Master's Dissertation
DOI
https://doi.org/10.11606/D.55.2009.tde-01092009-090119
Document
Author
Full name
Rodrigo Lopes Costa
E-mail
Institute/School/College
Knowledge Area
Date of Defense
Published
São Carlos, 2009
Supervisor
Committee
Ruas, Maria Aparecida Soares (President)
Garcia, Ronaldo Alves
Manoel, Miriam Garcia
Garcia, Ronaldo Alves
Manoel, Miriam Garcia
Title in Portuguese
Geometria de teias
Keywords in Portuguese
Curvatura de blaschke
Folheações
Invariantes de uma teia
Teias
Folheações
Invariantes de uma teia
Teias
Abstract in Portuguese
A geometria de teias dedica-se ao estudo de invariantes locais para uma determinada configuração de folheações. Uma d-teia é uma coleção de folheações que estão em posição geral. Desta forma, uma d-teia plana, definida em 'R POT.2' ou 'C POT.2', nada mais é que uma família de d folheações por curvas. Apresentamos neste trabalho os principais conceitos da teoria clássica de teias, iniciada por W. Blaschke por volta de 1930, bem como uma abordagem atual utilizada no estudo de teias planas. São abordados dois tipos de problemas importantes na teoria: os problemas de linearização e de algebrização de teias. Provamos um resultado clássico no que concerne ao problema de linearização, e um resultado de algebrização de teias empregando métodos desenvolvidos mais recentemente
Title in English
Web geometry
Keywords in English
Blaschke curvature
Foliations
Invariants of a web
Webs
Foliations
Invariants of a web
Webs
Abstract in English
Web geometry is devoted to the study of local invariants of a certain configuration of foliations. A d-web is a collection of foliations in general position. Therefore, a d-web defined in 'R POT. 2' or 'C POT. 2' is just a family of d foliations by curves. We present in this work the main concepts of classical theory of webs, initiated by W. Blaschke around 1930, as well as newer methods used in the study of plane webs. We approach two important types of problems in the theory: problems of linearization and that of algebrization of webs. We prove a classical result concerning the linearization problem, and a result of algebrization of webs using recently developed methods
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Publishing Date
2009-09-01
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Digital Library of Theses and Dissertations of USP. Copyright © 2001-2024. All rights reserved.