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The decomposition of global conformal invariants [[electronic resource] /] / Spyros Alexakis



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Autore: Alexakis Spyros <1978-> Visualizza persona
Titolo: The decomposition of global conformal invariants [[electronic resource] /] / Spyros Alexakis Visualizza cluster
Pubblicazione: Princeton, : Princeton University Press, 2012
Edizione: Course Book
Descrizione fisica: 1 online resource (460 p.)
Disciplina: 518
Soggetto topico: Conformal invariants
Decomposition (Mathematics)
Soggetto non controllato: CauchyВiemann geometry
DeserГchwimmer conjecture
Khler geometry
Riemannian invariants
Riemannian metrics
Riemannian scalar
Schouten tensor
Weyl tensor
algebraic propositions
ambient metrics
conformal anomalies
conformal invariant
conformal invariants
conformally invariant functionals
curvature tensor
decomposition
differential geometry
global conformal invariant
global invariants
grand conclusion
index theory
induction
iterative decomposition
lemma
lemmas
manifold
theoretical physics
Note generali: Description based upon print version of record.
Nota di bibliografia: Includes bibliographical references and index.
Nota di contenuto: Front matter -- Contents -- Acknowledgments -- 1. Introduction -- 2. An Iterative Decomposition of Global Conformal Invariants: The First Step -- 3. The Second Step: The Fefferman-Graham Ambient Metric and the Nature of the Decomposition -- 4. A Result on the Structure of Local Riemannian Invariants: The Fundamental Proposition -- 5. The Inductive Step of the Fundamental Proposition: The Simpler Cases -- 6. The Inductive Step of the Fundamental Proposition: The Hard Cases, Part I -- 7. The Inductive Step of the Fundamental Proposition: The Hard Cases, Part II -- A. Appendix -- Bibliography -- Index of Authors and Terms -- Index of Symbols
Sommario/riassunto: This book addresses a basic question in differential geometry that was first considered by physicists Stanley Deser and Adam Schwimmer in 1993 in their study of conformal anomalies. The question concerns conformally invariant functionals on the space of Riemannian metrics over a given manifold. These functionals act on a metric by first constructing a Riemannian scalar out of it, and then integrating this scalar over the manifold. Suppose this integral remains invariant under conformal re-scalings of the underlying metric. What information can one then deduce about the Riemannian scalar? Deser and Schwimmer asserted that the Riemannian scalar must be a linear combination of three obvious candidates, each of which clearly satisfies the required property: a local conformal invariant, a divergence of a Riemannian vector field, and the Chern-Gauss-Bonnet integrand. This book provides a proof of this conjecture. The result itself sheds light on the algebraic structure of conformal anomalies, which appear in many settings in theoretical physics. It also clarifies the geometric significance of the renormalized volume of asymptotically hyperbolic Einstein manifolds. The methods introduced here make an interesting connection between algebraic properties of local invariants--such as the classical Riemannian invariants and the more recently studied conformal invariants--and the study of global invariants, in this case conformally invariant integrals. Key tools used to establish this connection include the Fefferman-Graham ambient metric and the author's super divergence formula.
Titolo autorizzato: The decomposition of global conformal invariants  Visualizza cluster
ISBN: 1-280-49429-8
9786613589521
1-4008-4272-7
Formato: Materiale a stampa
Livello bibliografico Monografia
Lingua di pubblicazione: Inglese
Record Nr.: 9910791043503321
Lo trovi qui: Univ. Federico II
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Serie: Annals of mathematics studies ; ; no. 182.