Geometric integration via multi-space
2004, Volume 9, Number 3, pp. 213-226
Author(s):
Kim P., Olver P. J.
We outline a general construction of symmetry-preserving numerical schemes for ordinary differential equations. The method of invariantization is based on the equivariant moving frame theory applied to prolonged symmetry group actions on multi-space, which has been proposed as the proper geometric setting for numerical analysis. We explain how to invariantize standard numerical integrators such as the Euler and Runge–Kutta schemes; in favorable situations, the resulting symmetry-preserving geometric integrators offer significant advantages.
Citation:
Kim P., Olver P. J., Geometric integration via multi-space, Regular and Chaotic Dynamics,
2004, Volume 9, Number 3,
pp. 213-226
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