Sean Gasiorek
Published 2021-06-10Version 1
We study the stability of periodic trajectories of planar inverse magnetic billiards, a dynamical system whose trajectories are straight lines inside a connected planar domain $\Omega$ and circular arcs outside $\Omega$. Explicit examples are calculated in circles, ellipses, and the one parameter family of curves $x^{2k}+y^{2k}=1$. Comparisons are made to the linear stability of periodic billiard and magnetic billiard trajectories.
Comments: 23 pages, 9 figures
Linear stability of elliptic Lagrangian solutions of the planar three-body problem via index theory
Correlations for pairs of periodic trajectories for open billiards
Linear stability of the n-gon relative equilibria of the (1+n)-body problem
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