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Homogeneous Structures on Riemannian Manifolds [Paperback]

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  • Category: Books (Mathematics)
  • Author:  Tricerri, F., Vanhecke, L.
  • Author:  Tricerri, F., Vanhecke, L.
  • ISBN-10:  0521274893
  • ISBN-10:  0521274893
  • ISBN-13:  9780521274890
  • ISBN-13:  9780521274890
  • Publisher:  Cambridge University Press
  • Publisher:  Cambridge University Press
  • Pages:  144
  • Pages:  144
  • Binding:  Paperback
  • Binding:  Paperback
  • Pub Date:  01-May-1983
  • Pub Date:  01-May-1983
  • SKU:  0521274893-11-MPOD
  • SKU:  0521274893-11-MPOD
  • Item ID: 100798861
  • Seller: ShopSpell
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  • Delivery by: Dec 30 to Jan 01
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The central theme of this book is the theorem of Ambrose and Singer.The central theme of this book is the theorem of Ambrose and Singer, which gives for a connected, complete and simply connected Riemannian manifold a necessary and sufficient condition for it to be homogeneous.The central theme of this book is the theorem of Ambrose and Singer, which gives for a connected, complete and simply connected Riemannian manifold a necessary and sufficient condition for it to be homogeneous.The central theme of this book is the theorem of Ambrose and Singer, which gives for a connected, complete and simply connected Riemannian manifold a necessary and sufficient condition for it to be homogeneous. This is a local condition which has to be satisfied at all points, and in this way it is a generalization of E. Cartan's method for symmetric spaces. The main aim of the authors is to use this theorem and representation theory to give a classification of homogeneous Riemannian structures on a manifold. There are eight classes, and some of these are discussed in detail. Using the constructive proof of Ambrose and Singer many examples are discussed with special attention to the natural correspondence between the homogeneous structure and the groups acting transitively and effectively as isometrics on the manifold.1. The theorem of Ambrose and Singer; 2. Homogeneous Riemannian structures; 3. The eight classes of homogeneous structures; 4. Homogeneous structures on surfaces; 5. Homogeneous structures of type T1; 6. Naturally reductive homogeneous spaces and homogeneous structures of type T3; 7. The Heisenberg group; 8. Examples and the inclusion relations; 9. Generalized Heisenberg groups; 10.Self-dual and anti-self-dual homogeneous structures.
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