El Laplaciano en Variedades Riemannianas - Centro de Matemática
El Laplaciano en Variedades Riemannianas - Centro de Matemática
El Laplaciano en Variedades Riemannianas - Centro de Matemática
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Bibliografía[1] R. A. Adams. Sobolev Spaces. Aca<strong>de</strong>mic Press, London, 1975.[2] M. Berger, P. Gauduchon, and E. Mazet. Le Spectre d’une Variété Riemanni<strong>en</strong>ne,volume 194 of Lecture notes in Mathematics. Springer-Verlag,Berlin, 1971.[3] M. P. Do Carmo. Geometria Riemanniana. Projeto Eucli<strong>de</strong>s. Brasília,1979.[4] G. B. Folland. Real analysis. Pure and Applied Mathematics (New York).John Wiley & Sons Inc., New York, 1984.[5] R. Iório Jr. and V. De Magalhães Iório. Ecuações difer<strong>en</strong>ciais parciais:uma introdução. Projeto Eucli<strong>de</strong>s. Brasília, 1988.[6] Kobayashi and Nomizu. Foundations of Differ<strong>en</strong>tial Geometry, Vol. 1.[7] M. Reed and B. Simon. Fourier Analysis, Self-Adjointness, volume II ofMethods of mo<strong>de</strong>rn mathematical phisics. Aca<strong>de</strong>mic Press, London, 1975.[8] M. Reed and B. Simon. Functional Analysis, volume I of Methods of mo<strong>de</strong>rnmathematical phisics. Aca<strong>de</strong>mic Press, London, 1975.[9] J. Thayer. Operadores auto-adjuntos e equações difer<strong>en</strong>ciais parciais. ProjetoEucli<strong>de</strong>s. Brasília, 1987.71
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