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Einstein Manifolds / Arthur...
From the reviews: " ... an efficient reference book for many fundamental techniques of Riemannian geometry. ... despite its length, the reader will have no difficulty in getting the feel of its contents and discovering excellent examples of all interaction of geometry with partial differential equations, topology, and Lie groups. Above all, the book provides a clear insight into the scope and diversity of problems posed by its title." S.M. Salamon in MathSciNet 1988 "It seemed likely to anyone who read the previous book by the same author, namely "Manifolds all of whose geodesic are closed", that the present book would be one of the most important ever published on Riemannian geometry. This prophecy is indeed fulfilled." T.J. Wilmore in Bulletin of the London Mathematical Society 1987
Monografía
monografia Rebiun22141209 https://catalogo.rebiun.org/rebiun/record/Rebiun22141209 m eo d cr bn||||auuu| 080604r20081987gw a ob 001 0 eng d 656245861 990728516 1035706853 1040638646 1044215871 1056421546 1058195994 1060784476 1074274794 9783540743118 electronic bk.) 3540743111 electronic bk.) 9783540741206 3540741208 10.1007/978-3-540-74311-8 doi AU@ 000048701801 NZ1 13533102 978-3-540-74120-6 Springer http://www.springerlink.com YNG eng pn YNG COO GW5XE WKM OCLCQ GW5XE OCLCF OCLCQ LIP UAB ESU OCLCQ OCLCA STF OCLCQ CEF U3W AU@ OCLCQ ICG YOU PBMS bicssc PBPH bicssc MAT038000 bisacsh 516.3/62 22 Besse, A. L. Einstein Manifolds Arthur L. Besse "Reprint of the 1987 ed. " Berlin [New York] Springer ©2008 Berlin [New York] Berlin [New York] Springer 1 online resource (xii, 516 pages) illustrations 1 online resource (xii, 516 pages) Text txt rdacontent computer c rdamedia online resource cr rdacarrier text file PDF rda Classics in mathematics 1431-0821 "Originally issued as vol. 10 of the Ergebnisse der Mathematik und ihrer Grenzgebiete, 3rd series"--Page [iii] Includes bibliographical references (pages 479-499) and index Introduction -- Basic Material -- Basic Material: Khler Manifolds -- Relativity -- Riemannian Functionals -- Ricci Curvature as a Partial Differential Equation -- Einstein Manifolds and Topology -- Homogeneous Riemannian Manifolds -- Compact Homogeneous Khler Manifolds -- Riemannian Submersions -- Holonomy Groups -- Khler-Einstein Metrics and the Calabi Conjecture -- The Moduli Space of Einstein Structures -- Self-Duality -- Quaternion-Khler-Manifolds -- A Report on the Non-Compact Case -- Generalizations of the Einstein Condition -- Appendix. Sobolev Spaces and Elliptic Operators -- Addendum -- Bibliography -- Notation Index -- Subject Index From the reviews: " ... an efficient reference book for many fundamental techniques of Riemannian geometry. ... despite its length, the reader will have no difficulty in getting the feel of its contents and discovering excellent examples of all interaction of geometry with partial differential equations, topology, and Lie groups. Above all, the book provides a clear insight into the scope and diversity of problems posed by its title." S.M. Salamon in MathSciNet 1988 "It seemed likely to anyone who read the previous book by the same author, namely "Manifolds all of whose geodesic are closed", that the present book would be one of the most important ever published on Riemannian geometry. This prophecy is indeed fulfilled." T.J. Wilmore in Bulletin of the London Mathematical Society 1987 English Einstein manifolds Geometry, Riemannian Relativity (Physics) Einstein manifolds. Geometry, Riemannian. Relativity (Physics) Electronic books Print version:Besse, A.L. Einstein Manifolds. (OCoLC)183259557 Classics in mathematics. 1431-0821 Ergebnisse der Mathematik und ihrer Grenzgebiete 3. Folge, Bd. 10