Mathematical Research Letters
Volume 13, Issue 4, July 2006 pp. 587-598.
Sub-Riemannian geometry and periodic orbits in classical billiardsAuthors: Yuliy Baryshnikov (1) and Vadim Zharnitsky (1)
Author institution: Bell Labs, Lucent Technologies (1) and University of Illinois (2)
Summary: Classical (Birkhoff) billiards with full 1-parameter families of periodic orbits are considered. It is shown that construction of a convex billiard with a ``rational'' caustic ({\em i.e.} carrying only periodic orbits ) can be reformulated as the problem of finding a closed curve tangent to a non-integrable distribution on a manifold. The properties of this distribution are described as well as the consequences for the billiards with rational caustics. A particular implication of this construction is that an ellipse can be infinitesimally perturbed so that any chosen rational elliptic caustic will persist.
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