Janete Crema scite author profile

Janete Crema

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Count and Symmetry of Global and Local Minimizers of the Cahn-Hilliard Energy Over Cylindrical Domains

Nascimento

Biesdorf

Crema³

2012

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We address the problem of minimization of the Cahn-Hilliard energy functional under a mass constraint over two and three-dimensional cylindrical domains. Although existence is presented for a general case the focus is mainly on rectangles, parallelepipeds and circular cylinders. According to the symmetry of the domain the exact numbers of global and local minimizers are given as well as their geometric profile and interface locations; all are onedimensional increasing/decreasing and odd functions for domains with lateral symmetry in all axes and also for circular cylinders. The selection of global minimizers by the energy functional is made via the smallest interface area criterion.The approach utilizes Γ−convergence techniques to prove existence of an one-parameter family of local minimizers of the energy functional for any cylindrical domain. The exact numbers of global and local minimizers as well as their geometric profiles are accomplished via suitable applications of the unique continuation principle while exploring the domain geometry in each case and also the preservation of global minimizers through the process of Γ−convergence.

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Soluções periodicas de equações quase-parabolicas com mudanças abruptas

Crema¹,

Boldrini²

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tem solução, sob certas condições de regularidade e limitação sobre ge, f = 1 ... N. lJl Capítulo 1 Perturbações LipschitzianasComo dissemos na introdução, nosso objetivo é procurar soluções de problemas quase parabólicos, envolvendo operadores monótonos e perturbações que sofram mudanças abruptas no decorrer do tempo. Neste capítulo vamos estudar alguns problemas, sob o ponto de vista de espaços de Hilbert. Assim inicialmente recordaremos alguns fatos que serão de fundamental importância na elaboração de nossos resultados. PreliminaresSeja H um espaço de Hilbert real e A : H --+ H um operador multívoco, isto é, para todo x E H tem-se que Ax E 2H. Denotaremos o domínio de A por D(A) = {x E H; Ax f ,P) e a imagem de A por R(A) = {y E H; y E Ax para algum x E D(A)). Diremos também que [x,y] E A se x E D(A) e y E Ax. Definição: Um operador multívoco A : H ---+ H será dito monótono (ou monotônico) se para todo [x;, y;] E A, i = 1, 2, :l a 2:: O tal que (y 1 -y 2 , x 1 -x 2 )H 2:: alx1-x 2 IJJ. Se a> O A é dito estritamente monótono.

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A Geometric Sufficient Condition for Existence of Stable Transition Layers for Some Reaction-Diffusion Equations

Nascimento¹,

Crema²

2004

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Janete Crema

Count and Symmetry of Global and Local Minimizers of the Cahn-Hilliard Energy Over Cylindrical Domains

Soluções periodicas de equações quase-parabolicas com mudanças abruptas

A Geometric Sufficient Condition for Existence of Stable Transition Layers for Some Reaction-Diffusion Equations

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