebraic Function Fields over finite fields Alex Freitas de Campos 22 November 2017 (has links) Este trabalho é essencialmente sobre pontos racionais em curvas algébricas sobre corpos finitos ou, equivalentemente, lugares racionais em corpos de funções algébricas em uma variável sobre corpos finitos. O objetivo é a demonstração da existência de constantes aq e bq ∈ R> 0 tais que se g ≥ aq. N + bq, então existe uma curva sobre Fq de gênero g com N pontos racionais. / This work is essentially about rational points on algebraic curves over finite fields or, equivalently, rational places on algebraic function fields of one variable over finite fields. The aim is the proof of the existence of constants aq and bq ∈ R> 0 such that if g ≥ aq ∈ aq . N+bq then there exists a curve over Fq of genus g with N rational points. Corpos finitos Extensões de Artin-Schreier Pontos racionais Artin-Schreier extensions Finite fields rational points
3	Algebraic Curves over Finite Fields Rovi, Carmen January 2010 (has links) <p>This thesis surveys the issue of finding rational points on algebraic curves over finite fields. Since Goppa's construction of algebraic geometric codes, there has been great interest in finding curves with many rational points. Here we explain the main tools for finding rational points on a curve over a nite eld and provide the necessary background on ring and field theory. Four different articles are analyzed, the first of these articles gives a complete set of table showing the numbers of rational points for curves with genus up to 50. The other articles provide interesting constructions of covering curves: covers by the Hemitian curve, Kummer extensions and Artin-Schreier extensions. With these articles the great difficulty of finding explicit equations for curves with many rational points is overcome. With the method given by Arnaldo García in [6] we have been able to nd examples that can be used to define the lower bounds for the corresponding entries in the tables given in http: //wins.uva.nl/~geer, which to the time of writing this Thesis appear as "no information available". In fact, as the curves found are maximal, these entries no longer need a bound, they can be given by a unique entry, since the exact value of N<sub>q</sub>(g) is now known.</p><p>At the end of the thesis an outline of the construction of Goppa codes is given and the NXL and XNL codes are presented.</p><p> </p> Nullstellensatz variety rational function Function field Weierstrass gap Theorem Ramification Hurwitz genus formula Kummer and Artin-Schreier extensions Hasse-Weil bound Goppa codes. Algebra and geometry Algebra och geometri
4	Algebraic Curves over Finite Fields Rovi, Carmen January 2010 (has links) This thesis surveys the issue of finding rational points on algebraic curves over finite fields. Since Goppa's construction of algebraic geometric codes, there has been great interest in finding curves with many rational points. Here we explain the main tools for finding rational points on a curve over a nite eld and provide the necessary background on ring and field theory. Four different articles are analyzed, the first of these articles gives a complete set of table showing the numbers of rational points for curves with genus up to 50. The other articles provide interesting constructions of covering curves: covers by the Hemitian curve, Kummer extensions and Artin-Schreier extensions. With these articles the great difficulty of finding explicit equations for curves with many rational points is overcome. With the method given by Arnaldo García in [6] we have been able to nd examples that can be used to define the lower bounds for the corresponding entries in the tables given in http: //wins.uva.nl/~geer, which to the time of writing this Thesis appear as "no information available". In fact, as the curves found are maximal, these entries no longer need a bound, they can be given by a unique entry, since the exact value of Nq(g) is now known. At the end of the thesis an outline of the construction of Goppa codes is given and the NXL and XNL codes are presented. Nullstellensatz variety rational function Function field Weierstrass gap Theorem Ramification Hurwitz genus formula Kummer and Artin-Schreier extensions Hasse-Weil bound Goppa codes. Algebra and geometry Algebra och geometri

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