Numerical integration in celestial mechanics: A case for contact geometry

Alessandro Bravetti, Marcello Seri*, Mats Vermeeren, Federico Zadra

*Corresponding author for this work

Research output: Contribution to journalArticleAcademicpeer-review

16 Citations (Scopus)
236 Downloads (Pure)

Abstract

Several dynamical systems of interest in Celestial Mechanics can be written in the form of a Newton equation with time-dependent damping, linear in the velocities. For instance, the modified Kepler problem, the spin–orbit model and the Lane–Emden equation all belong to such class. In this work, we start an investigation of these models from the point of view of contact geometry. In particular, we focus on the (contact) Hamiltonisation of these models and on the construction of the corresponding geometric integrators.

Original languageEnglish
Article number7
Number of pages29
JournalCelestial Mechanics & Dynamical Astronomy
Volume132
Issue number1
DOIs
Publication statusPublished - 3-Jan-2020

Keywords

  • math.NA
  • astro-ph.EP
  • cs.NA
  • math-ph
  • math.MP
  • 65D30, 34K28, 34A26

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