Non-integrability of a three dimensional generalized H\'enon-Heiles system
Abstract
In recent paper Fakkousy et al. show that the 3D H\'enon-Heiles system with Hamiltonian H = 12 (p1 2 + p2 2 + p3 2) +12 (A q1 2 + C q2 2 + B q3 2) + (α q1 2 + γ q2 2)q3 + β3q3 3 is integrable in sense of Liouville when α = γ, αβ = 1, A = B = C; or α = γ, αβ = 16, A = C, B-arbitrary; or α = γ, αβ = 116, A = C, AB = 116 (and of course, when α=γ=0, in which case the Hamiltonian is separable). It is known that the second case remains integrable for A, C, B arbitrary. Using Morales-Ramis theory, we prove that there are no other cases of integrability for this system.
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