Abstract
We consider linear multi-step methods for stochastic ordinary differential equations and study their convergence properties for problems with small noise or additive noise. We present schemes where the drift part is approximated by well-known methods for deterministic ordinary differential equations. In previous work, we considered Maruyama-type schemes, where only the increments of the driving Wiener process are used to discretize the diffusion part. Here, we suggest the improvement of the discretization of the diffusion part by also taking into account mixed classical-stochastic integrals. We show that the relation of the applied step sizes to the smallness of the noise is essential in deciding whether the new methods are worthwhile. Simulation results illustrate the theoretical findings.
| Original language | English |
|---|---|
| Pages (from-to) | 912-922 |
| Number of pages | 11 |
| Journal | Journal of Computational and Applied Mathematics |
| Volume | 205 |
| Issue number | 2 |
| DOIs | |
| Publication status | Published - 2007 |
Fields of science
- 101002 Analysis
- 101029 Mathematical statistics
- 101014 Numerical mathematics
- 101024 Probability theory
- 101015 Operations research
- 101026 Time series analysis
- 101019 Stochastics
- 107 Other Natural Sciences
- 211 Other Technical Sciences
JKU Focus areas
- Computation in Informatics and Mathematics
- Engineering and Natural Sciences (in general)