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" Dynamics of Planets and Satellites and Theories of Their Motion Proceedings of the 41st Colloquium of the International Astronomical Union Held in Cambridge, England, 17-19 August 1976. "
Szebehely, V.G.
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BL
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774163
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b594157
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Szebehely, V.G.
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Dynamics of Planets and Satellites and Theories of Their Motion Proceedings of the 41st Colloquium of the International Astronomical Union Held in Cambridge, England, 17-19 August 1976.\ Szebehely, V.G.
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Springer Verlag, 2013
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9400998090
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: 9789400998094
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| Contents
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I. Planetary Theory and Analytical Methods.- Planetary Theories and Observational Data.- Correspondances entre une theorie generale planetaire en variables elliptiques et la theorie classique de Le Verrier.- Mathematical Results of the General Planetary Theory in Rectangular Coordinates.- Construction of Planetary Theory by Iterative Procedure.- Qualitative Dynamics of the Sun-Jupiter-Saturn System.- A New Approach for the Construction of Long - Periodic Perturbations.- Construction d'une theorie planetaire au troisieme ordre des masses.- Discussion sur les resultats de theories planetaires.- Relation of a Contracting Earth to the Apparent Accelerations of the Sun and Moon (Abstract).- The Asteroidal Planet as the Origin of Comets.- Comets and the Missing Planet.- Mac Revisited: Mechanised Algebraic Operations on Fourth Generation Computers (Abstract).- II. Lunar Theory and Minor Planet Motions.- Contribution a 1'etude des perturbations planetaires de la Lune.- Hamiltonian Theory of the Libration of the Moon.- New Results on the Commensurability Cases of the Problem Sun-Jupiter-Asteroid.- A Theory of the Trojan Asteroids (Abstract).- III. Numerical and Other Techniques.- Stabilization by Making use of a Generalized Hamiltonian Variational Formalism.- A Special Perturbation Method: m-Fold Runge-Kutta (Abstract).- Numerical Integration of Nearly-Hamiltonian Systems.- On the Solution of the Exterior Boundary Value Problem with the Aid of Series (Abstract).- A Note on the Development of the Reciprocal Distance in Planetary Theory (Abstract).- IV. Satellites of Jupiter and Saturn, and Artificial Satellites.- An Application of the Stroboscopic Method.- New Formulation of De Sitter's Theory of Motion for Jupiter I-IV. I: Equations of Motion and the Disturbing Function.- Theory of Motion of Jupiter's Galilean Satellites (Abstract).- A Second-Order Theory of the Galilean Satellites of Jupiter.- Solar Perturbations in Saturnian Satellite Motions and Iapetus-Titan Interactions (Abstract).- Improvement of Orbits of Satellites of Saturn using Photographic Observations (Abstract).- New Orbits for Enceladus and Dione Based on the Photographic Observations (Abstract).- Long-Periodic Variation of Orbital Elements of a Satellite Perturbed by Discrete Gravity Anomalies (Abstract).- Third-Order Solution of an Artificial-Satellite Theory.- Some Considerations on the Theoretical Determination of the Potential by the Motion of Artificial Satellites in the Plane case (Abstract).- V. Gravitational Problems of Three or More Bodies.- Families of Periodic Planetary-Type Orbits in the N-Body Problem and Their Application to the Solar System.- Perturbations of Critical Mass in the Restricted Three-Body Problem (Abstract).- Gravitational Restricted Three-Body Problem: Existence of Retrograde Satellites at Large Distance.- Displacement of the Lagrange Equilibrium Points in the Restricted Three Body Problem with Rigid Body Satellite.- A New Kind of Periodic Orbit: The Three-Dimensional Asymmetric.- On Asymmetric Periodic Solutions of the Plane Restricted Problem of Three Bodies, and Bifurcations of Families.- Construction de solutions periodiques du probleme restreint elliptique par la methode de Hale.- Orbital Stability in the Elliptic Restricted Three Body Problem.- Resonance in the Restricted Problem of Three Bodies with Short-Period Perturbations in the Elliptic Case.- Periodic Orbits of the First Kind in the Restricted Three Body Problem when the More Massive Primary is an oblate spheroid (Abstract).- Triple Collision as an Unstable Equilibrium (Abstract).- Regions of Escape on the Velocity Ellipsoid for the Planar Three Body Problem.- Index of Names.- Index of Subjects.
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Szebehely, V.G.
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