Fractional Hamiltonian monodromy from a Gauss–Manin monodromy
From MaRDI portal
Publication:5504869
DOI10.1063/1.2863614zbMath1152.81613arXiv0709.2765OpenAlexW3104243663MaRDI QIDQ5504869
Ahmed Jebrane, Dominique Sugny, H. R. Jauslin, Michèle Pelletier, Pavao Mardešić
Publication date: 23 January 2009
Published in: Journal of Mathematical Physics (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/0709.2765
Lua error in Module:PublicationMSCList at line 37: attempt to index local 'msc_result' (a nil value).
Related Items (10)
Nekhoroshev's approach to Hamiltonian monodromy ⋮ Monodromy of Hamiltonian systems with complexity 1 torus actions ⋮ Dynamics near the \(p: - q\) resonance ⋮ Uncovering fractional monodromy ⋮ Parallel transport along Seifert manifolds and fractional monodromy ⋮ Hamiltonian Monodromy via spectral Lax pairs ⋮ Rotation forms and local Hamiltonian monodromy ⋮ Recent advances in the monodromy theory of integrable Hamiltonian systems ⋮ Wave attraction in resonant counter-propagating wave systems ⋮ Abelian Integrals: From the Tangential 16th Hilbert Problem to the Spherical Pendulum
Cites Work
- Unnamed Item
- Unnamed Item
- Fractional Hamiltonian monodromy
- Hamiltonian systems with detuned 1:1:2 resonance: manifestation of bidromy
- Fractional monodromy in the \(1\:- 2\) resonance
- Unfolding the quartic oscillator
- Quantum monodromy in integrable systems
- Fractional monodromy of resonant classical and quantum oscillators
- Monodromy in the hydrogen atom in crossed fields
- Quantum monodromy in prolate ellipsoidal billiards
- Metamorphoses of Hamiltonian systems with symmetries
- Singular Bohr-Sommerfeld rules.
- Hamiltonian monodromy via Picard-Lefschetz theory
- The monodromy of the Lagrange top and the Picard-Lefschetz formula.
- The problem of two fixed centers: bifurcations, actions, monodromy
- Monodromy, diabolic points, and angular momentum coupling
- The extended monodromy group and Liouvillian first integrals
- Differentiable fibre spaces and mappings compatible with Riemannian metrics
- Monodromy of the quantum 1:1:2 resonant swing spring
- Fractional monodromy in the case of arbitrary resonances
- On global action-angle coordinates
- Exact semiclassical expansions for one-dimensional quantum oscillators
- Quantum monodromy in the two-centre problem
- Singular Bohr–Sommerfeld rules for 2D integrable systems
This page was built for publication: Fractional Hamiltonian monodromy from a Gauss–Manin monodromy
