Exceptional sets for geodesic flows of noncompact manifolds
Abstract
For a geodesic flow on a negatively curved Riemannian manifold M and some subset A⊂ T1M, we study the limit A-exceptional set, that is the set of points whose ω-limit do not intersect A. We show that if the topological -entropy of A is smaller than the topological entropy of the geodesic flow, then the limit A-exceptional set has full topological entropy. Some consequences are stated for limit exceptional sets of invariant compact subsets and proper submanifolds.
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