We study the Kowalevski expansions near singularities of the swinging
Atwood's machine. We show that there is a infinite number of mass ratios $M/m$
where such expansions exist with the maximal number of arbitrary constants.
These expansions are of the so--called weak Painlev\'e type. However, in view
of these expansions, it is not possible to distinguish between integrable and
non integrable cases.Comment: 30 page

Adler M

Casasayas J

M Capdequi Peyranère

M Talon

O Babelon

Yosida H

English

arXiv

Crossref

Kowalevski's analysis of the swinging Atwood's machine

International audienceWe study the Kowalevski expansions near singularities of the swinging Atwood's machine. We show that there is a infinite number of mass ratios $M/m$ where such expansions exist with the maximal number of arbitrary constants. These expansions are of the so--called weak Painlevé type. However, in view of these expansions, it is not possible to distinguish between integrable and non integrable cases

Babelon, Olivier

Talon, Michel

Capdequi-Peyranere, Michel

Hal-Diderot

Kowalevski's Analysis of the Swinging Atwood's Machine.

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https://hal.archives-ouvertes.fr/hal-00420854/file/atwood.pdf

Kowalevski's analysis of the swinging Atwood's machine

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Hal-Diderot

HAL-IN2P3

HAL: Hyper Article en Ligne

Portail HAL Um (Université de Montpellier)