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Título
CMMSE: Analysis of order reduction when Lawson methods integrate nonlinear initial boundary value problems
Publicado en
Mathematical Methods in the Applied Sciences. 2022, V. 45, n. 17, p. 11319-11330
Editorial
Wiley
Fecha de publicación
2022-06
ISSN
0170-4214
DOI
10.1002/mma.8451
Resumo
In this paper a thorough analysis is carried out of the type of order reduction
that Lawson methods exhibit when used to integrate nonlinear initial boundary
value problems. In particular, we focus on nonlinear reaction-diffusion problems, and therefore, this study is important in a large number of practical
applications modeled by this type of nonlinear equations. A theoretical study of
the local and global error of the total discretization of the problem is carried out,
taking into account both, the error coming from the space discretization and
that due to the integration in time. These results are also corroborated by the
numerical experiments performed in this paper.
Palabras clave
Exponential methods
Lawson methods
Nonlinear reaction-diffusion problems
Order reduction
Materia
Matemáticas
Mathematics
Versión del editor
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