Kohn's theorem and Newton-Hooke symmetry for Hill's equations
arXiv:1112.4793 · doi:10.1103/PhysRevD.85.045031
Abstract
Hill's equations, which first arose in the study of the Earth-Moon-Sun system, admit the two-parameter centrally extended Newton-Hooke symmetry without rotations. This symmetry allows for extending Kohn's theorem about the center-of-mass decomposition. Particular light is shed on the problem using Duval's "Bargmann" framework. The separation of the center-of-mass motion into that of a guiding center and relative motion is derived by a generalized chiral decomposition.
Published version. 22 pages 1 figure