Integrable Variational Equations of Non-integrable Systems

2012, Volume 17, Numbers 3-4, pp. 337-358

Author(s): Maciejewski A. J., Przybylska M.

Paper is devoted to the solvability analysis of variational equations obtained by linearization of the Euler–Poisson equations for the symmetric rigid body with a fixed point on the equatorial plain. In this case Euler–Poisson equations have two pendulum like particular solutions. Symmetric heavy top is integrable only in four famous cases. In this paper is shown that a family of cases can be distinguished such that Euler–Poisson equations are not integrable but variational equations along particular solutions are solvable. The connection of this result with analysis made in XIX century by R. Liouville is also discussed.

Keywords: rigid body, Euler–Poisson equations, solvability in special functions, differential Galois group

Citation: Maciejewski A. J., Przybylska M., Integrable Variational Equations of Non-integrable Systems, Regular and Chaotic Dynamics, 2012, Volume 17, Numbers 3-4, pp. 337-358

DOI: 10.1134/S1560354712030094

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