Normal stability of slow manifolds in nearly periodic Hamiltonian systems
DOI10.1063/5.0054323zbMath1498.70034arXiv2104.02190OpenAlexW3198959627WikidataQ114103675 ScholiaQ114103675MaRDI QIDQ5154285
Publication date: 4 October 2021
Published in: Journal of Mathematical Physics (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/2104.02190
Symmetries and conservation laws, reverse symmetries, invariant manifolds and their bifurcations, reduction for problems in Hamiltonian and Lagrangian mechanics (70H33) Stability problems for finite-dimensional Hamiltonian and Lagrangian systems (37J25) Systems with slow and fast motions for nonlinear problems in mechanics (70K70) Periodic and almost periodic solutions for problems in Hamiltonian and Lagrangian mechanics (70H12)
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Cites Work
- Unnamed Item
- Equivariant collaring, tubular neighbourhood and gluing theorems for proper Lie group actions
- A new conservation theorem
- The Hamiltonian structure of the Maxwell-Vlasov equations
- Geometric singular perturbation theory for ordinary differential equations
- Convexity properties of the moment mapping
- On the unfolding of folded symplectic structures
- INVITED: Slow manifold reduction for plasma science
- Hamiltonian gyrokinetic Vlasov-Maxwell system
- Integrating factors, adjoint equations and Lagrangians
- Geometry and guiding center motion
- Hamiltonian perturbation theory in noncanonical coordinates
- Hamiltonian formulation of guiding center motion
- Compressible and incompressible fluids
- Hamiltonian perturbation theory: periodic orbits, resonances and intermittency
- Almost invariant elliptic manifold in a singularly perturbed Hamiltonian system
- Guiding center dynamics as motion on a formal slow manifold in loop space
- Asymptotic Theory of Hamiltonian and other Systems with all Solutions Nearly Periodic
- Slow manifolds of classical Pauli particle enable structure-preserving geometric algorithms for guiding center dynamics
