Periodic orbits for an infinite family of classical superintegrable systems

Abstract

We show that all bounded trajectories in the two dimensional classical system with the potential V(r,φ)=ω2 r2+ k2r2 2 k φ+ β k2r2 2 k φ are closed for all integer and rational values of k. The period is T=π2ω and does not depend on k. This agrees with our earlier conjecture suggesting that the quantum version of this system is superintegrable.