Geometric Integrators for Differential Equations with Highly Oscillatory Solutions
The idea of structure-preserving algorithms appeared in the 1980's. The new paradigm brought many innovative changes. The new paradigm wanted to identify the long-time behaviour of the solutions or the existence of conservation laws or some other qualitative feature of the dynamics. Another area that has kept growing in importance within Geometric Numerical Integration is the study of highly-oscillatory problems: problems where the solutions are periodic or quasiperiodic and have to be studied in time intervals that include an extremely large number of periods. As is known, these equations cannot be solved efficiently using conventional metho…
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Produktdetails
Weitere Autoren: Wang, Bin
- ISBN: 978-981-1601-46-0
- EAN: 9789811601460
- Produktnummer: 35692224
- Verlag: Springer Nature
- Sprache: Englisch
- Erscheinungsjahr: 2021
- Auflage: 2021
Über den Autor
Xinyuan Wu, a Professor in Department of Mathematics, Nanjing University. His research interests focus on geometric algorithms for differential equations, numerical methods for stiff problems and numerical methods for algebraic systems. ¿In 2017, Wu was awarded with the highest distinction of Honorary Fellowship from European Society of Computational Methods in Science and Engineering for the outstanding contribution in the fields of Numerical Analysis and Applied Mathematics.Bin Wang, a Professor in Department of Mathematics and Statistics, Xi'an Jiaotong University. His research interests focus on various structure-preserving algorithms as well as numerical methods for differential equation, especially the numerical computation and analysis of Hamilton ordinary differential equation and partial differential equation. Wang was awarded by Alexander von Humboldt Foundation (2017-1019).
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