Gaussian and student-t filtering using implicit measurements via variational bayes

Kalman-type filters assume that the measurements are described explicitly as a function of the state. However, the state and measurement may be related implicitly by an equation that could not be solved for the measurement in closed form. We introduce recursive estimators for nonlinear discrete-time state models with implicit measurements in order to overcome such difficulties. Our estimators are based on the Gaussian Filtering model, extending well known nonlinear Kalman-type filters. We further define outlier-robust filters by modeling the implicit measurement equation with a multivariate Student-t distribution. We approximate the posterior distributions of the filter equations via Variational Bayes. Preliminary results with a simulated model validate our filters.

[1]  Yiu Cheung Shiu,et al.  Calibration of wrist-mounted robotic sensors by solving homogeneous transform equations of the form AX=XB , 1989, IEEE Trans. Robotics Autom..

[2]  Simo Särkkä,et al.  Recursive outlier-robust filtering and smoothing for nonlinear systems using the multivariate student-t distribution , 2012, 2012 IEEE International Workshop on Machine Learning for Signal Processing.

[3]  Yuanxin Wu,et al.  A Numerical-Integration Perspective on Gaussian Filters , 2006, IEEE Transactions on Signal Processing.

[4]  Heinrich Niemann,et al.  Calibration-Free Hand-Eye Calibration: A Structure-from-Motion Approach , 2005, DAGM-Symposium.

[5]  Simo Särkkä,et al.  Bayesian Filtering and Smoothing , 2013, Institute of Mathematical Statistics textbooks.

[6]  Radford M. Neal Pattern Recognition and Machine Learning , 2007, Technometrics.

[7]  Olivier Faugeras,et al.  3D Dynamic Scene Analysis: A Stereo Based Approach , 1992 .

[8]  Udo Frese,et al.  Integrating generic sensor fusion algorithms with sound state representations through encapsulation of manifolds , 2011, Inf. Fusion.

[9]  Olivier Faugeras,et al.  3D Dynamic Scene Analysis , 1992 .

[10]  Robert Piche Robust Multivariate Linear Regression Using the Student-t Distribution , 2011 .

[11]  O. Faugeras Three-dimensional computer vision: a geometric viewpoint , 1993 .

[12]  Simo Särkkä,et al.  Non-linear noise adaptive Kalman filtering via variational Bayes , 2013, 2013 IEEE International Workshop on Machine Learning for Signal Processing (MLSP).

[13]  George Eastman House,et al.  Sparse Bayesian Learning and the Relevan e Ve tor Ma hine , 2001 .