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Interpolation and Comparison Methods in the Mean Field Spin Glass Model Read chapter Read first chapter

2014 | OriginalPaper | Chapter

10. Challenges in Geometric Numerical Integration

Author : Ernst Hairer

Published in: Trends in Contemporary Mathematics

Publisher: Springer International Publishing

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Abstract

Geometric Numerical Integration is a subfield of the numerical treatment of differential equations. It deals with the design and analysis of algorithms that preserve the structure of the analytic flow. The present review discusses numerical integrators, which nearly preserve the energy of Hamiltonian systems over long times. Backward error analysis gives important insight in the situation, where the product of the step size with the highest frequency is small. Modulated Fourier expansions permit to treat nonlinearly perturbed fast oscillators. A big challenge that remains is to get insight into the long-time behavior of numerical integrators for fully nonlinear oscillatory problems, where the product of the step size with the highest frequency is not small.

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previous chapter Progress in the Theory of Nonlinear Diffusion: Asymptotics via Entropy Methods
next chapter Integral Hodge Classes, Decompositions of the Diagonal, and Rationality Questions
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Metadata
Title
Challenges in Geometric Numerical Integration
Author
Ernst Hairer
Copyright Year
2014
Book
Trends in Contemporary Mathematics

Print ISBN: 978-3-319-05253-3

Electronic ISBN: 978-3-319-05254-0

Copyright Year: 2014

DOI
https://doi.org/10.1007/978-3-319-05254-0_10

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