Screen LibraryPerihelia reduction and global Kolmogorov tori in the planetary problem /
"We prove the existence of an almost full measure set of (3n - 2)-dimensional quasi-periodic motions in the planetary problem with (1 + n) masses, with eccentricities arbitrarily close to the Levi-Civita limiting value and relatively high inclinations. This extends previous results, where small...
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| Main Authors: | |
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| Published: |
AMS, American Mathematical Society,
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| Publisher Address: | Providence, RI : |
| Publication Dates: | [2018] |
| Literature type: | Book |
| Language: | English |
| Series: |
Memoirs of the American Mathematical Society,
number 1218 |
| Subjects: | |
| Summary: |
"We prove the existence of an almost full measure set of (3n - 2)-dimensional quasi-periodic motions in the planetary problem with (1 + n) masses, with eccentricities arbitrarily close to the Levi-Civita limiting value and relatively high inclinations. This extends previous results, where smallness of eccentricities and inclinations was assumed. The question had been previously considered by V. I. Arnold (1963) in the 60s, for the particular case of the planar three-body problem, where, due to the limited number of degrees of freedom, it was enough to use the invariance of the system by the |
| Item Description: | "September 2018. Volume 255. Number 1218 (first of 7 numbers)." |
| Carrier Form: | v, 92 pages ; 26 cm. |
| Bibliography: | Includes bibliographical references (pages 91-92). |
| ISBN: |
9781470441029 1470441020 |
| Index Number: | QB351 |
| CLC: | P13 |
| Call Number: | P13/P661 |
| Contents: | Background and results -- Kepler maps and the Perihelia reduction -- The P-map and the planetary problem -- Global Kolmogorov tori in the planetary problem -- Proofs. |