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Billiards in convex bodies with acute angles
Published 19 Jun 2015 in math.MG and math.DS | (1506.06014v2)
Abstract: In this paper we investigate the existence of closed billiard trajectories in not necessarily smooth convex bodies. In particular, we show that if a body $K\subset \mathbb{R}d$ has the property that the tangent cone of every non-smooth point $q\in \partial K$ is acute (in a certain sense) then there is a closed billiard trajectory in $K$.
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