On the global structure of normal forms for slow-fast Hamiltonian systems
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Publication:384384
DOI10.1134/S1061920813020027zbMath1276.70014arXiv1302.3301MaRDI QIDQ384384
Publication date: 27 November 2013
Published in: Russian Journal of Mathematical Physics (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1302.3301
Related Items (3)
Higher order corrections to adiabatic invariants of generalized slow-fast Hamiltonian systems ⋮ Perturbed Hamiltonian dynamics from deformation of Poisson brackets ⋮ Deformations of Poisson structures on fibered manifolds and adiabatic slow–fast systems
Cites Work
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- Homological equations for tensor fields and periodic averaging
- The connection whose holonomy is the classical adiabatic angles of Hannay and Berry and its generalization to the non-integrable case
- New global asymptotics and anomalies for the problem of quantization of the adiabatic invariant
- A Hamiltonian approach for skew-product dynamical systems
- Manifolds, tensor analysis, and applications.
- The Hannay angles: Geometry, adiabaticity, and an example
- Reduction, symmetry, and phases in mechanics
- On the Period-Energy Relation
- Canonical transformations depending on a small parameter
- Regularization of kepler's problem and the averaging method on a manifold
- Averaging methods in nonlinear dynamical systems
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