Solvable Structures for Hamiltonian Systems

Abstract

In this paper, we investigate solvable structures associated to Hamiltonian equations. For a completely integrable Hamiltonian system with n degrees of freedom, we construct a canonical solvable structure consisting of 2n Hamiltonian vector fields. We derive explicit expressions for the corresponding Pfaffian forms, whose integration provides solutions to the Hamiltonian equations. We show that the upper n forms give the action varibles, while the lower n forms yield the angle variables of the system. This offers a novel interpretation of the Arnold--Liouville theorem in terms of solvable structures. We ilustrate the theory by deriving explicit solutions and action--angle variables for n harmonic oscillators and the Calogero--Moser system.

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