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Stability by Linearization of Einstein's Field Equation [Hardcover]

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Category: Books (Science)
Author: Bruna, Llu?s, Girbau, Joan
Author: Bruna, Llu?s, Girbau, Joan
ISBN-10: 3034603037
ISBN-10: 3034603037
ISBN-13: 9783034603034
ISBN-13: 9783034603034
Publisher: Birkh?user
Publisher: Birkh?user
Pages: 225
Pages: 225
Binding: Hardcover
Binding: Hardcover
Pub Date: 01-Feb-2010
Pub Date: 01-Feb-2010
SKU: 3034603037-11-SPRI
SKU: 3034603037-11-SPRI
Item ID: 100889526
List Price: $109.99

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This book details the mathematical framework in which linearization stability of Einstein equation with matter makes sense. It then examines conditions for this type of stability when a Robertson-Walker model for the universe is considered.

V ? V ?K? , 3 2 2 R ? /?x K i i g V T G g ?T , ? G g g 4 ? R ? ? G ? T g g ? h h ? 2 2 2 2 ? ? ? ? ? ? ? h ?S , ?? ?? 2 2 2 2 2 c ?t ?x ?x ?x 1 2 3 S T S T? T?. ? ? T S 2 2 2 2 ? ? ? ? ? ? ? h . ?? 2 2 2 2 2 c ?t ?x ?x ?x 1 2 3 g h h ?? g T T g vacuum M n R n R Acknowledgements n R Chapter I Pseudo-Riemannian Manifolds I.1 Connections M C n X M C M F M C X M F M connection covariant derivative M ? X M ?X M ?? X M X,Y ?? Y X ? Y ? Y ? Y X +X X X 1 2 1 2 ? Y Y ? Y ? Y X 1 2 X 1 X 2 ? Y f? Y f?F M fX X ? fY X f Y f? Y f?F M X X ? torsion ? Y?? X X,Y X,Y?X M . X Y localization principle Theorem I.1. Let X, Y, X , Y be C vector ?elds on M.Let U be an open setPreface // I Pseudo-Riemannian Manifolds: I.1 Connections / I.2 Firsts results on pseudo-Riemannian manifolds / I.3 Laplacians / I.4 Sobolev spaces of tensors on Riemannian manifolds / I.5 Lorentzian manifolds // II Introduction to Relativity: II.1 Classical fluid mechanics / II.2 Kinematics of the special relativity / II.3 Dynamics of special relativity / II.4 General relativity / II.5 Cosmological models / II. 6l_