Заглавие | Geometry and solutions of the planar problem of two centers of gravitation |
Вид публикация | Journal Article |
Година на публикуване | 2009 |
Автори | Lashkov A, Zhivkov A |
Списание | Annuaire de l’Université de Sofia “St. Kliment Ohridski”. Faculté de Mathématiques et Informatique |
Том | 99 |
ключови думи | general solution, integrability, topological classification |
Резюме | The planar problem of two centers of gravitation was studied by Euler, who found a second ``momentum--like'' integral and thus the problem turned out to be completely integrable. We present some effective solutions of the motion of the free particle under the influence of the two centers. These solutions are expressed by elliptic theta functions. We also classify all types of such motions from topological point of view. There exist exactly 16 types of motions. Ten of them are unbounded and six are bounded. |
2000 MSC | 37J35 |
Прикачен файл | Размер |
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99-129-136.pdf | 549.51 KB |