Title of article
Linear stability of relative equilibria in the charged three-body problem
Author/Authors
Felipe Alfaro، نويسنده , , Ernesto Pérez-Chavela، نويسنده ,
Issue Information
روزنامه با شماره پیاپی سال 2008
Pages
22
From page
1923
To page
1944
Abstract
A relative equilibrium is a periodic orbit of the n-body problem that rotates uniformly maintaining the same central configuration for all time. In this paper we generalize some results of R. Moeckel and we apply it to study the linear stability of relative equilibria in the charged three-body problem. We find necessary conditions to have relative equilibria linearly stable for the collinear charged three-body problem, for planar relative equilibria we obtain necessary and sufficient conditions for linear stability in terms of the parameters, masses and electrostatic charges. In the last case we obtain a stability inequality which generalizes the Routh condition of celestial mechanics. We also proof the existence of spatial relative equilibria and the existence of planar relative equilibria of any triangular shape.
Keywords
Central Configuration , Spectral stability , Relative equilibria
Journal title
JOURNAL OF DIFFERENTIAL EQUATIONS
Serial Year
2008
Journal title
JOURNAL OF DIFFERENTIAL EQUATIONS
Record number
751487
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