An Index Theory for Collision, Parabolic and Hyperbolic Solutions of the Newtonian n-body Problem
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[1] Xijun Hu,et al. Trace Formula for Linear Hamiltonian Systems with its Applications to Elliptic Lagrangian Solutions , 2013, 1308.4745.
[2] A. Portaluri,et al. Index theory for heteroclinic orbits of Hamiltonian systems , 2017, 1703.03908.
[3] A. Ambrosetti,et al. Non-collision periodic solutions for a class of symmetric 3-body type problems , 1994 .
[4] Guowei Yu. Simple Choreographies of the Planar Newtonian N-Body Problem , 2015, 1608.07956.
[5] A. Venturelli,et al. Viscosity solutions and hyperbolic motions: a new PDE method for the N-body problem , 2019, 1908.09252.
[6] E. Maderna,et al. On the free time minimizers of the Newtonian N-body problem , 2013, Mathematical Proceedings of the Cambridge Philosophical Society.
[7] Joel W. Robbin,et al. The Maslov index for paths , 1993 .
[8] Richard McGehee,et al. Triple collision in the collinear three-body problem , 1974 .
[9] Morse index properties of colliding solutions to the N-body problem , 2006, math/0609837.
[10] A. Chenciner. Action minimizing solutions of the Newtonian n-body problem: from homology to symmetry , 2003, math/0304449.
[11] S. Terracini,et al. Scattering Parabolic Solutions for the Spatial N-Centre Problem , 2016, 1602.02897.
[12] P. Rabinowitz,et al. A minimax method for a class of Hamiltonian systems with singular potentials , 1989 .
[13] R. Devaney. Triple collision in the planar isosceles three body problem , 1980 .
[14] Zhihong Xia,et al. The existence of noncollision singularities in newtonian systems , 1992 .
[15] S. Terracini,et al. On the singularities of generalized solutions to n-body type problems ! , 2007, math/0701174.
[16] Chao-Nien Chen,et al. Maslov index for homoclinic orbits of hamiltonian systems , 2007 .
[17] Y. Long,et al. Maslov-Type Index Theory for Symplectic Paths and Spectral Flow (II) , 1980 .
[18] S. Terracini,et al. An index theory for asymptotic motions under singular potentials , 2017, Advances in Mathematics.
[19] Yuwei Ou,et al. Collision Index and Stability of Elliptic Relative Equilibria in Planar $${n}$$n-body Problem , 2015, 1509.02605.
[20] E. Maderna,et al. Globally Minimizing Parabolic Motions in the Newtonian N-body Problem , 2007, 1502.06278.
[21] S. Terracini,et al. Entire parabolic trajectories as minimal phase transitions , 2011, 1105.3358.
[22] Y. Long. Index Theory for Symplectic Paths with Applications , 2002 .
[23] J. Chazy,et al. Sur l'allure finale du mouvement dans le problème des trois corps , 1929 .
[24] P. Majer,et al. Ordinary differential operators in Hilbert spaces and Fredholm pairs , 2003 .
[25] Shanzhong Sun,et al. Index and Stability of Symmetric Periodic Orbits in Hamiltonian Systems with Application to Figure-Eight Orbit , 2009 .
[26] Kazunaga Tanaka. Non-collision solutions for a second order singular Hamiltonian system with weak force , 1993 .
[27] R. Moeckel. ORBITS OF THE THREE-BODY PROBLEM WHICH PASS INFINITELY CLOSE TO TRIPLE COLLISION , 1981 .
[28] R. Courant,et al. Methods of Mathematical Physics , 1962 .
[29] R. Moeckel. Chaotic dynamics near triple collision , 1989 .
[30] Richard Montgomery,et al. A remarkable periodic solution of the three-body problem in the case of equal masses , 2000, math/0011268.
[31] S. Terracini,et al. On the existence of collisionless equivariant minimizers for the classical n-body problem , 2003, math-ph/0302022.
[32] P. Rabinowitz,et al. Periodic solutions of Hamiltonian systems of 3-body type , 1991 .
[33] Kuo-Chang Chen. Existence and minimizing properties of retrograde orbits to the three-body problem with various choices of masses , 2008 .
[34] Li Wu,et al. Morse Index Theorem of Lagrangian Systems and Stability of Brake Orbit , 2018, Journal of Dynamics and Differential Equations.