On non-smooth regular curves via a descent approach

Detalhes bibliográficos
Autor(a) principal: Dorado, Camilo David Moreira
Data de Publicação: 2024
Tipo de documento: Tese
Idioma: eng
Título da fonte: Repositório Institucional da Universidade Federal Fluminense (RIUFF)
Texto Completo: https://app.uff.br/riuff/handle/1/33027
Resumo: This work is devoted to the study of the problem of classifying non-smooth regular curves in projective spaces. This problem has been studied to look for counterexamples to Bertini’s theorem on the variation of singular points of linear series. Such a classification has been introduced by K.-O. Stöhr, taking advantage of the fact that a non-smooth regular curve is an equivalent object to a non-conservative function field, which in turn occurs only over non-perfect fields K of characteristic p > 0. We propose here a different way to approach this problem, relying on the fact that a non-smooth regular curve in Pn K provides a singular curve when viewed in P n K1/p , after extending its base field to K1/p For this purpose, we will proceed with the following three steps. The first one is to study K-invariant sub-schemes of P n K1/p , which are those coming from base change of sub-schemes of P n K. To do this we will need two ingredients: to see P nK as a quotient of P n K1/p by a p closed foliation and to use K-invariant connections on coherent sheaves, introduced by N. Katz. The second one is to study local invariants at non-smooth regular points of algebraic curves. As an application of the theory developed in the previous two items, we classify complete, geometrically integral, non-smooth regular curves C of genus 3, over a separably closed field K, where C ×Spec K Spec K is a non-hyperelliptic curve with normalization having genus 1.
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spelling On non-smooth regular curves via a descent approachNon-smooth regular curvesBertini’s theoremnon-conservative function fieldsp-closed foliationsintegrable connectionsCurva MatemáticaCurva (Geometria)Curvas regulares e não lisasCorpos de funções não conservativosFolheações p-fechadasConexões integráveisConexões com p-curvatura zeroTeorema de BertiniThis work is devoted to the study of the problem of classifying non-smooth regular curves in projective spaces. This problem has been studied to look for counterexamples to Bertini’s theorem on the variation of singular points of linear series. Such a classification has been introduced by K.-O. Stöhr, taking advantage of the fact that a non-smooth regular curve is an equivalent object to a non-conservative function field, which in turn occurs only over non-perfect fields K of characteristic p > 0. We propose here a different way to approach this problem, relying on the fact that a non-smooth regular curve in Pn K provides a singular curve when viewed in P n K1/p , after extending its base field to K1/p For this purpose, we will proceed with the following three steps. The first one is to study K-invariant sub-schemes of P n K1/p , which are those coming from base change of sub-schemes of P n K. To do this we will need two ingredients: to see P nK as a quotient of P n K1/p by a p closed foliation and to use K-invariant connections on coherent sheaves, introduced by N. Katz. The second one is to study local invariants at non-smooth regular points of algebraic curves. As an application of the theory developed in the previous two items, we classify complete, geometrically integral, non-smooth regular curves C of genus 3, over a separably closed field K, where C ×Spec K Spec K is a non-hyperelliptic curve with normalization having genus 1.Este trabalho é dedicado ao estudo do problema de classificação de curvas regulares e não lisas em espaços projetivos. Este problema foi estudado para buscar contra - exemplos do teorema de Bertini sobre a variação de pontos singulares em sistemas lineares. Tal classificação foi introduzida por K.-O. Stöhr, aproveitando o fato de que uma curva regular e não lisa é um objeto equivalente a um corpo de funções não conservativo, que por sua vez ocorre apenas sobre corpos não perfeitos K de característica p > 0. Propomos aqui uma maneira diferente de abordar este problema, contando com o fato de que uma curva regular e não lisa em P fornece uma curva singular quando vista em P , após estender seu corpo de base para K 1/p. Para isso, seguiremos as seguintes três etapas. A primeira é estudar os subesquemas n K-invariantes de P , que são aqueles provenientes da mudança de base dos subesquemas 1/p K n K n K n de P . Para fazer isso vamos precisar de dois ingredientes: ver P como um quociente de P 1/p K por uma folheação p-fechada e usar conexões integráveis em feixes coerentes, introduzidas por N. Katz. A segunda é estudar invariantes locais em pontos regulares e não lisos de curvas algébricas. Como aplicação da teoria desenvolvida nos dois itens anteriores, classificamos curvas completas, geometricamente integrais, regulares e não lisas C do gênero 3, sobre um corpo separavelmente fechado K , onde C ×−SpecK é uma curva não hiperelíptica com normalização de gênero 1.58 f.Salomão, RodrigoBorelli, GiuseppeDorado, Camilo David Moreira2024-07-05T17:24:35Z2024-07-05T17:24:35Zinfo:eu-repo/semantics/publishedVersioninfo:eu-repo/semantics/doctoralThesisapplication/pdfDORADO, Camilo David Moreira. On non-smooth regular curves via a descent approach. 2023. 58 f. Tese (Doutorado em Matemática) – Programa de Pós-Graduação em Matemática, Instituto de Matemática e Estatística, Universidade Federal Fluminense, Niterói, 2023.https://app.uff.br/riuff/handle/1/33027CC-BY-SAinfo:eu-repo/semantics/openAccessengreponame:Repositório Institucional da Universidade Federal Fluminense (RIUFF)instname:Universidade Federal Fluminense (UFF)instacron:UFF2024-07-05T17:26:46Zoai:app.uff.br:1/33027Repositório InstitucionalPUBhttps://app.uff.br/oai/requestriuff@id.uff.bropendoar:21202024-08-19T11:15:13.203041Repositório Institucional da Universidade Federal Fluminense (RIUFF) - Universidade Federal Fluminense (UFF)false
dc.title.none.fl_str_mv On non-smooth regular curves via a descent approach
title On non-smooth regular curves via a descent approach
spellingShingle On non-smooth regular curves via a descent approach
Dorado, Camilo David Moreira
Non-smooth regular curves
Bertini’s theorem
non-conservative function fields
p-closed foliations
integrable connections
Curva Matemática
Curva (Geometria)
Curvas regulares e não lisas
Corpos de funções não conservativos
Folheações p-fechadas
Conexões integráveis
Conexões com p-curvatura zero
Teorema de Bertini
title_short On non-smooth regular curves via a descent approach
title_full On non-smooth regular curves via a descent approach
title_fullStr On non-smooth regular curves via a descent approach
title_full_unstemmed On non-smooth regular curves via a descent approach
title_sort On non-smooth regular curves via a descent approach
author Dorado, Camilo David Moreira
author_facet Dorado, Camilo David Moreira
author_role author
dc.contributor.none.fl_str_mv Salomão, Rodrigo
Borelli, Giuseppe
dc.contributor.author.fl_str_mv Dorado, Camilo David Moreira
dc.subject.por.fl_str_mv Non-smooth regular curves
Bertini’s theorem
non-conservative function fields
p-closed foliations
integrable connections
Curva Matemática
Curva (Geometria)
Curvas regulares e não lisas
Corpos de funções não conservativos
Folheações p-fechadas
Conexões integráveis
Conexões com p-curvatura zero
Teorema de Bertini
topic Non-smooth regular curves
Bertini’s theorem
non-conservative function fields
p-closed foliations
integrable connections
Curva Matemática
Curva (Geometria)
Curvas regulares e não lisas
Corpos de funções não conservativos
Folheações p-fechadas
Conexões integráveis
Conexões com p-curvatura zero
Teorema de Bertini
description This work is devoted to the study of the problem of classifying non-smooth regular curves in projective spaces. This problem has been studied to look for counterexamples to Bertini’s theorem on the variation of singular points of linear series. Such a classification has been introduced by K.-O. Stöhr, taking advantage of the fact that a non-smooth regular curve is an equivalent object to a non-conservative function field, which in turn occurs only over non-perfect fields K of characteristic p > 0. We propose here a different way to approach this problem, relying on the fact that a non-smooth regular curve in Pn K provides a singular curve when viewed in P n K1/p , after extending its base field to K1/p For this purpose, we will proceed with the following three steps. The first one is to study K-invariant sub-schemes of P n K1/p , which are those coming from base change of sub-schemes of P n K. To do this we will need two ingredients: to see P nK as a quotient of P n K1/p by a p closed foliation and to use K-invariant connections on coherent sheaves, introduced by N. Katz. The second one is to study local invariants at non-smooth regular points of algebraic curves. As an application of the theory developed in the previous two items, we classify complete, geometrically integral, non-smooth regular curves C of genus 3, over a separably closed field K, where C ×Spec K Spec K is a non-hyperelliptic curve with normalization having genus 1.
publishDate 2024
dc.date.none.fl_str_mv 2024-07-05T17:24:35Z
2024-07-05T17:24:35Z
dc.type.status.fl_str_mv info:eu-repo/semantics/publishedVersion
dc.type.driver.fl_str_mv info:eu-repo/semantics/doctoralThesis
format doctoralThesis
status_str publishedVersion
dc.identifier.uri.fl_str_mv DORADO, Camilo David Moreira. On non-smooth regular curves via a descent approach. 2023. 58 f. Tese (Doutorado em Matemática) – Programa de Pós-Graduação em Matemática, Instituto de Matemática e Estatística, Universidade Federal Fluminense, Niterói, 2023.
https://app.uff.br/riuff/handle/1/33027
identifier_str_mv DORADO, Camilo David Moreira. On non-smooth regular curves via a descent approach. 2023. 58 f. Tese (Doutorado em Matemática) – Programa de Pós-Graduação em Matemática, Instituto de Matemática e Estatística, Universidade Federal Fluminense, Niterói, 2023.
url https://app.uff.br/riuff/handle/1/33027
dc.language.iso.fl_str_mv eng
language eng
dc.rights.driver.fl_str_mv CC-BY-SA
info:eu-repo/semantics/openAccess
rights_invalid_str_mv CC-BY-SA
eu_rights_str_mv openAccess
dc.format.none.fl_str_mv application/pdf
dc.source.none.fl_str_mv reponame:Repositório Institucional da Universidade Federal Fluminense (RIUFF)
instname:Universidade Federal Fluminense (UFF)
instacron:UFF
instname_str Universidade Federal Fluminense (UFF)
instacron_str UFF
institution UFF
reponame_str Repositório Institucional da Universidade Federal Fluminense (RIUFF)
collection Repositório Institucional da Universidade Federal Fluminense (RIUFF)
repository.name.fl_str_mv Repositório Institucional da Universidade Federal Fluminense (RIUFF) - Universidade Federal Fluminense (UFF)
repository.mail.fl_str_mv riuff@id.uff.br
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