B. S. Kushvah, J. P. Sharma, B. Ishwar
Published 2006-09-20, updated 2007-11-12Version 2
The Nonlinear stability of triangular equilibrium points has been discussed in the generalised photogravitational restricted three body problem with Poynting-Robertson drag. The problem is generalised in the sense that smaller primary is supposed to be an oblate spheroid. The bigger primary is considered as radiating. We have performed first and second order normalization of the Hamiltonian of the problem. We have applied KAM theorem to examine the condition of non-linear stability. We have found three critical mass ratios. Finally we conclude that triangular points are stable in the nonlinear sense except three critical mass ratios at which KAM theorem fails.
Comments: Including Poynting-Robertson Drag the triangular equilibrium points are stable in the nonlinear sense except three critical mass ratios at which KAM theorem fails
Journal: Astrophysics and Space Science, Volume 312, Numbers 3-4 / December, 2007, 279-293
Normalization of Hamiltonian in the Generalized Photogravitaional Restricted Three Body Problem with Poynting-Robertson Drag
Second Order Normalization in the Generalized Photogravitational Restricted Three Body Problem with Poynting-Robertson Drag
Symmetry, bifurcation and stacking of the central configurations of the planar 1+4 body problem
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