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Convergence of rational multistep methods of of Adams-Padé type

Abstract

Rational generalizations of multistep schemes, where the linear stiff part of a given problem is treated by an A-stable rational approximation, have been proposed by several authors, but a reasonable convergence analysis for stiff problems has not been provided so far. In this paper we directly relate this approach to exponential multistep methods, a subclass of the increasingly popular class of exponential integrators. This natural, but new interpretation of rational multistep methods enables us to prove a convergence result of the same quality as for the exponential version. In particular, we consider schemes of rational Adams type based on A-acceptable Padé approximations to the matrix exponential. A numerical example is also provided.

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Category:
Articles
Type:
artykuł w czasopiśmie wyróżnionym w JCR
Published in:
BIT NUMERICAL MATHEMATICS no. 52, edition 1, pages 3 - 20,
ISSN: 0006-3835
Language:
English
Publication year:
2012
Bibliographic description:
Łapińska M., Auzinger W., Łapińska M.: Convergence of rational multistep methods of of Adams-Padé type// BIT NUMERICAL MATHEMATICS. -Vol. 52, iss. 1 (2012), s.3-20
Verified by:
Gdańsk University of Technology

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