Doctoral Thesis
DOI
https://doi.org/10.11606/T.55.2014.tde-13042015-164728
Document
Author
Full name
Rafael Antonio Rossato
E-mail
Institute/School/College
Knowledge Area
Date of Defense
Published
São Carlos, 2014
Supervisor
Committee
Massa, Eugenio Tommaso (President)
Paiva, Francisco Odair Vieira de
Pastene, Leonelo Patricio Iturriaga
Soares, Sérgio Henrique Monari
Souto, Marco Aurélio Soares
Paiva, Francisco Odair Vieira de
Pastene, Leonelo Patricio Iturriaga
Soares, Sérgio Henrique Monari
Souto, Marco Aurélio Soares
Title in Portuguese
Sistemas elípticos de tipo hamiltoniano perto da ressonância
Keywords in Portuguese
Aproximação finito dimensional
Geometria de ponto de sela
Problemas de quase ressonância
Sistemas elípticos semilineares
Geometria de ponto de sela
Problemas de quase ressonância
Sistemas elípticos semilineares
Abstract in Portuguese
Neste trabalho consideramos sistemas elípticos de tipo hamiltoniano, envolvendo o operador Laplaciano, com uma parte linear dependendo de dois parâmetros e uma perturbação sublinear. Obtemos a existência de pelo menos duas soluções quando a parte linear está perto da ressonância (este fenômeno é chamado de quase ressonância). Mostramos também a existência de uma terceira solução, quando a quase ressonância é em relação ao primeiro autovalor do operador Laplaciano. No caso ressonante obtemos resultados análogos, adicionando mais uma perturbação sublinear. Os sistemas estão associados a funcionais fortemente indefinidos, e as soluções são obtidas através do Teorema de Ponto de Sela e aproximação de Galerkin.
Title in English
Elliptic systems of Hamiltonian type near resonance
Keywords in English
Finite dimensional approximation
Near resonance problems
Saddle point geometry
Semilinear elliptic systems
Near resonance problems
Saddle point geometry
Semilinear elliptic systems
Abstract in English
In this work we consider elliptic systems of hamiltonian type, involving the Laplacian operator, a linear part depending on two parameters and a sublinear perturbation. We obtain the existence of at least two solutions when the linear part is near resonance (this phenomenon is called almost-resonance). We also show the existence of a third solution when the almost-resonance is with respect to the first eigenvalue of the Laplacian operator. In the resonant case, we obtain similar results, with an additional sublinear term. These systems are associated with strongly indefinite functionals, and the solutions are obtained by Saddle Point Theorem and Galerkin approximation.
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Publishing Date
2015-04-13
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