Collective symplectic integrators
Numerical Analysis
2014-06-02 v1
Abstract
We construct symplectic integrators for Lie-Poisson systems. The integrators are standard symplectic (partitioned) Runge--Kutta methods. Their phase space is a symplectic vector space with a Hamiltonian action with momentum map whose range is the target Lie--Poisson manifold, and their Hamiltonian is collective, that is, it is the target Hamiltonian pulled back by . The method yields, for example, a symplectic midpoint rule expressed in 4 variables for arbitrary Hamiltonians on . The method specializes in the case that a sufficiently large symmetry group acts on the fibres of , and generalizes to the case that the vector space carries a bifoliation. Examples involving many classical groups are presented.
Cite
@article{arxiv.1308.6620,
title = {Collective symplectic integrators},
author = {Robert I McLachlan and Klas Modin and Olivier Verdier},
journal= {arXiv preprint arXiv:1308.6620},
year = {2014}
}