Title :
Bayesian Estimation With Distance Bounds
Author :
Zachariah, Dave ; Skog, Isaac ; Jansson, Magnus ; Händel, Peter
Author_Institution :
ACCESS Linnaeus Centre, KTH R. Inst. of Technol., Stockholm, Sweden
Abstract :
We consider the problem of estimating a random state vector when there is information about the maximum distances between its subvectors. The estimation problem is posed in a Bayesian framework in which the minimum mean square error (MMSE) estimate of the state is given by the conditional mean. Since finding the conditional mean requires multidimensional integration, an approximate MMSE estimator is proposed. The performance of the proposed estimator is evaluated in a positioning problem. Finally, the application of the estimator in inequality constrained recursive filtering is illustrated by applying the estimator to a dead-reckoning problem. The MSE of the estimator is compared with two related posterior Cramér-Rao bounds.
Keywords :
Bayes methods; least mean squares methods; recursive filters; Bayesian estimation; Bayesian framework; approximate MMSE estimator; conditional mean; dead-reckoning problem; distance bounds; inequality constrained recursive filtering; minimum mean square error estimate; multidimensional integration; positioning problem; posterior Cramer-Rao bounds; random state vector; Approximation methods; Bayesian methods; Covariance matrix; Estimation; Mean square error methods; Probability density function; Vectors; Bayesian estimation; distance; positioning; tracking;
Journal_Title :
Signal Processing Letters, IEEE
DOI :
10.1109/LSP.2012.2224865
