Abstract
In this paper the issue of filtering and smoothing in continuous discrete time is studied when the state variable evolves in some submanifold of Euclidean space, which may not have the usual Lebesgue measure. Formal expressions for prediction and smoothing problems are reviewed, which agree with the classical results except that the formal adjoint of the generator is different in general. These results are used to generalise the projection approach to filtering and smoothing to the case when the state variable evolves in some submanifold that lacks a Lebesgue measure. The approach is used to develop projection filters and smoothers based on the von Mises–Fisher distribution, which are shown to be outperform Gaussian estimators both in terms of estimation accuracy and computational speed in simulation experiments involving the tracking of a gravity vector.
| Original language | English |
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| Title of host publication | 2022 25th International Conference on Information Fusion (FUSION) |
| Publisher | International Society of Information Fusion |
| Number of pages | 8 |
| ISBN (Electronic) | 978-1-7377497-2-1 |
| ISBN (Print) | 978-1-6654-8941-6 |
| DOIs | |
| Publication status | Published - 2022 |
| MoE publication type | A4 Conference publication |
| Event | International Conference on Information Fusion - Linkoping, Sweden Duration: 4 Jul 2022 → 7 Jul 2022 Conference number: 25 |
Conference
| Conference | International Conference on Information Fusion |
|---|---|
| Abbreviated title | FUSION |
| Country/Territory | Sweden |
| City | Linkoping |
| Period | 04/07/2022 → 07/07/2022 |
Keywords
- Manifolds
- Geometry
- Smoothing methods
- Information filters
- Extraterrestrial measurements
- Time measurement
- Generators
- Continuous Discrete Filtering and Smoothing
- Directional Statistics
- Nonlinear Filtering and Smoothing
- Rie-mann manifolds