Doctoral Thesis
DOI
https://doi.org/10.11606/T.55.2011.tde-14102011-160937
Document
Author
Full name
Romenique da Rocha Silva
E-mail
Institute/School/College
Knowledge Area
Date of Defense
Published
São Carlos, 2011
Supervisor
Committee
Apaza, Carlos Alberto Maquera (President)
Horita, Vanderlei Minori
Mendoza, Alexander Eduardo Arbieto
Tahzibi, Ali
Varandas, Paulo César Rodrigues Pinto
Horita, Vanderlei Minori
Mendoza, Alexander Eduardo Arbieto
Tahzibi, Ali
Varandas, Paulo César Rodrigues Pinto
Title in Portuguese
Toros incompressíveis para ações Anosov de 'R POT. k' sobre uma variedade de dimensão K+2
Keywords in Portuguese
Ação Anosov
Anel de Birkhoff
Automorfismo do recobrimento
Toro incompreensível
Anel de Birkhoff
Automorfismo do recobrimento
Toro incompreensível
Abstract in Portuguese
Dentre todos os sistemas dinâmicos os sistemas Anosov têm atraído a atenção de muitos matemáticos. No caso de fluxo Anosov em uma variedade fechada M de dimensão três, Sérgio Fenley definiu o conceito de losangos no recobrimento universal de M e obteve resultados importantes envolvendo losangos e automorfismos do recobrimento universal. Seguindo o que foi feito por Fenley, e utilizando o conceito de losangos no espaço das órbitas do fluxo levantado (no recobrimento universal), Thierry Barbot obteve condições suficientes para que um toro incompressível numa 3-variedade fechada suportando um fluxo Anosov seja isotópico a um outro que é transverso ao fluxo. Neste trabalho consideramos ações Anosov de 'R POT. k' sobre uma variedade fechada M de dimensão k + 2. Primeiramente, conseguimos resultados análogos aos de Fenley (sobre existência de losangos) para estas ações, e usando isso, finalmente obtemos condições suficientes para que um toro incompressível seja isotópico a um toro transverso à ação. Este último resultado é uma generalização de Barbot mencionado acima
Title in English
Incompressible torus for Anosov actions of 'R POT. k' on a manifold of dimension k+2
Keywords in English
Anosov action
Birkhoff's ring
Covering automorphism
Incompressible torus
Birkhoff's ring
Covering automorphism
Incompressible torus
Abstract in English
Among all dynamical systems the Anosov systems has attracted the attention of many mathematicians. In the case of an Anosov flow in a closed manifold M of dimension three, Sérgio Fenley defined the concept of lozenges in the universal covering of M and obtained important results involving lozenges and covering automorphism. Following what was made by Fenley, and using the concept of lozenge on the orbit space of the lifted flow (in the universal covering). Thierry Barbot obtains sufficient conditions for an incompressible torus in a closed 3-manifold supporting an Anosov flow to be isotopic to another which is transverse to flow. If this work we considered Anosov of 'R POT. k' on a closed manifold M of dimension k + 2. First, we obtain analogous results those of Fenley (about existence of lozenges) for this actions, and using this, finally we obtain sufficient conditions for an incompressible torus to be isotopic to another torus which is transverse to action. This last result is a generalization of Barbot's result mentioned above
WARNING - Viewing this document is conditioned on your acceptance of the following terms of use:
This document is only for private use for research and teaching activities. Reproduction for commercial use is forbidden. This rights cover the whole data about this document as well as its contents. Any uses or copies of this document in whole or in part must include the author's name.
This document is only for private use for research and teaching activities. Reproduction for commercial use is forbidden. This rights cover the whole data about this document as well as its contents. Any uses or copies of this document in whole or in part must include the author's name.
Romenique_Tese.pdf (728.07 Kbytes)
Publishing Date
2011-10-14
WARNING: Learn what derived works are clicking here.
All rights of the thesis/dissertation are from the authors
CeTI-SC/STI
Digital Library of Theses and Dissertations of USP. Copyright © 2001-2024. All rights reserved.
CeTI-SC/STI
Digital Library of Theses and Dissertations of USP. Copyright © 2001-2024. All rights reserved.