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OverviewThis work begins with an introduction to the geodesic flow of a complete Riemannian manifold, emphasizing its sympletic properties and culminating with various applications such as the non-existence of continuous invariant Lagrangian sub-bundles for manifolds with conjugate points. Subsequent chapters develop the relationship between the exponential growth rate of the average number of geodesic arcs between two points. Full Product DetailsAuthor: Gabriel P. PaternainPublisher: Birkhauser Boston Inc Imprint: Birkhauser Boston Inc Edition: 1999 ed. Volume: 180 Dimensions: Width: 15.50cm , Height: 1.10cm , Length: 23.50cm Weight: 0.930kg ISBN: 9780817641443ISBN 10: 0817641440 Pages: 149 Publication Date: 01 September 1999 Audience: College/higher education , Professional and scholarly , Postgraduate, Research & Scholarly , Professional & Vocational Format: Hardback Publisher's Status: Active Availability: Awaiting stock  The supplier is currently out of stock of this item. It will be ordered for you and placed on backorder. Once it does come back in stock, we will ship it out for you. Table of Contents0 Introduction.- 1 Introduction to Geodesic Flows.- 1.1 Geodesic flow of a complete Riemannian manifold.- 1.2 Symplectic and contact manifolds.- 1.3 The geometry of the tangent bundle.- 1.4 The cotangent bundle T*M.- 1.5 Jacobi fields and the differential of the geodesic flow.- 1.6 The asymptotic cycle and the stable norm.- 2 The Geodesic Flow Acting on Lagrangian Subspaces.- 2.1 Twist properties.- 2.2 Riccati equations.- 2.3 The Grassmannian bundle of Lagrangian subspaces.- 2.4 The Maslov index.- 2.5 The geodesic flow acting at the level of Lagrangian subspaces.- 2.6 Continuous invariant Lagrangian subbundles in SM.- 2.7 Birkhoff’s second theorem for geodesic flows.- 3 Geodesic Arcs, Counting Functions and Topological Entropy.- 3.1 The counting functions.- 3.2 Entropies and Yomdin’s theorem.- 3.3 Geodesic arcs and topological entropy.- 3.4 Manning’s inequality.- 3.5 A uniform version of Yomdin’s theorem.- 4 Mañé’s Formula for Geodesic Flows and Convex Billiards.- 4.1 Time shifts that avoid the vertical.- 4.2 Mañé’s formula for geodesic flows.- 4.3 Manifolds without conjugate points.- 4.4 A formula for the topological entropy for manifolds of positive sectional curvature.- 4.5 Mañé’s formula for convex billiards.- 4.6 Further results and problems on the subject.- 5 Topological Entropy and Loop Space Homology.- 5.1 Rationally elliptic and rationally hyperbolic manifolds.- 5.2 Morse theory of the loop space.- 5.3 Topological conditions that ensure positive entropy.- 5.4 Entropies of manifolds.- 5.5 Further results and problems on the subject.- Hints and Answers.- References.ReviewsThe main goal of the book is to present, in a self-contained way, results of the author and of Ricardo Mane about various ways to calculate or estimate the topological entropy of the geodesic flow on a closed Riemannian manifold M. The book begins with two introductory chapters on general properties of geodesic flows including a discussion of some of its properties as a Hamiltonian system acting on the tangent bundle TM of M. The third and fourth chapters present a formula for the topological entropy of the geodesic flow in terms of asymptotic growth of the average number of geodesic arcs in M connecting two given points. This, and similar other formulas for the topological entropy are obtained as an application of a fundamental result of Y. Yomdin which is also discussed, however without proof. The last chapter contains results, mainly due to the author, on topological conditions for M which guarantee that the topological entropy of the geodesic flow for every metric on M is positive. It is also shown that there are manifolds which satisfy these conditions, but for which the infimum of the entropies for metrics with normalized volume vanishes. The text is accompanied by many exercises. Many of the easier details of the material are presented in this forma ] <p>a Zentralblatt Math <p> Unique and valuable... the presentation is clean and brisk...useful for self-study, and as a guide to the subject and its literature. <p>a Mathematical Reviews The main goal of the book is to present, in a self-contained way, results of the author and of Ricardo Mane about various ways to calculate or estimate the topological entropy of the geodesic flow on a closed Riemannian manifold M. The book begins with two introductory chapters on general properties of geodesic flows including a discussion of some of its properties as a Hamiltonian system acting on the tangent bundle TM of M. The third and fourth chapters present a formula for the topological entropy of the geodesic flow in terms of asymptotic growth of the average number of geodesic arcs in M connecting two given points. This, and similar other formulas for the topological entropy are obtained as an application of a fundamental result of Y. Yomdin which is also discussed, however without proof. The last chapter contains results, mainly due to the author, on topological conditions for M which guarantee that the topological entropy of the geodesic flow for every metric on M is positive. It is also shown that there are manifolds which satisfy these conditions, but for which the infimum of the entropies for metrics with normalized volume vanishes. The text is accompanied by many exercises. Many of the easier details of the material are presented in this form! --Zentralblatt Math Unique and valuable... the presentation is clean and brisk...useful for self-study, and as a guide to the subject and its literature. --Mathematical Reviews Author InformationTab Content 6Author Website:Countries AvailableAll regions |
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