Doctoral Thesis
DOI
https://doi.org/10.11606/T.55.2016.tde-10082016-110753
Document
Author
Full name
Sadao Massago
Institute/School/College
Knowledge Area
Date of Defense
Published
São Carlos, 2000
Supervisor
Committee
Saeki, Osamu (President)
Biasi, Carlos
Goncalves, Daciberg Lima
Libardi, Alice Kimie Miwa
Pergher, Pedro Luiz Queiroz
Biasi, Carlos
Goncalves, Daciberg Lima
Libardi, Alice Kimie Miwa
Pergher, Pedro Luiz Queiroz
Title in Portuguese
Estrutura "open book" em variedades (n - 1)-conexas de dimensão 2n + 1
Keywords in Portuguese
não disponível
Abstract in Portuguese
O problema da classificação de nós fibrados simples (ou estruturas "open book") nas esferas de dimensões ímpares foi estudado por diversos autores Levine, Durfee, Kato, etc. e teoremas da classificação foram obtidos. Por outro lado, a existência de estruturas "open book" em variedades de dimensões ímpares foi estudada por vários autores Winkelnkemper, A'Campo, Latuson, Quinn e Tatrtura. Porém, a classificação destas estruturas não foi estudada até agora. Neste trabalho, apresentamos uma classificação completa por isotopia das estruturas "open book" simples sobre (2n + 1)-variedades (n - 1)-conexas e fechadas com n ≥ 4,n ≠ 7, e sobre (2n + 1)-esferas homológicas racionais (n -1)-conexas com n = 3, 7, utilizando invariantes algébricos.
Title in English
Open book' structures in (n-1) connected manifolds of dimension 2n + 1
Keywords in English
Not available
Abstract in English
The classification problem of simple fibered knots (or open book structures) on odd dimensional spheres was studied by several authors Levine, Durfee, Kato, etc. and classification theorems have been obtained. On the other hand, the existence of open book structures on odd dimensional manifolds was studied by severa! authors Winkelnkemper, A'Campo, Lawson, Quinn, and Ternura. However, the classification of these structures has not been studied until now. In this work, we present a complete classification up to isotopy of simple open book structures on closed (n - 1)-connected manifolds of dimension 2n + 1 for n ≥ 4, n ≠ 7, and on (n - 1)-connected rational homology (2n + 1)-spheres for n = 3, 7, using their algebraic invariants.
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Publishing Date
2016-08-10
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Digital Library of Theses and Dissertations of USP. Copyright © 2001-2024. All rights reserved.