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Invariant rotational curves in Sitnikov's Problem
Cristina ChiraltJ. Martínez Alfarosubject
Kolmogorov–Arnold–Moser theoremApplied MathematicsMathematical analysisKepler's laws of planetary motionAstronomy and AstrophysicsGeometryInvariant (physics)Fixed pointThree-body problemSitnikov problemCelestial mechanicsComputational Mathematicssymbols.namesakeSpace and Planetary ScienceModeling and SimulationsymbolsAstrophysics::Earth and Planetary AstrophysicsHamiltonian (quantum mechanics)Mathematical PhysicsMathematicsdescription
The Sitnikov's Problem is a Restricted Three-Body Problem of Celestial Mechanics depending on a parameter, the eccentricity,e. The Hamiltonian,H(z, v, t, e), does not depend ont ife=0 and we have an integrable system; ife is small the KAM Theory proves the existence of invariant rotational curves, IRC. For larger eccentricities, we show that there exist two complementary sequences of intervals of values ofe that accumulate to the maximum admissible value of the eccentricity, 1, and such that, for one of the sequences IRC around a fixed point persist. Moreover, they shrink to the planez=0 ase tends to 1.
| year | journal | country | edition | language |
|---|---|---|---|---|
| 1993-04-01 | Celestial Mechanics & Dynamical Astronomy |