Bayesian filtering with unknown sensor measurement losses
This paper studies the state estimation problem of a stochastic nonlinear system with unknown sensor measurement losses. If the estimator knows the sensor measurement losses of a linear Gaussian system, the minimum variance estimate is easily computed by the celebrated intermittent Kalman filter (IK...
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sg-ntu-dr.10356-1453232020-12-17T05:14:33Z Bayesian filtering with unknown sensor measurement losses Zhang, Jiaqi You, Keyou Xie, Lihua School of Electrical and Electronic Engineering Engineering::Electrical and electronic engineering Intermittent Kalman filter (IKF) Networked Estimation This paper studies the state estimation problem of a stochastic nonlinear system with unknown sensor measurement losses. If the estimator knows the sensor measurement losses of a linear Gaussian system, the minimum variance estimate is easily computed by the celebrated intermittent Kalman filter (IKF). However, this will no longer be the case when the measurement losses are unknown and/or the system is nonlinear or non-Gaussian. By exploiting the binary property of the measurement loss process and the IKF, we design three suboptimal filters for the state estimation, that is, BKF-I, BKF-II, and RBPF. The BKF-I is based on the MAP estimator of the measurement loss process and the BKF-II is derived by estimating the conditional loss probability. The RBPF is a particle filter-based algorithm that marginalizes out the loss process to increase the efficiency of particles. All of the proposed filters can be easily implemented in recursive forms. Finally, a linear system, a target tracking system, and a quadrotor's path control problem are included to illustrate their effectiveness, and show the tradeoff between computational complexity and estimation accuracy of the proposed filters. Ministry of Education (MOE) Accepted version This work was supported in partby the National Key Research and Development Program of China un-der Grant 2017YFC0805310, in part by the National Natural ScienceFoundation of China under Grant 61722308 and Grant 41427806, andin part by the Ministry of Education of Singapore under Grant MoE Tier RG78/15. 2020-12-17T05:14:32Z 2020-12-17T05:14:32Z 2018 Journal Article Zhang, J., You, K., & Xie, L. (2019). Bayesian Filtering With Unknown Sensor Measurement Losses. IEEE Transactions on Control of Network Systems, 6(1), 163–175. doi:10.1109/tcns.2018.2802872 2325-5870 https://hdl.handle.net/10356/145323 10.1109/TCNS.2018.2802872 1 6 163 175 en RG78/15 IEEE Transactions on Control of Network Systems © 2018 IEEE. Personal use of this material is permitted. Permission from IEEE must be obtained for all other uses, in any current or future media, including reprinting/republishing this material for advertising or promotional purposes, creating new collective works, for resale or redistribution to servers or lists, or reuse of any copyrighted component of this work in other works. The published version is available at: https://doi.org/10.1109/TCNS.2018.2802872. application/pdf |
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Engineering::Electrical and electronic engineering Intermittent Kalman filter (IKF) Networked Estimation |
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Engineering::Electrical and electronic engineering Intermittent Kalman filter (IKF) Networked Estimation Zhang, Jiaqi You, Keyou Xie, Lihua Bayesian filtering with unknown sensor measurement losses |
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This paper studies the state estimation problem of a stochastic nonlinear system with unknown sensor measurement losses. If the estimator knows the sensor measurement losses of a linear Gaussian system, the minimum variance estimate is easily computed by the celebrated intermittent Kalman filter (IKF). However, this will no longer be the case when the measurement losses are unknown and/or the system is nonlinear or non-Gaussian. By exploiting the binary property of the measurement loss process and the IKF, we design three suboptimal filters for the state estimation, that is, BKF-I, BKF-II, and RBPF. The BKF-I is based on the MAP estimator of the measurement loss process and the BKF-II is derived by estimating the conditional loss probability. The RBPF is a particle filter-based algorithm that marginalizes out the loss process to increase the efficiency of particles. All of the proposed filters can be easily implemented in recursive forms. Finally, a linear system, a target tracking system, and a quadrotor's path control problem are included to illustrate their effectiveness, and show the tradeoff between computational complexity and estimation accuracy of the proposed filters. |
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School of Electrical and Electronic Engineering |
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School of Electrical and Electronic Engineering Zhang, Jiaqi You, Keyou Xie, Lihua |
| format |
Article |
| author |
Zhang, Jiaqi You, Keyou Xie, Lihua |
| author_sort |
Zhang, Jiaqi |
| title |
Bayesian filtering with unknown sensor measurement losses |
| title_short |
Bayesian filtering with unknown sensor measurement losses |
| title_full |
Bayesian filtering with unknown sensor measurement losses |
| title_fullStr |
Bayesian filtering with unknown sensor measurement losses |
| title_full_unstemmed |
Bayesian filtering with unknown sensor measurement losses |
| title_sort |
bayesian filtering with unknown sensor measurement losses |
| publishDate |
2020 |
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https://hdl.handle.net/10356/145323 |
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