Well-posedness and stabilization theory for dispersive systems

Detalhes bibliográficos
Autor(a) principal: JESUS, Isadora Maria de
Data de Publicação: 2023
Tipo de documento: Tese
Idioma: eng
Título da fonte: Repositório Institucional da UFPE
Texto Completo: https://repositorio.ufpe.br/handle/123456789/52008
Resumo: This work deals with the study of the well-posedness and stabilization of nonlinear disper- sive equations in bounded domains. We start by proving Massera-type theorems for the nonlinear Kawahara equation. More precisely, thanks to the properties of the semigroup of the linear operator associated with the equation studied and the exponential decay of the solutions of the linear system, it was possible to show that the solutions of the Kawahara equation are periodic and quasi-periodic. In a second moment, we study the stabilization problems of this same equation. Precisely, by introducing only one term of infinite memory in the Kawahara equation, which played a role as a damping mechanism, we guarantee the exponential stability of the system solutions. Furthermore, by designing a boundary feedback law for the Kawahara system, which combines a damping term and a finite memory term, we show that the energy associated with this system, with the presence of this feedback law, decays exponentially. Finally, we study another equation, namely, the fourth-order linear Schrödinger equation or biharmonic Schrödinger equa- tion. Here, adding an infinite memory term, we prove that the energy associated with this equation decays at polynomial-type rates.
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spelling JESUS, Isadora Maria dehttp://lattes.cnpq.br/4902162993813481http://lattes.cnpq.br/6438759947793346CAPISTRANO FILHO, Roberto de Almeida2023-08-22T11:56:16Z2023-08-22T11:56:16Z2023-07-28JESUS, Isadora Maria de. Well-posedness and stabilization theory for dispersive systems. 2023. Tese (Doutorado em Matemática) – Universidade Federal de Pernambuco, Recife, 2023.https://repositorio.ufpe.br/handle/123456789/52008This work deals with the study of the well-posedness and stabilization of nonlinear disper- sive equations in bounded domains. We start by proving Massera-type theorems for the nonlinear Kawahara equation. More precisely, thanks to the properties of the semigroup of the linear operator associated with the equation studied and the exponential decay of the solutions of the linear system, it was possible to show that the solutions of the Kawahara equation are periodic and quasi-periodic. In a second moment, we study the stabilization problems of this same equation. Precisely, by introducing only one term of infinite memory in the Kawahara equation, which played a role as a damping mechanism, we guarantee the exponential stability of the system solutions. Furthermore, by designing a boundary feedback law for the Kawahara system, which combines a damping term and a finite memory term, we show that the energy associated with this system, with the presence of this feedback law, decays exponentially. Finally, we study another equation, namely, the fourth-order linear Schrödinger equation or biharmonic Schrödinger equa- tion. Here, adding an infinite memory term, we prove that the energy associated with this equation decays at polynomial-type rates.Este trabalho trata do estudo da boa colocação e estabilização de equações dispersivas não lineares em domínios limitados. Iniciamos provando teoremas do tipo Massera para a equação de Kawahara não linear. Mais precisamente, graças às propriedades do semi- grupo do operador linear associado à equação estudada e ao decaimento exponencial das soluções do sistema linear, foi possível mostrar que as soluções da equação de Kawahara são periódicas e quase periódicas. Em um segundo momento, estudamos problemas de estabilização desta mesma equação. Precisamente, introduzindo somente um termo de memória infinita na equação de Kawahara, que desempenhou um papel de mecanismo de amortecimento, garantimos a estabilidade exponencial das soluções do sistema. Além disso, projetando uma lei de feedback de fronteira para o sistema de Kawahara, que com- bina um termo de amortecimento e um termo de memória finita, mostramos que a energia associada a este sistema, com a presença desta lei de feedback, decai exponencialmente. Por fim, estudamos uma outra equação, a saber, equação linear de Schrödinger de quarta or- dem ou equação biharmônica de Schrödinger. Aqui, acrescentando um termo de memória infinita, provamos que a energia desta equação decai em taxas do tipo polinomial.engUniversidade Federal de PernambucoPrograma de Pos Graduacao em MatematicaUFPEBrasilAttribution-NonCommercial-NoDerivs 3.0 Brazilhttp://creativecommons.org/licenses/by-nc-nd/3.0/br/info:eu-repo/semantics/embargoedAccessAnáliseEquação de KawaharaTeoremas do tipo MasseraWell-posedness and stabilization theory for dispersive systemsinfo:eu-repo/semantics/publishedVersioninfo:eu-repo/semantics/doctoralThesisdoutoradoreponame:Repositório Institucional da UFPEinstname:Universidade Federal de Pernambuco (UFPE)instacron:UFPEORIGINALTESE Isadora Maria de Jesus.pdfTESE Isadora Maria de Jesus.pdfapplication/pdf1238690https://repositorio.ufpe.br/bitstream/123456789/52008/1/TESE%20Isadora%20Maria%20de%20Jesus.pdf623b46a520aa184a367fe736aaa147dbMD51CC-LICENSElicense_rdflicense_rdfapplication/rdf+xml; charset=utf-8811https://repositorio.ufpe.br/bitstream/123456789/52008/2/license_rdfe39d27027a6cc9cb039ad269a5db8e34MD52LICENSElicense.txtlicense.txttext/plain; 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dc.title.pt_BR.fl_str_mv Well-posedness and stabilization theory for dispersive systems
title Well-posedness and stabilization theory for dispersive systems
spellingShingle Well-posedness and stabilization theory for dispersive systems
JESUS, Isadora Maria de
Análise
Equação de Kawahara
Teoremas do tipo Massera
title_short Well-posedness and stabilization theory for dispersive systems
title_full Well-posedness and stabilization theory for dispersive systems
title_fullStr Well-posedness and stabilization theory for dispersive systems
title_full_unstemmed Well-posedness and stabilization theory for dispersive systems
title_sort Well-posedness and stabilization theory for dispersive systems
author JESUS, Isadora Maria de
author_facet JESUS, Isadora Maria de
author_role author
dc.contributor.authorLattes.pt_BR.fl_str_mv http://lattes.cnpq.br/4902162993813481
dc.contributor.advisorLattes.pt_BR.fl_str_mv http://lattes.cnpq.br/6438759947793346
dc.contributor.author.fl_str_mv JESUS, Isadora Maria de
dc.contributor.advisor1.fl_str_mv CAPISTRANO FILHO, Roberto de Almeida
contributor_str_mv CAPISTRANO FILHO, Roberto de Almeida
dc.subject.por.fl_str_mv Análise
Equação de Kawahara
Teoremas do tipo Massera
topic Análise
Equação de Kawahara
Teoremas do tipo Massera
description This work deals with the study of the well-posedness and stabilization of nonlinear disper- sive equations in bounded domains. We start by proving Massera-type theorems for the nonlinear Kawahara equation. More precisely, thanks to the properties of the semigroup of the linear operator associated with the equation studied and the exponential decay of the solutions of the linear system, it was possible to show that the solutions of the Kawahara equation are periodic and quasi-periodic. In a second moment, we study the stabilization problems of this same equation. Precisely, by introducing only one term of infinite memory in the Kawahara equation, which played a role as a damping mechanism, we guarantee the exponential stability of the system solutions. Furthermore, by designing a boundary feedback law for the Kawahara system, which combines a damping term and a finite memory term, we show that the energy associated with this system, with the presence of this feedback law, decays exponentially. Finally, we study another equation, namely, the fourth-order linear Schrödinger equation or biharmonic Schrödinger equa- tion. Here, adding an infinite memory term, we prove that the energy associated with this equation decays at polynomial-type rates.
publishDate 2023
dc.date.accessioned.fl_str_mv 2023-08-22T11:56:16Z
dc.date.available.fl_str_mv 2023-08-22T11:56:16Z
dc.date.issued.fl_str_mv 2023-07-28
dc.type.status.fl_str_mv info:eu-repo/semantics/publishedVersion
dc.type.driver.fl_str_mv info:eu-repo/semantics/doctoralThesis
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status_str publishedVersion
dc.identifier.citation.fl_str_mv JESUS, Isadora Maria de. Well-posedness and stabilization theory for dispersive systems. 2023. Tese (Doutorado em Matemática) – Universidade Federal de Pernambuco, Recife, 2023.
dc.identifier.uri.fl_str_mv https://repositorio.ufpe.br/handle/123456789/52008
identifier_str_mv JESUS, Isadora Maria de. Well-posedness and stabilization theory for dispersive systems. 2023. Tese (Doutorado em Matemática) – Universidade Federal de Pernambuco, Recife, 2023.
url https://repositorio.ufpe.br/handle/123456789/52008
dc.language.iso.fl_str_mv eng
language eng
dc.rights.driver.fl_str_mv Attribution-NonCommercial-NoDerivs 3.0 Brazil
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rights_invalid_str_mv Attribution-NonCommercial-NoDerivs 3.0 Brazil
http://creativecommons.org/licenses/by-nc-nd/3.0/br/
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dc.publisher.none.fl_str_mv Universidade Federal de Pernambuco
dc.publisher.program.fl_str_mv Programa de Pos Graduacao em Matematica
dc.publisher.initials.fl_str_mv UFPE
dc.publisher.country.fl_str_mv Brasil
publisher.none.fl_str_mv Universidade Federal de Pernambuco
dc.source.none.fl_str_mv reponame:Repositório Institucional da UFPE
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instname_str Universidade Federal de Pernambuco (UFPE)
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