\(n\)-body problem and choreographies
From MaRDI portal
Publication:6599399
DOI10.1007/978-1-0716-2621-4_351zbMATH Open1548.70012MaRDI QIDQ6599399
Publication date: 6 September 2024
Three-body problems (70F07) Two-body problems (70F05) Perturbations of finite-dimensional Hamiltonian systems, normal forms, small divisors, KAM theory, Arnol'd diffusion (37J40) Celestial mechanics (70F15) (n)-body problems (70F10) Perturbation theories for problems in Hamiltonian and Lagrangian mechanics (70H09) Nearly integrable Hamiltonian systems, KAM theory (70H08) Research exposition (monographs, survey articles) pertaining to mechanics of particles and systems (70-02) Collisions in celestial mechanics, regularization (70F16)
Cites Work
- The principle of symmetric criticality
- Symmetry groups and non-planar collisionless action-minimizing solutions of the three-body problem in three-dimensional space
- Morse index properties of colliding solutions to the \(N\)-body problem
- A new branch of mountain pass solutions for the choreographical 3-body problem
- Symmetry groups of the planar three-body problem and action-minimizing trajectories
- Von Zeipel's theorem on singularities in celestial mechanics
- Central configurations of the N-body problem via equivariant Morse theory
- Triple collision in the planar isosceles three body problem
- Periodic solutions of Hamiltonian systems of 3-body type
- Regularization of partial collisions in the \(N\)-body problem
- Triple collision in the collinear three-body problem
- Non regularizability of the anisotropic Kepler problem
- Collision orbits in the anisotropic Kepler problem
- Periodic solutions to some problems of \(n\)-body type
- Non-collision periodic solutions for a class of symmetric 3-body type problems
- Non-collision periodic solutions of the N-body system
- Elliptic two-dimensional invariant tori for the planetary three-body problem
- Binary decompositions for planar \(N\)-body problems and symmetric periodic solutions
- Sur les solutions périodiques et le principe de la moindre action.
- Minimization properties of Hill's orbits and applications to some \(N\)-body problems
- The equation for the vertical variations of a relative equilibrium as a source of new periodic solutions of the \(N\) body problem.
- On central configurations
- On Chenciner-Montgomery's orbit in the three-body problem.
- How the method of minimization of action avoids singularities
- On the existence of collisionless equivariant minimizers for the classical \(n\)-body problem
- On the global dynamics of the anisotropic Manev problem
- Stability of the planetary three-body problem. I: Expansion of the planetary Hamiltonian
- Stability of the planetary three-body problem. II: KAM theory and existence of quasiperiodic motions
- Near-collision dynamics for particle systems with quasihomogeneous potentials
- Dual variational methods in critical point theory and applications
- Painlevé's conjecture
- Transitive decomposition of symmetry groups for the \(n\)-body problem
- A bisection algorithm for the numerical mountain pass
- Central configurations and total collisions for quasihomogeneous \(n\)-body problems
- Singularities of the n-body problem. I
- Singularities and collisions of Newtonian gravitational systems
- Rotating Eights: I. The three Γifamilies
- Symmetries and noncollision closed orbits for planar N-body-type problems
- The Kepler problem with anisotropic perturbations
- Collision Singularities in Celestial Mechanics
- On the Singularities of Generalized Solutions to n-Body-Type Problems
- A Minimizing Property of Keplerian Orbits
- Minima de l'intégrale d'action et équilibres relatifs de n corps
- Study of the critical points at infinity arising from the failure of the Palais-Smale condition for 𝑛-body type problems
- TheN-body problem, the braid group, and action-minimizing periodic solutions
- Conservative Dynamical Systems Involving Strong Forces
- Variational methods on periodic and quasi-periodic solutions for the N-body problem
- Braids in classical dynamics
- Action minimizing orbits in then-body problem with simple choreography constraint
- On the existence of infinitely many periodic solutions to some problems of n‐body type
- Démonstration du ‘théorème d'Arnold’ sur la stabilité du système planétaire (d'après Herman)
- N-Dimensional Elliptic Invariant Tori for the Planar (N+1)-Body Problem
- SMALL DENOMINATORS AND PROBLEMS OF STABILITY OF MOTION IN CLASSICAL AND CELESTIAL MECHANICS
- Sur la régularisation du problème des trois corps.
- Minima of the action integral in the Newtonian problem of 4 bodies with equal masses: `Hip-hop' orbits
- A remarkable periodic solution of the three-body problem in the case of equal masses
- Action-minimizing orbits in the parallelogram four-body problem with equal masses
- The family \(P_{12}\) of the three-body problem -- the simplest family of periodic orbits, with twelve symmetries per period
- Title not available (Why is that?)
- Title not available (Why is that?)
- Title not available (Why is that?)
- Title not available (Why is that?)
- Title not available (Why is that?)
- Title not available (Why is that?)
- Title not available (Why is that?)
- Title not available (Why is that?)
- Title not available (Why is that?)
- Title not available (Why is that?)
- Title not available (Why is that?)
This page was built for publication: \(n\)-body problem and choreographies
Report a bug (only for logged in users!)Click here to report a bug for this page (MaRDI item Q6599399)
