ELEMENTARY CONSTRUCTION OF HIGHER-ORDER LIE-POISSON INTEGRATORS

Higher order Lie-Poisson integrators generated from first order ones are described and tested on an Euler equation on su (4). The technique is based upon the method of Suzuki and Yoshida combined with an observation of Scovel. This technique works for any type of autonomous ordinary differential equation, not just Hamiltonian systems, and is especially useful in generating higher order methods in an elementary manner. In particular, up to now, only first order Lie-Poisson integrators were available for Lie algebras that were not regular quadratic. This technique should also be useful in the development of higher order momentum preserving symplectic integrators such as in Patrick's [23] study of two axially symmetric coupled rigid bodies.