Multi-step methods are essentially one-step methods |
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| Authors: | Urs Kirchgraber |
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| Affiliation: | (1) Department of Mathematics, Swiss Federal Institute of Technology (ETH), Zürich, Switzerland;(2) Wiskundig Seminarium, Virije Universiteit, Amsterdam, The Netherlands |
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| Abstract: | Summary In this note the geometry of multi-step methods is studied using invariant manifold theory for maps, as familiar from dynamical systems theory. This permits to associate a one-step method to each multi-step method to which the former is not only equivalent asymptotically, but equal in each step if the one-step method is used to produce the initial data of the multi-step method. |
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| Keywords: | AMS(MOS): 65LO5 CR: G1.7 |
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