The study of geodesic flows on homogeneous spaces is an area of research that bas in recent years yielded some fascinating developments. This book focuses...
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Résumé
The study of geodesic flows on homogeneous spaces is an area of research that bas in recent years yielded some fascinating developments. This book focuses on many of these, and one of its highlights is an elementary and complete proof (due to Margulis and Dani) of Oppenheim's conjecture. Also included here: an exposition of Ratner's work on Raghunathan's conjectures; a complete proof of the Howe-Moore vanishing theorem for general semisimple Lie groups; new treatment of Mautner's result on the geodesic flow of a Riemanman symmetric space; Mozes' result about mixing of all orders and the asymptotic distribution of lattice points in the hyperbolic plane; Ledrappier's example of a mixing action which is not a mixing of all orders.
The treatment is as self-contained and elementary as possible. It should appeal to graduate students and researchers interested in dynamical systems, harmonic analysis, differential geometry, Lie theory and number theory.
Sommaire
Ergodic systems
The geodesic flow of Riemannian locally symmetric spaces
The vanishing theorem of Howe and Moore
The horocycle flow
Siegel sets, Mahler's criterion and Margulis' lemma
An application to number theory: Oppenheim's conjecture.