Feedback particle filter on matrix lie groups

Zhang, Chi; Taghvaei, Amirhossein; Mehta, Prashant G.

doi:10.1109/acc.2016.7525330

Cited by 10 publications

(7 citation statements)

References 76 publications

(177 reference statements)

Supporting

Mentioning

Contrasting

Order By: Relevance

“…For sdes on a manifold, it is well known that the Stratonovich form is invariant to coordinate transformations (i.e., intrinsic) while the Ito form is not. A more in-depth discussion of the FPF for Lie groups appears in [30]. Table 5 includes a list of symbols used for the FPF.…”

Section: Remarkmentioning

confidence: 99%

“…In terms of the solution 1 The extension to multi-valued observation is straightforward and appears in [31]. 2 Although this paper is limited to R d , the proposed algorithm is applicable to nonlinear filtering problems on differential manifolds, e.g., matrix Lie groups (For an intrinsic form of the Poisson equation, see [30]). For domains with boundary, the pde is accompanied by a Neumann boundary φ (x) of (10), the gain function at time t is given by…”

Section: Gain Functionmentioning

confidence: 99%

See 1 more Smart Citation

Kalman Filter and Its Modern Extensions for the Continuous-Time Nonlinear Filtering Problem

Taghvaei

Wiljes

Mehta

et al. 2017

Journal of Dynamic Systems, Measurement, and Control

Self Cite

View full text Add to dashboard Cite

This paper is concerned with the filtering problem in continuous-time. Three algorithmic solution approaches for this problem are reviewed: (i) the classical Kalman-Bucy filter which provides an exact solution for the linear Gaussian problem, (ii) the ensemble Kalman-Bucy filter (EnKBF) which is an approximate filter and represents an extension of the Kalman-Bucy filter to nonlinear problems, and (iii) the feedback particle filter (FPF) which represents an extension of the EnKBF and furthermore provides for an consistent solution in the general nonlinear, non-Gaussian case. The common feature of the three algorithms is the gain times error formula to implement the update step (to account for conditioning due to the observations) in the filter. In contrast to the commonly used sequential Monte Carlo methods, the EnKBF and FPF avoid the resampling of the particles in the importance sampling update step. Moreover, the feedback control structure provides for error correction potentially leading to smaller simulation variance and improved stability properties. The paper also discusses the issue of non-uniqueness of the filter update formula and formulates a novel approximation algorithm based on ideas from optimal transport and coupling of measures. Performance of this and other algorithms is illustrated for a numerical example.

show abstract

Section: Remarkmentioning

confidence: 99%

Section: Gain Functionmentioning

confidence: 99%

Kalman Filter and Its Modern Extensions for the Continuous-Time Nonlinear Filtering Problem

Taghvaei

Wiljes

Mehta

et al. 2017

Journal of Dynamic Systems, Measurement, and Control

Self Cite

View full text Add to dashboard Cite

show abstract

“…The feedback particle filter (FPF) [20,21] is one of these, so called, particle flow filters, which is characterized by the modified SDE…”

Section: Problem Formulation and Proposed Ansatzmentioning

confidence: 99%

Interacting particle filters for simultaneous state and parameter estimation

David,

de Wiljes,

Reich

2017

Preprint

View full text Add to dashboard Cite

Simultaneous state and parameter estimation arises from various applicational areas but presents a major computational challenge. Most available Markov chain or sequential Monte Carlo techniques are applicable to relatively low dimensional problems only. Alternative methods, such as the ensemble Kalman filter or other ensemble transform filters have, on the other hand, been successfully applied to high dimensional state estimation problems. In this paper, we propose an extension of these techniques to high dimensional state space models which depend on a few unknown parameters. More specifically, we combine the ensemble Kalman-Bucy filter for the continuous-time filtering problem with a generalized ensemble transform particle filter for intermittent parameter updates. We demonstrate the performance of this two stage update filter for a wave equation with unknown wave velocity parameter.

show abstract

“…The FPF algorithm was originally proposed in the Euclidean setting of R n [42]. In a recent paper from our group, the FPF was extended to filtering on compact matrix Lie groups [45]. The FPF is an intrinsic algorithm: The particle dynamics, expressed in their Stratonovich form, respect the geometric constraints of the manifold.…”

Section: Introductionmentioning

confidence: 99%

Attitude estimation with feedback particle filter

Zhang

Taghvaei

Mehta

2016

2016 IEEE 55th Conference on Decision and Control (CDC)

Self Cite

View full text Add to dashboard Cite

Abstract-This paper presents theory, application, and comparisons of the feedback particle filter (FPF) algorithm for the problem of attitude estimation. The paper builds upon our recent work on the exact FPF solution of the continuous-time nonlinear filtering problem on compact Lie groups. In this paper, the details of the FPF algorithm are presented for the problem of attitude estimation -a nonlinear filtering problem on SO(3). The quaternions are employed for computational purposes. The algorithm requires a numerical solution of the filter gain function, and two methods are applied for this purpose. Comparisons are also provided between the FPF and some popular algorithms for attitude estimation on SO(3), including the invariant EKF, the multiplicative EKF, and the unscented Kalman filter. Simulation results are presented that help illustrate the comparisons.

show abstract

Feedback particle filter on matrix lie groups

Cited by 10 publications

References 76 publications

Kalman Filter and Its Modern Extensions for the Continuous-Time Nonlinear Filtering Problem

Kalman Filter and Its Modern Extensions for the Continuous-Time Nonlinear Filtering Problem

Interacting particle filters for simultaneous state and parameter estimation

Attitude estimation with feedback particle filter

Contact Info

Product

Resources

About