Authors: Blagojević, Pavle 
Harrison, Michael
Tabachnikov, Serge
Ziegler, Günter
Affiliations: Mathematical Institute of the Serbian Academy of Sciences and Arts 
Title: Counting periodic trajectories of finsler billiards
Journal: Symmetry, Integrability and Geometry: Methods and Applications (SIGMA)
Volume: 16
First page: 022
Issue Date: 1-Jan-2020
Rank: M22
ISSN: 1815-0659
DOI: 10.3842/SIGMA.2020.022
Abstract: 
We provide lower bounds on the number of periodic Finsler billiard trajectories inside a quadratically convex smooth closed hypersurface M in a d-dimensional Finsler space with possibly irreversible Finsler metric. An example of such a system is a billiard in a sufficiently weak magnetic field. The r-periodic Finsler billiard trajectories correspond to r-gons inscribed in M and having extremal Finsler length. The cyclic group Zr acts on these extremal polygons, and one counts the Zr-orbits. Using Morse and Lusternik–Schnirelmann theories, we prove that if r ≥ 3 is prime, then the number of r-periodic Finsler billiard trajectories is not less than (r −1)(d−2)+1. We also give stronger lower bounds when M is in general position. The problem of estimating the number of periodic billiard trajectories from below goes back to Birkhoff. Our work extends to the Finsler setting the results previously obtained for Euclidean billiards by Babenko, Farber, Tabachnikov, and Karasev.
Keywords: Finsler manifolds | Magnetic billiards | Mathematical billiards | Morse and Lusternik | Schnirelmann theories | Unlabeled cyclic configuration spaces; Mathematics - Dynamical Systems; Mathematics - Dynamical Systems; Mathematics - Differential Geometry; Mathematics - Geometric Topology
Publisher: European Mathematical Information Service
Project: Collaborative Research Center TRR 109 "Dis-cretization in Geometry and Dynamics"
Methods of Functional and Harmonic Analysis and PDE with Singularities 
Topics in Geometrical Dynamics and Applications 

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