Fluidos perfeitos estáticos com simetrias
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2019-04-25
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Universidade Federal de Goiás
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This work presents a two step procedure that is virtually capable of producing an infinite number of exact solutions to Einstein's equation of a perfect fluid on a static manifold. These steps could roughly be described as: 1) classifying the symmetries of the referred equation that convert it into a second order non linear ordinary differential equation of very specific nature -- whose solutions are a whole lot easier to come up with than those of the original problem, and 2) solving this ordinary equation -- which quite explains the need for the word
`virtually' above, since not all solutions of the ordinary equation are known to its exact form. Finally, in the last chapter, we utilize a Theorem due to Liouville to determine the rigid motions of Riemannian metrics on euclidean space that do admit symmetries in a translational group and also belong to the conformal class of the flat metric.
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BARBOZA, Marcelo Bezerra. Fluidos perfeitos estáticos com simetrias. 2019. 72 f. Tese (Doutorado em Matemática) - Universidade Federal de Goiás, Goiânia, 2019.