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Tisserand's parameter

Tisserand's parameter (or Tisserand's invariant) is a number calculated from several orbital elements (semi-major axis, orbital eccentricity, and inclination) of a relatively small object and a larger "perturbing body". It is used to distinguish different kinds of orbits. The term is named after French astronomer Félix Tisserand who derived it[1] and applies to restricted three-body problems in which the three objects all differ greatly in mass.

Definition

For a small body with semi-major axis , orbital eccentricity , and orbital inclination , relative to the orbit of a perturbing larger body with semimajor axis , the parameter is defined as follows:[2][3]


Tisserand invariant conservation

In the three-body problem, the quasi-conservation of Tisserand's invariant is derived as the limit of the Jacobi integral away from the main two bodies (usually the star and planet).[2] Numerical simulations show that the Tisserand invariant of orbit-crossing bodies is conserved in the three-body problem on Gigayear timescales.[4][5]

Applications

The Tisserand parameter's conservation was originally used by Tisserand to determine whether or not an observed orbiting body is the same as one previously observed. This is usually known as the Tisserand's criterion.

Orbit classification

The value of the Tisserand parameter with respect to the planet that most perturbs a small body in the solar system can be used to delineate groups of objects that may have similar origins.

  • TJ, Tisserand's parameter with respect to Jupiter as perturbing body, is frequently used to distinguish asteroids (typically ) from Jupiter-family comets (typically ).[6]
  • The minor planet group of damocloids are defined by a Jupiter Tisserand's parameter of 2 or less (TJ ≤ 2).[7]
  • TN, Tisserand's parameter with respect to Neptune, has been suggested to distinguish near-scattered (affected by Neptune) from extended-scattered trans-Neptunian objects (not affected by Neptune; e.g. 90377 Sedna).
  • TN, Tisserand's parameter with respect to Neptune may also be used to distinguish Neptune-crossing trans-neptunian objects that may be injected onto retrograde and polar Centaur orbits ( -1 ≤TN ≤ 2) and those that may be injected onto prograde Centaur orbits ( 2 ≤TN ≤ 2.82).[4][5]

Other uses

The parameter is derived from one of the so-called Delaunay standard variables, used to study the perturbed Hamiltonian in a three-body system. Ignoring higher-order perturbation terms, the following value is conserved:

Consequently, perturbations may lead to the resonance between the orbital inclination and eccentricity, known as Kozai resonance. Near-circular, highly inclined orbits can thus become very eccentric in exchange for lower inclination. For example, such a mechanism can produce sungrazing comets, because a large eccentricity with a constant semimajor axis results in a small perihelion.

See also

References

  1. ^ Tisserand, F. (1896). Traité de Mécanique Céleste. Vol. IV. Gauthier-Villards.
  2. ^ a b Murray, Carl D.; Dermott, Stanley F. (2000). Solar System Dynamics. Cambridge University Press. ISBN 0-521-57597-4.
  3. ^ Bonsor, A.; Wyatt, M. C. (2012-03-11). "The scattering of small bodies in planetary systems: constraints on the possible orbits of cometary material: Scattering in planetary systems". Monthly Notices of the Royal Astronomical Society. 420 (4): 2990–3002. arXiv:1111.1858. doi:10.1111/j.1365-2966.2011.20156.x.
  4. ^ a b Namouni, F. (2021-11-26). "Inclination pathways of planet-crossing asteroids". Monthly Notices of the Royal Astronomical Society. 510 (1): 276–291. arXiv:2111.10777. doi:10.1093/mnras/stab3405.
  5. ^ a b Namouni, F. (2023-11-20). "Orbit injection of planet-crossing asteroids". Monthly Notices of the Royal Astronomical Society. 527 (3): 4889–4898. arXiv:2311.09946. doi:10.1093/mnras/stad3570.
  6. ^ "Dave Jewitt: Tisserand Parameter". www2.ess.ucla.edu. Retrieved 2018-03-27.
  7. ^ Jewitt, David C. (August 2013). "The Damocloids". UCLA – Department of Earth and Space Sciences. Retrieved 15 February 2017.
  8. ^ Merritt, David (2013). Dynamics and Evolution of Galactic Nuclei. Princeton, NJ: Princeton University Press. ISBN 9781400846122.

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