Variational and linearly-implicit integrators, with applications
Numerical Analysis
2014-12-08 v4 Computational Physics
Abstract
We show that symplectic and linearly-implicit integrators proposed by [Zhang and Skeel, 1997] are variational linearizations of Newmark methods. When used in conjunction with penalty methods (i.e., methods that replace constraints by stiff potentials), these integrators permit coarse time-stepping of holonomically constrained mechanical systems and bypass the resolution of nonlinear systems. Although penalty methods are widely employed, an explicit link to Lagrange multiplier approaches appears to be lacking; such a link is now provided (in the context of two-scale flow convergence [Tao, Owhadi and Marsden, 2010]). The variational formulation also allows efficient simulations of mechanical systems on Lie groups.
Cite
@article{arxiv.1103.4645,
title = {Variational and linearly-implicit integrators, with applications},
author = {Molei Tao and Houman Owhadi},
journal= {arXiv preprint arXiv:1103.4645},
year = {2014}
}