Results on equality of masses for choreographic solutions of n-body problems
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Publication:5141051
DOI10.1063/1.5142237zbMath1476.70043arXiv2003.10694OpenAlexW3083947246MaRDI QIDQ5141051
Publication date: 17 December 2020
Published in: Journal of Mathematical Physics (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/2003.10694
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- Finiteness of polygonal relative equilibria for generalised quasi-homogeneous \(n\)-body problems and \(n\)-body problems in spaces of constant curvature
- The curved \(N\)-body problem: risks and rewards
- Existence of a lower bound for the distance between point masses of relative equilibria in spaces of constant curvature
- Relative equilibria of the curved \(N\)-body problem.
- The \(n\)-body problem in spaces of constant curvature. II: Singularities
- Existence of a class of rotopulsators
- Bifurcations and equilibria in the extended \(N\)-body ring problem
- The restricted two-body problem in constant curvature spaces
- On the use and abuse of Newton's second law for variable mass problems
- Regularization of partial collisions in the \(N\)-body problem
- Triple collision in the quasi-homogeneous collinear three-body problem
- A planar case of the \(n+1\) body problem: The ring problem
- Phase-space structure and regularization of Manev-type problems
- Central configurations of the curved \(N\)-body problem
- Equilibrium points and central configurations for the Lennard-Jones 2- and 3-body problems
- Two-body problem on a sphere. Reduction, stochasticity, periodic orbits
- Near-collision dynamics for particle systems with quasihomogeneous potentials
- Simple choreographies of the planar Newtonian \(N\)-body problem
- Circular non-collision orbits for a large class of \(n\)-body problems
- Homographic solutions in the planar \(n+1\) body problem with quasi-homogeneous potentials
- Central configurations and total collisions for quasihomogeneous \(n\)-body problems
- Computing hyperbolic choreographies
- Rotopulsators of the curved \(N\)-body problem
- Computing Planar and Spherical Choreographies
- Uniqueness results for co-circular central configurations for power-law potentials
- Lagrange-Pizzetti theorem for the quasihomogeneous N-body problem
- Central configurations and homographic solutions for the quasihomogeneous N-body problem
- Relative equilibria in the 3-dimensional curved n-body problem
- All the Lagrangian relative equilibria of the curved 3-body problem have equal masses
- Three-dimensional central configurations in ℍ3 and 𝕊3
- Figure-eight choreographies of the equal mass three-body problem with Lennard-Jones-type potentials
- On the singularities of the curved $n$-body problem
- Simple Choreographic Motions of N Bodies: A Preliminary Study
- Eulerian relative equilibria of the curved 3-body problems in 𝐒²
- The planar isosceles problem for Maneff’s gravitational law
- On Maxwell's (n+1)-Body Problem in the Manev-Type Field and on the Associated Restricted Problem
- Braids in classical dynamics
- Polygonal rotopulsators of the curved n-body problem
- On the anisotropic Manev problem
- Polygonal homographic orbits in spaces of constant curvature
- The non-existence of centre-of-mass and linear-momentum integrals in the curved N-body problem
- The Classical N-body Problem in the Context of Curved Space
- Rectangular orbits of the curved 4-body problem
- Existence of a lower bound for the distance between point masses of relative equilibria for generalised quasi-homogeneous n-body problems and the curved n-body problem
- The global flow of the Manev problem
- Polygonal homographic orbits of the curved $n$-body problem
- CLASSIFICATION OF SYMMETRY GROUPS FOR PLANAR -BODY CHOREOGRAPHIES
- Central configurations with a quasihomogeneous potential function
- A remarkable periodic solution of the three-body problem in the case of equal masses
- Zero-velocity surfaces in the three-dimensional ring problem of \(N+1\) bodies.
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