Nicolas Bédaride
Published 2012-04-30Version 1
We consider the billiard map in a convex polyhedron of $\mathbb{R}^3$, and we prove that it is of zero topological entropy.
Comments: 18 pages, 3 figures
Journal: Discrete and continuous dynamical systems. 2007, volume 19, num\'ero 1, pages 89-102
Billiard complexity in the hypercube
On conjugacy of convex billiards
Suspension of the Billiard maps in the Lazutkin's coordinate
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