Results 251 to 260 of about 748,901 (305)
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1999
In the present chapter we shall give those results from celestial mechanics which we shall use in the present book. This makes our exposition more self-contained and makes it unnecessary for the reader to turn to textbooks on celestial mechanics.
Alexei M. Fridman, Nikolai N. Gorkavyi
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In the present chapter we shall give those results from celestial mechanics which we shall use in the present book. This makes our exposition more self-contained and makes it unnecessary for the reader to turn to textbooks on celestial mechanics.
Alexei M. Fridman, Nikolai N. Gorkavyi
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Principles of Celestial Mechanics [PDF]
Physics Bulletin, 1971 P M Fitzpatrick London: Academic Press 1970 pp xvii + 405 price £5.95 This book, apart from the final chapter, is concerned with the positions and motions of celestial bodies, described by the use of the concept of the osculating ellipse, and perturbations of that ellipse.
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Applications of computers to celestial mechanics
Celestial Mechanics, 1988The development of digital computers induced major new developments in Celestial Mechanics. At present, one can hardly mention a project in Celestial Mechanics that does not use computers as the principal tool. One can distinguish many different manners of using computers in Celestial Mechanics.
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Vistas in Astronomy, 1955
Abstract A brief review of the present status of celestial mechanics, in relation both to the need for increased accuracy and to the new methods made possible by the use of electronic digital computing machines.
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Abstract A brief review of the present status of celestial mechanics, in relation both to the need for increased accuracy and to the new methods made possible by the use of electronic digital computing machines.
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A treatise of celestial mechanics
Handschriftles Exlibris: "Montagu Lyon Phillips" 990021930460205503_0001 Exemplar der ETH ...openaire +2 more sources
2014
Isaac Newton’s notable success in providing a theoretical explanation for the motion of planets around the sun was followed quickly by his realization that the gravitational problem involving three bodies was immensely more difficult than the two-body problem.
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Isaac Newton’s notable success in providing a theoretical explanation for the motion of planets around the sun was followed quickly by his realization that the gravitational problem involving three bodies was immensely more difficult than the two-body problem.
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KAM Theory and Celestial Mechanics
2006Kolmogorov–Arnold–Moser (KAM) theory deals with the construction of quasi–periodic trajectories in nearly–integrable Hamiltonian systems and it was motivated by classical problems in Celestial Mechanics such as the n– body problem. Notwithstanding the formidable bulk of results, ideas and techniques produced by the founders of the modern theory of ...
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Introduction to the Maths and Physics of the Solar System, 2020
L. Piccirillo
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L. Piccirillo
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Celestial diamonds: conformal multiplets in celestial CFT
Journal of High Energy Physics, 2021Andrea Puhm, Emilio Trevisani
exaly