04180nam 2200805 a 450 991095872190332120220310021344.09786613290953978128329095112832909529781400840588140084058910.1515/9781400840588(CKB)2670000000122120(EBL)784515(OCoLC)768165026(SSID)ssj0000554343(PQKBManifestationID)11392535(PQKBTitleCode)TC0000554343(PQKBWorkID)10514353(PQKB)11109901(StDuBDS)EDZ0000406839(DE-B1597)447101(OCoLC)979968552(DE-B1597)9781400840588(Au-PeEL)EBL784515(CaPaEBR)ebr10503246(CaONFJC)MIL329095(PPN)199244502(PPN)187958394(Perlego)735304(FR-PaCSA)88838022(MiAaPQ)EBC784515(FRCYB88838022)88838022(EXLCZ)99267000000012212020110714d2012 uy 0engurnn#---|u||utxtccrThe ambient metric /Charles Fefferman, C. Robin GrahamCourse BookPrinceton Princeton University Press20121 online resource (124 p.)Annals of mathematics studies ;no. 178Description based upon print version of record.9780691153131 0691153132 9780691153148 0691153140 Includes bibliographical references and index.Front matter --Contents --Chapter One. Introduction --Chapter Two. Ambient Metrics --Chapter Three. Formal Theory --Chapter Four. Poincaré Metrics --Chapter Five. Self-dual Poincaré Metrics --Chapter Six. Conformal Curvature Tensors --Chapter Seven. Conformally Flat and Conformally Einstein Spaces --Chapter Eight. Jet Isomorphism --Chapter Nine. Scalar Invariants --Bibliography --IndexThis book develops and applies a theory of the ambient metric in conformal geometry. This is a Lorentz metric in n+2 dimensions that encodes a conformal class of metrics in n dimensions. The ambient metric has an alternate incarnation as the Poincaré metric, a metric in n+1 dimensions having the conformal manifold as its conformal infinity. In this realization, the construction has played a central role in the AdS/CFT correspondence in physics. The existence and uniqueness of the ambient metric at the formal power series level is treated in detail. This includes the derivation of the ambient obstruction tensor and an explicit analysis of the special cases of conformally flat and conformally Einstein spaces. Poincaré metrics are introduced and shown to be equivalent to the ambient formulation. Self-dual Poincaré metrics in four dimensions are considered as a special case, leading to a formal power series proof of LeBrun's collar neighborhood theorem proved originally using twistor methods. Conformal curvature tensors are introduced and their fundamental properties are established. A jet isomorphism theorem is established for conformal geometry, resulting in a representation of the space of jets of conformal structures at a point in terms of conformal curvature tensors. The book concludes with a construction and characterization of scalar conformal invariants in terms of ambient curvature, applying results in parabolic invariant theory.Annals of mathematics studies ;no. 178.Conformal geometryConformal invariantsConformal geometry.Conformal invariants.516.3/7MAT012020bisacshFefferman Charles1949-476528Graham C. Robin1954-1799005MiAaPQMiAaPQMiAaPQBOOK9910958721903321The ambient metric4342083UNINA