Posterior Linearization Filter: Principles and Implementation Using Sigma Points

García-Fernández, Ángel F.; Svensson, Lennart; Morelande, Mark R.; Särkkä, Simo

doi:10.1109/tsp.2015.2454485

Cited by 130 publications

(169 citation statements)

References 20 publications

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“…The IEKF/IEKS iteratively linearise the system by Taylor series around the current mean of the approximate filtering/smoothing distribution [22], [23]. On the other hand, IPLF/IPLS iteratively linearise the system using SLR with respect to the current approximate filtering/smoothing density [25], [26]. The RTS smoother is given in Alg.…”

Section: A Prior Workmentioning

confidence: 99%

“…1. The filter is presented in Section IV-A, where emphasis is on the update as it is the only stage of the algorithm that utilises iterations [25]. The iterative smoother is presented in Section IV-B and a convergence theorem is provided in Section IV-C.…”

Section: Iterative Filters and Smoothers Based On Conditional Mommentioning

confidence: 99%

“…The key insight of [25] was that posterior moment approximations can be improved by re-computing the C t , d t and Σ Rt using the current approximate posterior together with SLR, while keeping the original predictive moments in the Update step of Alg. 1.…”

Section: A Filtermentioning

confidence: 99%

“…In a similar manner to [25], [26] a local convergence analysis can be carried out, resulting in Thm. 2.…”

Section: Convergence Analysismentioning

confidence: 99%

“…This approach was recently extended on the basis that it ought to be better to perform the SLR with respect to the posterior distribution rather than the prior distribution. While this is intractable, it leads to a scheme where the SLR is iteratively computed using the current best approximation to the posterior, why it is called iterated posterior linearisation filtering/smoothing (IPLF/IPLS) [25], [26]. However, these methods assume additive Gaussian noise.…”

Section: Introductionmentioning

confidence: 99%

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Iterative Filtering and Smoothing in Nonlinear and Non-Gaussian Systems Using Conditional Moments

Tronarp

García-Fernández

Särkkä

2018

IEEE Signal Process. Lett.

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Iterative filtering and smoothing in non-linear and non-gaussian systems using conditional moments," IEEE Signal Processing Letters, vol. PP, no. 99, pp. 1-1, 2018 DOI:10.1109/LSP.2018.2794767 Copyright:Copyright 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. Abstract-This letter presents the development of novel iterated filters and smoothers that only require specification of the conditional moments of the dynamic and measurement models. This leads to generalisations of the iterated extended Kalman filter, the iterated extended Kalman smoother, the iterated posterior linearisation filter, and the iterated posterior linearisation smoother. The connections to the previous algorithms are clarified and a convergence analysis is provided. Furthermore, the merits of the proposed algorithms are demonstrated in simulations of the stochastic Ricker map where they are shown to have similar or superior performance to competing algorithms.

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Section: A Prior Workmentioning

confidence: 99%

Section: Iterative Filters and Smoothers Based On Conditional Mommentioning

confidence: 99%

Section: A Filtermentioning

confidence: 99%

“…In a similar manner to [25], [26] a local convergence analysis can be carried out, resulting in Thm. 2.…”

Section: Convergence Analysismentioning

confidence: 99%

Section: Introductionmentioning

confidence: 99%

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Iterative Filtering and Smoothing in Nonlinear and Non-Gaussian Systems Using Conditional Moments

Tronarp

García-Fernández

Särkkä

2018

IEEE Signal Process. Lett.

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Adaptive Iterated Extended KALMAN Filter for Relative Spacecraft Attitude and Position Estimation

Xiong¹,

Wei²

2017

Asian Journal of Control

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This paper presents a novel adaptive iterated extended Kalman filter (AIEKF) for relative position and attitude estimation, taking into account the influence of model uncertainty. Considering a nonlinear stochastic discrete-time system with unknown disturbance, the AIEKF algorithm adopts the Gauss-Newton iterative optimization steps to implement a maximum a posteriori (MAP) estimation, and the switch-mode combination technique is used to achieve the adaptive capability. The mean-square estimation error (MSE) of the state estimate is derived. It is proved that the AIEKF can yield a smaller MSE than that of the traditional extended Kalman filter (EKF) or iterated extended Kalman filter (IEKF). The performance advantage of the AIEKF is illustrated via Monte Carlo simulations on a typical relative position and attitude estimation application. Through comparisons in different scenarios, the presented algorithm is shown to improve adaptability and ensure estimation accuracy.

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A new enabling variational inference model for approximating measurement likelihood in filtering nonlinear system

Wang

Liu

et al. 2021

Intl J Robust & Nonlinear

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This article considers the filtering problem with nonlinear measurements. We propose a new enabling variational inference model for approximating measurement likelihood, which is constructed by a linear Gaussian regression process.The resulting filter is referred to as the new enabling variational inference filter (NEVIF). In variational inference framework, the NEVIF obtains the variational posterior of state by minimizing the Kullback-Leibler divergence between the variational distribution and the true posterior. Then, the accuracy improvement and robustness of the NEVIF compared with the traditional methods are analyzed. Furthermore, an evaluation rule called the filtering evidence lower bound is developed to analyze the estimation accuracy performance of filters.Finally, the efficiency and superiority of the proposed filters compared with some existing filters are shown in numerical simulations.

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Posterior Linearization Filter: Principles and Implementation Using Sigma Points

Cited by 130 publications

References 20 publications

Iterative Filtering and Smoothing in Nonlinear and Non-Gaussian Systems Using Conditional Moments

Iterative Filtering and Smoothing in Nonlinear and Non-Gaussian Systems Using Conditional Moments

Adaptive Iterated Extended KALMAN Filter for Relative Spacecraft Attitude and Position Estimation

A new enabling variational inference model for approximating measurement likelihood in filtering nonlinear system

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