Adaptive Kalman filtering with time-varying colored measurement noise by variational Bayesian learning

被引：0

作者：

Xu, Ding-Jie ^{[1
]}

Shen, Chen ^{[1
]}

Shen, Feng ^{[1
]}

机构：

[1] College of Automation, Harbin Engineering University

来源：

Dianzi Yu Xinxi Xuebao/Journal of Electronics and Information Technology | 2013年 / 35卷 / 07期

关键词：

Adaptive filtering; Kalman filtering; Parameters estimation; Signal processing; Variational Bayesian learning;

D O I：

10.3724/SP.J.1146.2012.01457

中图分类号：

学科分类号：

摘要：

An adaptive Kalman filtering algorithm based on variational Bayesian learning is suggested to cope with the problem in which colored and time-varying measurement noise is introduced. By use of differencing, the model is converted back to a normal model in which measurement noise is white but correlated with process noise. Kalman filtering is modified owing to the correlation and variational Bayesian learning is combined to jointly estimate the measurement noise and the state in a recursive manner. The simulation results demonstrate that this adaptive algorithm is capable of tracking time-varying noise and provides more accurate state estimation than standard Kalman filtering with colored and time-varying noise.

引用

页码：1593 / 1598

页数：5

共 13 条

[1] Fu M.-Y., Deng Z.-H., Yan L.-P., Kalman Filtering Theory and Its Applications in Navigation System, pp. 58-61, (2010)
[2] Mehra R., Approaches to adaptive filtering, IEEE Transactions on Automatic Control, 17, 5, pp. 693-698, (1972)
[3] Beal M.J., Variational algorithms for approximate Bayesian inference, (2003)
[4] Andrieu C., Doucet A., Holenstein R., Particle Markov chain Monte Carlo methods, Journal of the Royal Statistical Society, 72, 3, pp. 269-342, (2010)
[5] Lawrence N.D., Bishop C.M., Variational Bayesian independent component analysis, (2000)
[6] Huang Q.-H., Yang J., Zhou Y., Variational Bayesian method for speech enhancement, Neurocomputing, 70, 16-18, pp. 3063-3067, (2007)
[7] Sun S.-J., Peng C.-L., Hou W.-S., Et al., Blind source separation with time series variational Bayes expectation maximization algorithm, Digital Signal Processing, 22, 1, pp. 17-33, (2012)
[8] Vrettas M.D., Cornford D., Opper M., Estimating parameters in stochastic systems: A variational Bayesian approach, Physica D, 240, 23, pp. 1877-1900, (2011)
[9] Sarkka S., Nummenmaa A., Recursive noise adaptive Kalman filtering by variational Bayesian approximations, IEEE Transactions on Automatic Control, 54, 3, pp. 596-600, (2009)
[10] Ait-El-Fquih B., Rodet T., Variational Bayesian Kalman filtering in dynamical tomography, IEEE International Conference on Acoustics, Speech, and Signal Processing, pp. 4004-4007, (2011)

← 1 2 →