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http://hdl.handle.net/1843/EABA-BBTH5S
Registro completo de metadatos
Campo DC | Valor | Idioma |
---|---|---|
dc.contributor.advisor1 | Ezequiel Rodrigues Barbosa | pt_BR |
dc.contributor.advisor-co1 | Wilberclay Gonçalves Melo | pt_BR |
dc.contributor.referee1 | Emerson Alves Mendonça de Abreu | pt_BR |
dc.contributor.referee2 | Luiz Gustavo Farah Dias | pt_BR |
dc.contributor.referee3 | Paulo Cupertino de Lima | pt_BR |
dc.contributor.referee4 | Janaína Pires Zingano | pt_BR |
dc.contributor.referee5 | Paulo Ricardo de Ávila Zingano | pt_BR |
dc.creator | Natã Firmino Santana Rocha | pt_BR |
dc.date.accessioned | 2019-08-12T15:17:32Z | - |
dc.date.available | 2019-08-12T15:17:32Z | - |
dc.date.issued | 2019-04-22 | pt_BR |
dc.identifier.uri | http://hdl.handle.net/1843/EABA-BBTH5S | - |
dc.description.resumo | This research project has as main objective to generalize and improve recently developed methods to establish existence, uniqueness and blow-up criteria of local solutions in time for the Navier-Stokes equations involving Sobolev-Gevrey and Lei-Lin spaces; as well as assuming the existence of a global solution in time for this same system, present decay rates of these solutions in these spaces. | pt_BR |
dc.language | Inglês | pt_BR |
dc.publisher | Universidade Federal de Minas Gerais | pt_BR |
dc.publisher.initials | UFMG | pt_BR |
dc.rights | Acesso Aberto | pt_BR |
dc.subject | decay rates | pt_BR |
dc.subject | local existence | pt_BR |
dc.subject | blow-up criteria | pt_BR |
dc.subject | Sobolev-Gevrey spaces | pt_BR |
dc.subject | Navier-Stokes equations | pt_BR |
dc.subject | Lei-Lin spaces | pt_BR |
dc.subject.other | Matemática | pt_BR |
dc.title | Mathematical Theory of Incompressible Flows: Local Existence, Uniqueness, Blow-up and Asymptotic Behavior of Solutions in Sobolev-Gevrey and Lei-Lin Spaces | pt_BR |
dc.type | Tese de Doutorado | pt_BR |
Aparece en las colecciones: | Teses de Doutorado |
archivos asociados a este elemento:
archivo | Descripción | Tamaño | Formato | |
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tese_nat_.pdf | 771.3 kB | Adobe PDF | Visualizar/Abrir |
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