Hyperbolicity of asymmetric lemon billiards
Abstract
Asymmetric lemon billiards was introduced in [CMZZ], where the billiard table Q(r,b,R) is the intersection of two round disks with radii r R, respectively, and b measures the distance between the two centers. It is conjectured [BZZ] that the asymmetric lemon billiards is hyperbolic when the arc r is a major arc and R is large. In this paper we prove this conjecture for sufficiently large R.
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