Abstract
The Hamiltonian formulation of N=3 systems is considered in general. The most general solution of the Jacobi equation in R3 is proposed. The form of the solution is shown to be valid also in the neighborhood of some irregular points. Compatible Poisson structures and corresponding bi-Hamiltonian systems are also discussed. Hamiltonian structures, the classification of irregular points and the corresponding reduced first order differential equations of several examples are given.
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