An integrable Henon-Heiles system on the sphere and the hyperbolic plane

Abstract

We construct a constant curvature analogue on the two-dimensional sphere S2 and the hyperbolic space H2 of the integrable H\'enon-Heiles Hamiltonian H given by H=12(p12+p22)+ ( q12+ 4 q22) +α ( q12q2+2 q23) , where and α are real constants. The curved integrable Hamiltonian H so obtained depends on a parameter which is just the curvature of the underlying space, and is such that the Euclidean H\'enon-Heiles system H is smoothly obtained in the zero-curvature limit 0. On the other hand, the Hamiltonian H that we propose can be regarded as an integrable perturbation of a known curved integrable 1:2 anisotropic oscillator. We stress that in order to obtain the curved H\'enon-Heiles Hamiltonian H, the preservation of the full integrability structure of the flat Hamiltonian H under the deformation generated by the curvature will be imposed. In particular, the existence of a curved analogue of the full Ramani-Dorizzi-Grammaticos (RDG) series Vn of integrable polynomial potentials, in which the flat H\'enon-Heiles potential can be embedded, will be essential in our construction. Such infinite family of curved RDG potentials V, n on S2 and H2 will be also explicitly presented.