Involuções fixando somas conexas de espaços projetivos e melhorias para o Five Halves Theorem quando Fix(T ) = F n ∪ F j
| Ano de defesa: | 2022 |
|---|---|
| Autor(a) principal: | |
| Orientador(a): |
Pergher, Pedro Luiz Queiroz
 |
| Banca de defesa: | |
| Tipo de documento: | Tese |
| Tipo de acesso: | Acesso aberto |
| Idioma: | por |
| Instituição de defesa: |
Universidade Federal de São Carlos
Câmpus São Carlos |
| Programa de Pós-Graduação: |
Programa de Pós-Graduação em Matemática - PPGM
|
| Departamento: |
Não Informado pela instituição
|
| País: |
Não Informado pela instituição
|
| Palavras-chave em Português: | |
| Palavras-chave em Inglês: | |
| Área do conhecimento CNPq: | |
| Link de acesso: | https://repositorio.ufscar.br/handle/20.500.14289/17303 |
Resumo: | Let M m be a closed and smooth m-dimensional manifold, and T : M m → M m a smooth involution, that is, a period 2 diffeomorphism defined on M m . It is well known the fact that the fixed point set of T , F = {x ∈ M m |T (x) = x}, is a finite and disjoint union of closed smooth submanifolds, whose dimensions can vary from 0 to m. We write F = ∪ni=0 F i , n ≤ m, where F i denotes the disjoint union of the i-dimensional components of F. The famous Five Halves Theorem of J. Boardman assures that, if the pair (M m , T ) does not bound equivariantly, then we have m ≤ 52 n, and with this level of generality, this bound is best possible. This result motivated P. Pergher to introduce, in the literature, the following type of question: is it possible to improve the Boardman’s bound by imposing the omission of some dimensions of F? In this work, our first objective is obtaining a result of this type, specifically the case where F has the form F n ∪ F j , 0 ≤ j < n, and with F n ∪ F j not being a boundary. There are several results of this nature in the literature, as will be detailed in the Introduction in historical and chronological terms. The second goal of this work lives in the context of classifying, up to equivariant cobordism, involutions (M, T ) whose fixed point set is a pre-selected manifold (or a disjoint union of manifolds) F. This line of problems is well-established in the literature, see in the Introduction references with several correlated results. Specifically, in this work we will address the case in which F is a connected sum of two projectives spaces real, complex and quaternionic, F = Kd P(n)#Kd P(n), with n odd, where d = 1, 2 and respectively symbolize the real, complex and quaternionic cases. Again, the relationship of this case with existing cases in the literature will be described in the Introduction. |
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Moura, LarissaPergher, Pedro Luiz Queirozhttp://lattes.cnpq.br/3328545959112090http://lattes.cnpq.br/8893284640264727951acf34-8025-4e91-bc1d-dddae4acb9ff2023-01-30T19:51:07Z2023-01-30T19:51:07Z2022-12-06MOURA, Larissa. Involuções fixando somas conexas de espaços projetivos e melhorias para o Five Halves Theorem quando Fix(T ) = F n ∪ F j. 2022. Tese (Doutorado em Matemática) – Universidade Federal de São Carlos, São Carlos, 2022. Disponível em: https://repositorio.ufscar.br/handle/20.500.14289/17303.https://repositorio.ufscar.br/handle/20.500.14289/17303Let M m be a closed and smooth m-dimensional manifold, and T : M m → M m a smooth involution, that is, a period 2 diffeomorphism defined on M m . It is well known the fact that the fixed point set of T , F = {x ∈ M m |T (x) = x}, is a finite and disjoint union of closed smooth submanifolds, whose dimensions can vary from 0 to m. We write F = ∪ni=0 F i , n ≤ m, where F i denotes the disjoint union of the i-dimensional components of F. The famous Five Halves Theorem of J. Boardman assures that, if the pair (M m , T ) does not bound equivariantly, then we have m ≤ 52 n, and with this level of generality, this bound is best possible. This result motivated P. Pergher to introduce, in the literature, the following type of question: is it possible to improve the Boardman’s bound by imposing the omission of some dimensions of F? In this work, our first objective is obtaining a result of this type, specifically the case where F has the form F n ∪ F j , 0 ≤ j < n, and with F n ∪ F j not being a boundary. There are several results of this nature in the literature, as will be detailed in the Introduction in historical and chronological terms. The second goal of this work lives in the context of classifying, up to equivariant cobordism, involutions (M, T ) whose fixed point set is a pre-selected manifold (or a disjoint union of manifolds) F. This line of problems is well-established in the literature, see in the Introduction references with several correlated results. Specifically, in this work we will address the case in which F is a connected sum of two projectives spaces real, complex and quaternionic, F = Kd P(n)#Kd P(n), with n odd, where d = 1, 2 and respectively symbolize the real, complex and quaternionic cases. Again, the relationship of this case with existing cases in the literature will be described in the Introduction.Sejam M m uma variedade suave, fechada e m-dimensional, e T : M m → M m uma involução suave. É conhecido o fato de que o conjunto de pontos fixos de T , , F = {x ∈ M m |T (x) = x}, é uma união disjunta e finita de subvariedades fechadas de diferentes dimensões. Escrevemos F = ∪ni=0 F i , n ≤ m, onde F i denota a união das componentes i-dimensionais de F. O famoso Five Halves Theorem of J. Boardman diz que, se o par (M m , T ) não borda equivariantemente, então temos que m ≤ 25 n, e com essa generalidade esse resultado é o melhor possível. Esse resultado motivou P. Pergher a introduzir, na literatura, a seguinte questão: é possível melhorar o limitante de Boardman se impomos a omissão de algumas dimensões no conjunto de pontos fixos? O primeiro objetivo desse trabalho é obter um resultado desse tipo, achando um limite superior para m no caso em que F tenha a forma F n ∪ F j , 0 ≤ j < n e com F n ∪ F j não bordando. Existem vários resultados prévios na literatura desta natureza, conforme será detalhado na Introdução em termos históricos e cronológicos. O segundo objetivo desse trabalho mora no contexto de se classificar classes de cobordismo equi- variante de involuções (M, T ) que possuem um conjunto de pontos fixos pré-fixado F. Essa é uma linha de problemas bem consolidada na literatura, vide na Introdução referências a diversos resultados correlatos. Nesse trabalho, abordaremos o caso em que F é a soma conexa de dois espaços projetivos reais, complexos e quaterniônicos, F = Kd P(n)#Kd P(n), com n ímpar, onde d = 1, 2 e 4 simbolizam os casos reais, complexos e quaterniônicos, respectivamente. Novamente, a relação deste caso com os casos já existentes na literatura será descrita na Introdução.Coordenação de Aperfeiçoamento de Pessoal de Nível Superior (CAPES)porUniversidade Federal de São CarlosCâmpus São CarlosPrograma de Pós-Graduação em Matemática - PPGMUFSCarCC0 1.0 Universalhttp://creativecommons.org/publicdomain/zero/1.0/info:eu-repo/semantics/openAccessSoma conexa de fibradosLimitante de Stong-PergherSoma conexa de espaços projetivosNúmero característicoClasse de Stiefel-WhitneyConnected sum of fiber bundlesStong-Pergher boundConnected sum of two copies of projective spacesStiefel-Whitney classCharacteristic numberCIENCIAS EXATAS E DA TERRA::MATEMATICAInvoluções fixando somas conexas de espaços projetivos e melhorias para o Five Halves Theorem quando Fix(T ) = F n ∪ F jInvolutions fixing connected sums of projective spaces and improvements to the Five Halves Theorem when Fix(T ) = F n ∪ F j .info:eu-repo/semantics/publishedVersioninfo:eu-repo/semantics/doctoralThesis600600f365652a-a273-4c63-93e5-cb9755dde3d2reponame:Repositório Institucional da UFSCARinstname:Universidade Federal de São Carlos (UFSCAR)instacron:UFSCARCC-LICENSElicense_rdflicense_rdfapplication/rdf+xml; charset=utf-8700https://repositorio.ufscar.br/bitstreams/886dc384-db32-40fe-ab5a-a172a2bb28ac/download79da7ba44461b593b4f6afc1f09853c4MD56falseAnonymousREADORIGINALTese_Larissa_Moura.pdfTese_Larissa_Moura.pdfapplication/pdf500045https://repositorio.ufscar.br/bitstreams/1e48a810-dedb-4364-b738-473f21110910/download231382408c56c279bcf81125b65953f4MD51trueAnonymousREADCarta de aprovação.pdfCarta de aprovação.pdfCarta de aprovaçãoapplication/pdf2328788https://repositorio.ufscar.br/bitstreams/d980ea11-737c-47ce-bf1e-49ee303fe20a/download1e5057a22ae306566ebc0c28204ce649MD55falseTEXTTese_Larissa_Moura.pdf.txtTese_Larissa_Moura.pdf.txtExtracted texttext/plain131868https://repositorio.ufscar.br/bitstreams/f862ae50-9a90-4df4-ac32-f58e0c40e683/download220beeaeeec85ca64b3d75496e3e155bMD511falseAnonymousREADCarta de aprovação.pdf.txtCarta de aprovação.pdf.txtExtracted texttext/plain1https://repositorio.ufscar.br/bitstreams/cb84a0b7-116d-4318-8557-3a28ee3601e2/download68b329da9893e34099c7d8ad5cb9c940MD513falseTHUMBNAILTese_Larissa_Moura.pdf.jpgTese_Larissa_Moura.pdf.jpgIM Thumbnailimage/jpeg6857https://repositorio.ufscar.br/bitstreams/0b13745e-c01d-4238-a16a-4bb8093ba198/download0f0566804efa10c4694c929484613cebMD512falseAnonymousREADCarta de aprovação.pdf.jpgCarta de aprovação.pdf.jpgIM Thumbnailimage/jpeg8648https://repositorio.ufscar.br/bitstreams/02cfea99-6471-4dfd-89cf-0f9650800c6e/download5bdec2608aa1a2c27ad90ac86f0972dcMD514false20.500.14289/173032025-02-05 22:48:47.771http://creativecommons.org/publicdomain/zero/1.0/CC0 1.0 Universalopen.accessoai:repositorio.ufscar.br:20.500.14289/17303https://repositorio.ufscar.brRepositório InstitucionalPUBhttps://repositorio.ufscar.br/oai/requestrepositorio.sibi@ufscar.bropendoar:43222025-02-06T01:48:47Repositório Institucional da UFSCAR - Universidade Federal de São Carlos (UFSCAR)false |
| dc.title.por.fl_str_mv |
Involuções fixando somas conexas de espaços projetivos e melhorias para o Five Halves Theorem quando Fix(T ) = F n ∪ F j |
| dc.title.alternative.eng.fl_str_mv |
Involutions fixing connected sums of projective spaces and improvements to the Five Halves Theorem when Fix(T ) = F n ∪ F j . |
| title |
Involuções fixando somas conexas de espaços projetivos e melhorias para o Five Halves Theorem quando Fix(T ) = F n ∪ F j |
| spellingShingle |
Involuções fixando somas conexas de espaços projetivos e melhorias para o Five Halves Theorem quando Fix(T ) = F n ∪ F j Moura, Larissa Soma conexa de fibrados Limitante de Stong-Pergher Soma conexa de espaços projetivos Número característico Classe de Stiefel-Whitney Connected sum of fiber bundles Stong-Pergher bound Connected sum of two copies of projective spaces Stiefel-Whitney class Characteristic number CIENCIAS EXATAS E DA TERRA::MATEMATICA |
| title_short |
Involuções fixando somas conexas de espaços projetivos e melhorias para o Five Halves Theorem quando Fix(T ) = F n ∪ F j |
| title_full |
Involuções fixando somas conexas de espaços projetivos e melhorias para o Five Halves Theorem quando Fix(T ) = F n ∪ F j |
| title_fullStr |
Involuções fixando somas conexas de espaços projetivos e melhorias para o Five Halves Theorem quando Fix(T ) = F n ∪ F j |
| title_full_unstemmed |
Involuções fixando somas conexas de espaços projetivos e melhorias para o Five Halves Theorem quando Fix(T ) = F n ∪ F j |
| title_sort |
Involuções fixando somas conexas de espaços projetivos e melhorias para o Five Halves Theorem quando Fix(T ) = F n ∪ F j |
| author |
Moura, Larissa |
| author_facet |
Moura, Larissa |
| author_role |
author |
| dc.contributor.authorlattes.por.fl_str_mv |
http://lattes.cnpq.br/8893284640264727 |
| dc.contributor.author.fl_str_mv |
Moura, Larissa |
| dc.contributor.advisor1.fl_str_mv |
Pergher, Pedro Luiz Queiroz |
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http://lattes.cnpq.br/3328545959112090 |
| dc.contributor.authorID.fl_str_mv |
951acf34-8025-4e91-bc1d-dddae4acb9ff |
| contributor_str_mv |
Pergher, Pedro Luiz Queiroz |
| dc.subject.por.fl_str_mv |
Soma conexa de fibrados Limitante de Stong-Pergher Soma conexa de espaços projetivos Número característico Classe de Stiefel-Whitney |
| topic |
Soma conexa de fibrados Limitante de Stong-Pergher Soma conexa de espaços projetivos Número característico Classe de Stiefel-Whitney Connected sum of fiber bundles Stong-Pergher bound Connected sum of two copies of projective spaces Stiefel-Whitney class Characteristic number CIENCIAS EXATAS E DA TERRA::MATEMATICA |
| dc.subject.eng.fl_str_mv |
Connected sum of fiber bundles Stong-Pergher bound Connected sum of two copies of projective spaces Stiefel-Whitney class Characteristic number |
| dc.subject.cnpq.fl_str_mv |
CIENCIAS EXATAS E DA TERRA::MATEMATICA |
| description |
Let M m be a closed and smooth m-dimensional manifold, and T : M m → M m a smooth involution, that is, a period 2 diffeomorphism defined on M m . It is well known the fact that the fixed point set of T , F = {x ∈ M m |T (x) = x}, is a finite and disjoint union of closed smooth submanifolds, whose dimensions can vary from 0 to m. We write F = ∪ni=0 F i , n ≤ m, where F i denotes the disjoint union of the i-dimensional components of F. The famous Five Halves Theorem of J. Boardman assures that, if the pair (M m , T ) does not bound equivariantly, then we have m ≤ 52 n, and with this level of generality, this bound is best possible. This result motivated P. Pergher to introduce, in the literature, the following type of question: is it possible to improve the Boardman’s bound by imposing the omission of some dimensions of F? In this work, our first objective is obtaining a result of this type, specifically the case where F has the form F n ∪ F j , 0 ≤ j < n, and with F n ∪ F j not being a boundary. There are several results of this nature in the literature, as will be detailed in the Introduction in historical and chronological terms. The second goal of this work lives in the context of classifying, up to equivariant cobordism, involutions (M, T ) whose fixed point set is a pre-selected manifold (or a disjoint union of manifolds) F. This line of problems is well-established in the literature, see in the Introduction references with several correlated results. Specifically, in this work we will address the case in which F is a connected sum of two projectives spaces real, complex and quaternionic, F = Kd P(n)#Kd P(n), with n odd, where d = 1, 2 and respectively symbolize the real, complex and quaternionic cases. Again, the relationship of this case with existing cases in the literature will be described in the Introduction. |
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