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arxiv: 2104.02190 · v1 · pith:NSOEUZHM · submitted 2021-04-05 · math.DS · math-ph· math.MP· physics.plasm-ph

Normal stability of slow manifolds in nearly-periodic Hamiltonian systems

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classification math.DS math-phmath.MPphysics.plasm-ph
keywords manifoldsnearly-periodicnormalstabilityslowsystemsembeddinghamiltonian
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M. Kruskal showed that each nearly-periodic dynamical system admits a formal $U(1)$ symmetry, generated by the so-called roto-rate. We prove that such systems also admit nearly-invariant manifolds of each order, near which rapid oscillations are suppressed. We study the nonlinear normal stability of these slow manifolds for nearly-periodic Hamiltonian systems on barely symplectic manifolds -- manifolds equipped with closed, non-degenerate $2$-forms that may be degenerate to leading order. In particular, we establish a sufficient condition for long-term normal stability based on second derivatives of the well-known adiabatic invariant. We use these results to investigate the problem of embedding guiding center dynamics of a magnetized charged particle as a slow manifold in a nearly-periodic system. We prove that one previous embedding, and two new embeddings enjoy long-term normal stability, and thereby strengthen the theoretical justification for these models.

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