Asymptotic expansions in the perturbed two-body problem with application to systems with variable mass |
| |
Authors: | Ferdinand Verhulst |
| |
Affiliation: | 1. Mathematisch Instituut, Rijksuniversiteit Utrecht, The Netherlands
|
| |
Abstract: | The main theorems of the theory of averaging are formulated for slowly varying standard systems and we show that it is possible to extend the class of perturbation problems where averaging might be used. The application of the averaging method to the perturbed two-body problem is possible but involves many technical difficulties which in the case of the two-body problem with variable mass are avoided by deriving new and more suitable equations for these perturbation problems. Application of the averaging method to these perturbation problems yields asymptotic approximations which are valid on a long time-scale. It is shown by comparison with results obtained earlier that in the case of the two-body problem with slow decrease of mass the averaging method cannot be applied if the initial conditions are nearly parabolic. In studying the two-body problem with quick decrease of mass it is shown that the new formulation of the perturbation problem can be used to obtain matched asymptotic approximations. |
| |
Keywords: | |
本文献已被 SpringerLink 等数据库收录! |