Global applicability of the symplectic integrator method of hamiltonian systems

## Abstract In this paper we study a generalized symplectic fixed‐point problem, first considered by J. Moser in [20], from the point of view of some relatively recently discovered symplectic rigidity phenomena. This problem has interesting applications concerning global perturbations of Hamiltonia

In this paper, for 4-fold and 8-fold compositions of symplectic schemes, the authors obtain the formulae for calculation of the first three terms of the power series in stepsize of their formal energies. Utilizing the special properties of revertible schemes, the authors construct higher order rever

A IIEW ntethotl,for the cottsttwtiott qf iutegrable Hamiltortiatt system is proposed. For (I given Poisson mau~foki, I/W present proper comtructs new Poissott brackets 011 it by rnakittg WC qf the Dirtrc-Poissotr structrrre['J, m7d obtaitrs jirr/lrer 17cw integrrtble Hutuiltor7iatt s.vstems. Tl7c~ c

In this paper the numerical integration of integrable Hamiltonian systems is considered. Symplectic one-step methods are used. The discrete system is shown to be integrable up to a remainder which is exponentially small with respect to the step size of the one-step method. As a consequence it is sho