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SYMPLECTIC INTERPOLATION.

A. U. LUCCIOW. W. MACKAY

出版	Brookhaven National Laboratory, 2006
URL	http://books.google.com.hk/books?id=kxlPAQAACAAJ&hl=&source=gbs_api

註釋

It is important to have symplectic maps for the various electromagnetic elements in an accelerator ring. For some tracking problems we must consider elements which evolve during a ramp. Rather than performing a computationally intensive numerical integration for every turn, it should be possible to integrate the trajectory for a few sets of parameters, and then interpolate the transport map as a function of one or more parameters, such as energy. We present two methods for interpolation of symplectic matrices as a function of parameters: one method is based on the calculation of a representation in terms of a basis of group generators [2, 3] and the other is based on the related but simpler symplectification method of Healy [1]. Both algorithms guarantee a symplectic result.