On the mathematical theory of ensemble (linear-Gaussian) Kalman–Bucy filtering
| hal.structure.identifier | University of Technology Sydney [UTS] | |
| dc.contributor.author | BISHOP, Adrian | |
| hal.structure.identifier | Méthodes avancées d’apprentissage statistique et de contrôle [ASTRAL] | |
| dc.contributor.author | DEL MORAL, Pierre | |
| dc.date.accessioned | 2024-04-04T02:31:17Z | |
| dc.date.available | 2024-04-04T02:31:17Z | |
| dc.date.issued | 2023-05-19 | |
| dc.identifier.issn | 0932-4194 | |
| dc.identifier.uri | https://oskar-bordeaux.fr/handle/20.500.12278/190295 | |
| dc.description.abstractEn | The purpose of this review is to present a comprehensive overview of the theory of ensemble Kalman–Bucy filtering for continuous-time, linear-Gaussian signal and observation models. We present a system of equations that describe the flow of individual particles and the flow of the sample covariance and the sample mean in continuous-time ensemble filtering. We consider these equations and their characteristics in a number of popular ensemble Kalman filtering variants. Given these equations, we study their asymptotic convergence to the optimal Bayesian filter. We also study in detail some non-asymptotic time-uniform fluctuation, stability, and contraction results on the sample covariance and sample mean (or sample error track). We focus on testable signal/observation model conditions, and we accommodate fully unstable (latent) signal models. We discuss the relevance and importance of these results in characterising the filter’s behaviour, e.g. it is signal tracking performance, and we contrast these results with those in classical studies of stability in Kalman–Bucy filtering. We also provide a novel (and negative) result proving that the bootstrap particle filter cannot track even the most basic unstable latent signal, in contrast with the ensemble Kalman filter (and the optimal filter). We provide intuition for how the main results extend to nonlinear signal models and comment on their consequence on some typical filter behaviours seen in practice, e.g. catastrophic divergence. | |
| dc.language.iso | en | |
| dc.publisher | Springer Verlag | |
| dc.rights.uri | http://creativecommons.org/licenses/by/ | |
| dc.title.en | On the mathematical theory of ensemble (linear-Gaussian) Kalman–Bucy filtering | |
| dc.type | Article de revue | |
| dc.identifier.doi | 10.1007/s00498-023-00357-2 | |
| dc.subject.hal | Mathématiques [math] | |
| dc.identifier.arxiv | 2006.08843 | |
| bordeaux.journal | Mathematics of Control, Signals, and Systems | |
| bordeaux.page | 835-903 | |
| bordeaux.volume | 35 | |
| bordeaux.hal.laboratories | Institut de Mathématiques de Bordeaux (IMB) - UMR 5251 | * |
| bordeaux.issue | 4 | |
| bordeaux.institution | Université de Bordeaux | |
| bordeaux.institution | Bordeaux INP | |
| bordeaux.institution | CNRS | |
| bordeaux.peerReviewed | oui | |
| hal.identifier | hal-04395659 | |
| hal.version | 1 | |
| hal.popular | non | |
| hal.audience | Internationale | |
| hal.origin.link | https://hal.archives-ouvertes.fr//hal-04395659v1 | |
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