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Two Classes of Riemannian Manifolds Whose Geodesic Flows are Integrable

Buch | Softcover

143 Seiten

1998
American Mathematical Society (Verlag)
978-0-8218-0640-1 (ISBN)

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Defines two classes of manifolds whose geodesic flows are integrable, and investigates their global structures - they are called Liouville manifolds and Kahler-Liouville manifolds respectively. This work finds several invariants with which they are partly classified.

In this work, two classes of manifolds whose geodesic flows are integrable are defined, and their global structures are investigated. They are called Liouville manifolds and Kahler-Liouville manifolds respectively. In each case, the author finds several invariants with which they are partly classified. The classification indicates, in particular, that these classes contain many new examples of manifolds with integrable geodesic flow.

Part 1. Liouville Manifolds: Introduction Preliminary remarks and notations Local structure of proper Liouville manifolds Global structure of proper Liouville manifolds Proper Liouville manifolds of rank one Appendix. Simply connected manifolds of constant curvature Part 2. Kahler-Liouville manifolds: Introduction Preliminary remarks and notations Local calculus on $M^1$ Summing up the local data Structure of $M-M^1$ Torus action and the invariant hypersurfaces Properties as a toric variety Bundle structure associated with a subset of $/mathcal A$ The case where $ No. /mathcal A=1$ Existence theorem.

Erscheint lt. Verlag	30.1.1998
Reihe/Serie	Memoirs of the American Mathematical Society
Verlagsort	Providence
Sprache	englisch
Themenwelt	Mathematik / Informatik ► Mathematik ► Geometrie / Topologie
ISBN-10	0-8218-0640-8 / 0821806408
ISBN-13	978-0-8218-0640-1 / 9780821806401
Zustand	Neuware