Metricas de Einstein em variedades bandeira / Einstein metrics on flag manifolds
AUTOR(ES)
Evandro Carlos Ferreira dos Santos
DATA DE PUBLICAÇÃO
2005
RESUMO
The goal of this work is to contribute the study of invariant Hermitian geometry on flag manifolds. We study the class of Einstein metrics on flag manifolds. In this work we present new solutions for the invariant Einstein equation on flag manifolds, maximals or not, of Ai case. Let W a subgroup of the Weyl group. We described a natural action of W on the solution set of the Einstein equation, and we proved that W lefts the solution set invariant. We obtained the Einstein s constant of all the known metrics and in some cases we found the Yamabe metric. We studied the Einstein-Hilbert functional and we proved that all invariant Einstein metrics on a flag manifold are stable. Using C-fibrations we proved, in the case IF(n), n 2:: 4, if 9 is an invariant Einstein metric, and (1,2)-symplectic then 9 is Kãhler. According to San Martin-Negreiros s classification of all almost Hermitian structures on maximal flag manifolds we proved that an Einstein metric is Kãhler or belongs to W1 $ W3. This implies in a solution, in flag manifolds of Ai case, for a conjecture proposed by W. Ziller[17]
ASSUNTO(S)
lie homogeneous spaces grupos semi-simples einstein manifolds variedades de variedades complexas complex manifolds espaços homogeneos semi-simple lie groups einstein
ACESSO AO ARTIGO
http://libdigi.unicamp.br/document/?code=vtls000366713Documentos Relacionados
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