Cosmology in (2 + 1) -Dimensions, Cyclic Models, and Deformations of M2,1. (AM-121), Volume 121 / / Victor Guillemin

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Autore:	Guillemin Victor
Titolo:	Cosmology in (2 + 1) -Dimensions, Cyclic Models, and Deformations of M2,1. (AM-121), Volume 121 / / Victor Guillemin
Pubblicazione:	Princeton, NJ : , : Princeton University Press, , [2016]
	©1989
Descrizione fisica:	1 online resource (236 pages) : illustrations
Disciplina:	523.1/072/4
Soggetto topico:	Cosmology - Mathematical models
	Geometry, Differential
	Lorentz transformations
Soggetto non controllato:	Automorphism
	Bijection
	C0
	Canonical form
	Canonical transformation
	Cauchy distribution
	Causal structure
	Cayley transform
	Codimension
	Cohomology
	Cokernel
	Compactification (mathematics)
	Complexification (Lie group)
	Computation
	Conformal geometry
	Conformal map
	Conformal symmetry
	Connected sum
	Contact geometry
	Corank
	Covariant derivative
	Covering space
	Deformation theory
	Diagram (category theory)
	Diffeomorphism
	Differentiable manifold
	Differential operator
	Dimension (vector space)
	Einstein field equations
	Equation
	Euler characteristic
	Existential quantification
	Fiber bundle
	Fibration
	Floquet theory
	Four-dimensional space
	Fourier integral operator
	Fourier transform
	Fundamental group
	Geodesic
	Hamilton–Jacobi equation
	Hilbert space
	Holomorphic function
	Holomorphic vector bundle
	Hyperfunction
	Hypersurface
	Integral curve
	Integral geometry
	Integral transform
	Intersection (set theory)
	Invertible matrix
	K-finite
	Lagrangian (field theory)
	Lie algebra
	Light cone
	Linear map
	Manifold
	Maxima and minima
	Minkowski space
	Module (mathematics)
	Notation
	One-parameter group
	Parametrix
	Parametrization
	Principal bundle
	Product metric
	Pseudo-differential operator
	Quadratic equation
	Quadratic form
	Quadric
	Radon transform
	Riemann surface
	Riemannian manifold
	Seifert fiber space
	Sheaf (mathematics)
	Siegel domain
	Simply connected space
	Submanifold
	Submersion (mathematics)
	Support (mathematics)
	Surjective function
	Symplectic manifold
	Symplectic vector space
	Symplectomorphism
	Tangent space
	Tautology (logic)
	Tensor product
	Theorem
	Topological space
	Topology
	Two-dimensional space
	Unit vector
	Universal enveloping algebra
	Variable (mathematics)
	Vector bundle
	Vector field
	Vector space
	Verma module
	Volume form
	X-ray transform
Note generali:	Bibliographic Level Mode of Issuance: Monograph
Nota di bibliografia:	Includes bibliographical references.
Nota di contenuto:	Frontmatter -- Contents -- Foreword -- Part I. A relativistic approach to Zoll phenomena -- Part II. The general theory of Zollfrei deformations -- Part III. Zollfrei deformations of M2,1 -- Part IV. The generalized x-ray transform -- Part V. The Floquet theory -- Bibliography
Sommario/riassunto:	The subject matter of this work is an area of Lorentzian geometry which has not been heretofore much investigated: Do there exist Lorentzian manifolds all of whose light-like geodesics are periodic? A surprising fact is that such manifolds exist in abundance in (2 + 1)-dimensions (though in higher dimensions they are quite rare). This book is concerned with the deformation theory of M2,1 (which furnishes almost all the known examples of these objects). It also has a section describing conformal invariants of these objects, the most interesting being the determinant of a two dimensional "Floquet operator," invented by Paneitz and Segal.
Titolo autorizzato:	Cosmology in (2 + 1) -Dimensions, Cyclic Models, and Deformations of M2,1. (AM-121), Volume 121
ISBN:	1-4008-8241-9
Formato:	Materiale a stampa
Livello bibliografico	Monografia
Lingua di pubblicazione:	Inglese
Record Nr.:	9910154746903321
Lo trovi qui:	Univ. Federico II
Opac:	Controlla la disponibilità qui

Serie: Annals of mathematics studies ; ; no. 121.