Marginalized particle filters for Bayesian estimation of Gaussian noise parameters

The particle filter provides a general solution to the nonlinear filtering problem with arbitrarily accuracy. However, the curse of dimensionality prevents its application in cases where the state dimensionality is high. Further, estimation of stationary parameters is a known challenge in a particle filter framework. We suggest a marginalization approach for the case of unknown noise distribution parameters that avoid both aforementioned problem. First, the standard approach of augmenting the state vector with sensor offsets and scale factors is avoided, so the state dimension is not increased. Second, the mean and covariance of both process and measurement noises are represented with parametric distributions, whose statistics are updated adaptively and analytically using the concept of conjugate prior distributions. The resulting marginalized particle filter is applied to and illustrated with a standard example from literature.

[1]  Geir Storvik,et al.  Particle filters for state-space models with the presence of unknown static parameters , 2002, IEEE Trans. Signal Process..

[2]  Michael A. West,et al.  Combined Parameter and State Estimation in Simulation-Based Filtering , 2001, Sequential Monte Carlo Methods in Practice.

[3]  Simo Särkkä,et al.  Recursive Noise Adaptive Kalman Filtering by Variational Bayesian Approximations , 2009, IEEE Transactions on Automatic Control.

[4]  Y. Bar-Shalom,et al.  A recursive multiple model approach to noise identification , 1994 .

[5]  Dan Simon,et al.  Kalman Filtering with Uncertain Noise Covariances , 2004 .

[6]  Thomas B. Schön,et al.  Marginalized particle filters for mixed linear/nonlinear state-space models , 2005, IEEE Transactions on Signal Processing.

[7]  Joris De Schutter,et al.  Adaptive Kalman filter for noise identification , 2000 .

[8]  R. Mehra On the identification of variances and adaptive Kalman filtering , 1970 .

[9]  R. E. Maine,et al.  Formulation and implementation of a practical algorithm for parameter estimation with process and measurement noise , 1980 .

[10]  Aaas News,et al.  Book Reviews , 1893, Buffalo Medical and Surgical Journal.

[11]  Quan Pan,et al.  A finite-horizon adaptive Kalman filter for linear systems with unknown disturbances , 2004, Signal Process..

[12]  B. Tapley,et al.  Adaptive sequential estimation with unknown noise statistics , 1976 .

[13]  Petar M. Djuric,et al.  Sequential particle filtering in the presence of additive Gaussian noise with unknown parameters , 2002, 2002 IEEE International Conference on Acoustics, Speech, and Signal Processing.

[14]  David B. Dunson,et al.  Bayesian Data Analysis , 2010 .

[15]  Neil Genzlinger A. and Q , 2006 .

[16]  Marcelo G. S. Bruno,et al.  Bayesian blind equalization of time-varying frequency-selective channels subject to unknown variance noise , 2008, 2008 IEEE International Conference on Acoustics, Speech and Signal Processing.