Title :
Efficient Bingham filtering based on saddlepoint approximations
Author :
Gilitschenski, Igor ; Kurz, Gerhard ; Julier, Simon J. ; Hanebeck, Uwe D.
Author_Institution :
Inst. for Anthropomatics & Robot., Karlsruhe Inst. of Technol. (KIT), Karlsruhe, Germany
Abstract :
In this paper, we address the problem of developing computationally efficient recursive estimators on the periodic domain of orientations using the Bingham distribution. The Bingham distribution is defined directly on the unit hypersphere. As such, it is able to describe both large and small uncertainties in a unified framework. In order to tackle the challenging computation of the normalization constant, we propose a method using its saddlepoint approximations and an approximate MLE based on the Gauss-Newton method. In a set of simulation experiments, we demonstrate that the Bingham filter not only outperforms both Kalman and particle filters, but can also be implemented efficiently.
Keywords :
Kalman filters; approximation theory; particle filtering (numerical methods); Bingham distribution; Bingham filtering; Gauss-Newton method; Kalman filters; hypersphere; normalization constant; particle filters; periodic domain; recursive estimators; saddlepoint approximations; Approximation methods; Kalman filters; Maximum likelihood estimation; Parameter estimation; Uncertainty; Vectors; Bingham distribution; directional statistics; maximum likelihood estimation; moment matching;
Conference_Titel :
Multisensor Fusion and Information Integration for Intelligent Systems (MFI), 2014 International Conference on
Conference_Location :
Beijing
Print_ISBN :
978-1-4799-6731-5
DOI :
10.1109/MFI.2014.6997734
