Non-integrability of the generalised spring-pendulum problem
arXiv:math-ph/0308011 · doi:10.1023/B:CELE.0000034513.45950.86
Abstract
We investigate a generalisation of the three dimensional spring-pendulum system. The problem depends on two real parameters $(k,a)$, where $k$ is the Young modulus of the spring and $a$ describes the nonlinearity of elastic forces. We show that this system is not integrable when $k\neq -a$. We carefully investigated the case $k= -a$ when the necessary condition for integrability given by the Morales-Ramis theory is satisfied. We discuss an application of the higher order variational equations for proving the non-integrability in this case.
20 pages, 1 figure