Semi-global symplectic invariant of the champagne bottle

Abstract

We study a two degrees of freedom Hamiltonian system describing the motion of a particle in a potential field of the form of S1 symmetric double well, namely V = - (x12 + x22) + (x12 + x22)2, known also as a champagne bottle potential. This system is completely integrable. The champagne bottle is the simplest member of a class of integrable systems that have no global action variables due to a non-trivial monodromy, Bates (1991). Beyond that, the geometric and dynamical properties of the system near the equilibrium are of primary interest. We calculate the Birkhoff normal form and the nontrivial action near the focus-focus singularity and obtain the semi-global symplectic invariant near focus-focus point, which is introduced by Vũ Ngoc (2003). Examples of such calculations are still few. We compare our result with the semi-global symplectic invariant of the spherical pendulum, calculated by Dullin (2013).