Airi Takeuchi

Universitätsstrase 2, 86159 Augsburg, Germany
Institute of Mathematics, University of Augsburg

Publications:

Takeuchi A., Zhao L.
Abstract
In this article, we consider mechanical billiard systems defined with Lagrange's integrable {extension} of Euler's two-center problems in the Euclidean space, the sphere, and the hyperbolic space of arbitrary dimension $n \geqslant 3$. In the three-dimensional Euclidean space, we show that the billiard systems with any finite combinations of {spheroids and circular hyperboloids of two sheets} having two foci at the Kepler centers are integrable. The same holds for the projections of these systems on the three-dimensional sphere and in the three-dimensional hyperbolic space by means of central projection. Using the same approach, we also extend these results to the $n$-dimensional cases.
Keywords: mechanical billiard systems, Euler's two-center problem, Lagrange problem, integrability
Citation: Takeuchi A., Zhao L.,  Integrable Mechanical Billiards in Higher-Dimensional Space Forms, Regular and Chaotic Dynamics, 2024, vol. 29, no. 3, pp. 405-434
DOI:10.1134/S1560354724510038

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