
This article is cited in 2 scientific papers (total in 2 papers)
Studying the stability of equilibrium solutions in the elliptic restricted manybody problem with the computer algebra methods
A. N. Prokopenya^{} ^{} Brest State Technical University
Abstract:
Stability of equilibrium solutions in the elliptic restricted manybody problem of Sitnikov's kind is studied. Equations of the disturbed motion are obtained in the form of the Hamiltonian system of differential equations with periodic coefficients. We have found the domains of instability of the system in the parameter space and shown that it is stable in Lyapunov sense if an eccentricity of the bodies orbits is sufficiently small. It has been proved that for small values of the eccentricity nonlinear terms in the equations of motion do not disturb stability of the system even if the fourth order resonance takes place. All calculations are done with the computer algebra system Mathematica.
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Received: 28.11.2005
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A. N. Prokopenya, “Studying the stability of equilibrium solutions in the elliptic restricted manybody problem with the computer algebra methods”, Matem. Mod., 18:10 (2006), 102–112
Citation in format AMSBIB
\Bibitem{Pro06}
\by A.~N.~Prokopenya
\paper Studying the stability of equilibrium solutions in the elliptic restricted manybody problem with the computer algebra methods
\jour Matem. Mod.
\yr 2006
\vol 18
\issue 10
\pages 102112
\mathnet{http://mi.mathnet.ru/mm12}
\mathscinet{http://www.ams.org/mathscinetgetitem?mr=2298617}
\zmath{https://zbmath.org/?q=an:1104.70009}
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http://mi.mathnet.ru/eng/mm12 http://mi.mathnet.ru/eng/mm/v18/i10/p102
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This publication is cited in the following articles:

Kalas V.O., Krasilnikov P.S., “Ob ustoichivosti ravnovesiya v zadache sitnikova”, Kosmicheskie issledovaniya, 49:6 (2011), 551–551

Zhuravlev S.G. Perepelkina Yu.V., “The Stability in a Strict NonLinear Sense of a Trivial Relative Equilibrium Position in the Classical and Generalized Versions of Sitnikov's Problem”, PmmJ. Appl. Math. Mech., 77:2 (2013), 172–180

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