Methods of Celestial Mechanics: Volume II: Application to Planetary System, Geodynamics and Satellite GeodesySpringer Science & Business Media, 21.11.2005 - 448 Seiten G. Beutler's Methods of Celestial Mechanics is a coherent textbook for students as well as an excellent reference for practitioners. The first volume gives a thorough treatment of celestial mechanics and presents all the necessary mathematical details that a professional would need. The reader will appreciate the well-written chapters on numerical solution techniques for ordinary differential equations, as well as that on orbit determination. In the second volume applications to the rotation of earth and moon, to artificial earth satellites and to the planetary system are presented. The author addresses all aspects that are of importance in high-tech applications, such as the detailed gravitational fields of all planets and the earth, the oblateness of the earth, the radiation pressure and the atmospheric drag. The concluding part of this monumental treatise explains and details state-of-the-art professional and thoroughly-tested software for celestial mechanics. |
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... axes (or of the associated revolution periods) indicates that the Kirkwood gaps must (somehow) be explained by the commensurabilities of the revolution periods of the minor planets and of Jupiter. After the discussion of the ...
... axes for a non-rigid Earth, named after Félix Tissérand (1845–1896)) in inertial space, • the position of the Earth rotation axis ω♁ w.r.t. the Earth's figure axis, • the angular velocity ω♁(t) def=|ω♁ | of the Earth (as a function ...
... axes. The latter angle corresponds to the amplitude of PM and is given by the initial state of the system (see developments below). Fig. 2.17. Angular velocity vector e., angular momentum vector e, , and figure axis e3 of the ...
... real in long time series of latitude observations (see, e.g., [126]). Equations (2.14) explain PM in the absence of torques as shown in Figure 2.16. How do figure and rotation axes of Earth move in 36 2. The Rotation of Earth and Moon.
... axes of Earth move in the inertial space in the absence of torques? Figure 2.18 gives the answer for a short time ... axes lie (in this order) in one plane (see Figure 2.17 and eqn. (2.9)) and that the former two axes move on cones ...
Inhalt
3 | |
6 | |
14 | |
Artificial Earth Satellites | 123 |
Evolution of the Planetary System | 211 |
Variational Equations | 272 |
5 | 301 |
The ComputerPrograms NUMINT and LINEAR | 311 |
The ComputerPrograms SATORB and LEOKIN | 323 |
The ComputerProgram ORBDET 355 | 354 |
The ComputerProgram ERDROT | 371 |
The ComputerProgram PLASYS | 387 |
Elements of Spectral Analysis | 394 |
References | 425 |
Abbreviations and Acronyms 433 | 432 |
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Methods of Celestial Mechanics: Volume II: Application to Planetary System ... Gerhard Beutler Eingeschränkte Leseprobe - 2004 |
Methods of Celestial Mechanics: Volume II: Application to Planetary System ... Gerhard Beutler Keine Leseprobe verfügbar - 2004 |