An Index Theory for Collision, Parabolic and Hyperbolic Solutions of the Newtonian n-body Problem

In the Newtonian n-body problem for solutions with arbitrary energy, which start and end either at a total collision or a parabolic/hyperbolic infinity, we prove some basic results about their Morse and Maslov indices. Moreover for homothetic solutions with arbitrary energy, we give a simple and precise formula that relates the Morse indices of these homothetic solutions to the spectra of the normalized potential at the corresponding central configurations. Potentially these results could be useful in the application of non-action minimization methods in the Newtonian n-body problem.

[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.