Condon, Marissa, Iserles, Arieh and Norsett, S.P. (2014) Differential equations with general highly oscillatory forcing terms. Proceedings of the Royal Society. A, Mathematical, physical, and engineering sciences , 470 (2161). ISSN 1471-2946
Abstract
The concern of this paper is in expanding and computing initial-value problems of the form y' = f(y) + hw(t) where the function hw oscillates rapidly for w >> 1. Asymptotic expansions for such equations are well understood in the case of modulated Fourier oscillators hw(t) = Σm am(t)eim!t and they can be used as an organising principle for very accurate and aordable numerical solvers. However, there is no similar theory for more general oscillators and there are
sound reasons to believe that approximations of this kind are unsuitable in that setting. We follow in this paper an alternative route, demonstrating that, for a much more general family of oscillators, e.g. linear combinations of functions of the form ei!gk(t), it is possible to expand y(t) in a different manner. Each rth term in the expansion is for some & > 0 and it can be represented as an r-dimensional highly oscillatory integral. Since computation of multivariate highly oscillatory integrals is fairly well understood, this provides a powerful method for an effective discretisation of a numerical solution for a large family of highly oscillatory ordinary differential equations.
Metadata
Item Type: | Article (Published) |
---|---|
Refereed: | Yes |
Uncontrolled Keywords: | High Oscillations |
Subjects: | Mathematics > Differential equations Mathematics > Numerical analysis Engineering > Electronic engineering |
DCU Faculties and Centres: | DCU Faculties and Schools > Faculty of Engineering and Computing > School of Electronic Engineering |
Publisher: | The Royal Society |
Official URL: | http://dx.doi.oirg/10.1098/rspa.2013.0490 |
Copyright Information: | © 2013 The Royal Society |
Use License: | This item is licensed under a Creative Commons Attribution-NonCommercial-Share Alike 3.0 License. View License |
ID Code: | 19819 |
Deposited On: | 14 Feb 2014 11:01 by Fran Callaghan . Last Modified 25 Nov 2016 15:53 |
Documents
Full text available as:
Preview |
PDF
- Requires a PDF viewer such as GSview, Xpdf or Adobe Acrobat Reader
1MB |
Downloads
Downloads
Downloads per month over past year
Archive Staff Only: edit this record