Conformal Transformations and Integrable Mechanical Billiards
Abstract
In this article we explain that several integrable mechanical billiards in the plane are connected via conformal transformations. We first remark that the free billiard in the plane are conformal equivalent to infinitely many billiard systems defined in central force problems on a particular fixed energy level. We then explain that the classical Hooke-Kepler correspondence can be carried over to a correspondence between integrable Hooke-Kepler billiards. As part of the conclusion we show that any focused conic section gives rise to integrable Kepler billiards, which brings generalizations to a previous work of Gallavotti-Jauslin. We discuss several generalizations of integrable Stark billiards. We also show that any confocal conic sections give rise to integrable billiard systems of Euler's two-center problems.
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