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Periodic billiard trajectories in smooth convex bodies

We consider billiard trajectories in a smooth convex body in $\mathbb R^d$ and estimate the number of distinct periodic trajectories that make exactly $p$ reflections per period at the boundary of the body. In the case of prime $p$ we obtain the lower bound $(d-2)(p-1)+2$, which is much better than the previous estimates.

preprint2009arXivOpen access
R. N. Karasev
math.ATmath.DSmath.DG
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Open access1 author3 topics
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R. N. Karasev

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