Quasi-integrability in a class of systems generalizing the problem of two fixed centers
Abstract
The problem of two fixed centers is a classical integrable problem, stated and integrated by Euler in 1760. The integrability is due to the unexpected first integral G. Some straightforward generalizations of the problem still have the generalization of G as a first integral, but do not possess the energy integral. We present some numerical integrations suggesting that in the domain of bounded orbits the behavior of these a priori non hamiltonian systems is very similar to the behavior of usual quasi-integrable systems.
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