Train tracks, entropy, and the halo of a measured lamination
Abstract
Let L be a measured geodesic lamination on a complete hyperbolic surface of finite area. Assuming L is not a multicurve, our main result establishes the existence of a geodesic ray which has finite intersection number with L but is not asymptotic to any leaf of L nor eventually disjoint from L. In fact, we show that the endpoints of such rays, when lifted to the universal cover H2 of X, give an uncountable set hL⊂ S1 (called the halo of L), which is disjoint from the endpoints of leaves of the lifted lamination L.
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