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Bibliographic Details
Main Authors: Kulikova, Maria V., Kulikov, Gennady Yu.
Format: Preprint
Published: 2024
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Online Access:https://arxiv.org/abs/2402.11555
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author Kulikova, Maria V.
Kulikov, Gennady Yu.
author_facet Kulikova, Maria V.
Kulikov, Gennady Yu.
contents In this paper, a singular value decomposition (SVD) approach is developed for implementing the cubature Kalman filter. The discussed estimator is one of the most popular and widely used method for solving nonlinear Bayesian filtering problem in practice. To improve its numerical stability (with respect to roundoff errors) and practical reliability of computations, the SVD-based methodology recently proposed for the classical Kalman filter is generalized on the nonlinear filtering problem. More precisely, we suggest the SVD-based solution for the continuous-discrete cubature Kalman filter and design two estimators: (i) the filter based on the traditionally used Euler-Maruyama discretization scheme; (ii) the estimator based on advanced Itô-Taylor expansion for discretizing the underlying stochastic differential equations. Both estimators are formulated in terms of SVD factors of the filter error covariance matrix and belong to the class of stable factored-form (square-root) algorithms. The new methods are tested on a radar tracking problem.
format Preprint
id arxiv_https___arxiv_org_abs_2402_11555
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle SVD-based factored-form Cubature Kalman Filtering for continuous-time stochastic systems with discrete measurements
Kulikova, Maria V.
Kulikov, Gennady Yu.
Optimization and Control
In this paper, a singular value decomposition (SVD) approach is developed for implementing the cubature Kalman filter. The discussed estimator is one of the most popular and widely used method for solving nonlinear Bayesian filtering problem in practice. To improve its numerical stability (with respect to roundoff errors) and practical reliability of computations, the SVD-based methodology recently proposed for the classical Kalman filter is generalized on the nonlinear filtering problem. More precisely, we suggest the SVD-based solution for the continuous-discrete cubature Kalman filter and design two estimators: (i) the filter based on the traditionally used Euler-Maruyama discretization scheme; (ii) the estimator based on advanced Itô-Taylor expansion for discretizing the underlying stochastic differential equations. Both estimators are formulated in terms of SVD factors of the filter error covariance matrix and belong to the class of stable factored-form (square-root) algorithms. The new methods are tested on a radar tracking problem.
title SVD-based factored-form Cubature Kalman Filtering for continuous-time stochastic systems with discrete measurements
topic Optimization and Control
url https://arxiv.org/abs/2402.11555