Adaptive Gating in Gaussian Bayesian Multi-Target Tracking. (MA-L4)

Author(s) : Auguste Genovesio (Institut Pasteur - Quantitative Image Analysis, France) Ziad Belhassine (Institut Pasteur - Quantitative Image Analysis, France) Jean-Christophe Olivo-Marin (Institut Pasteur - Quantitative Image Analysis, France)

Abstract : Bayesian target tracking methods consist in filtering successive measurements coming from a detector. Linear and non-linear Gaussian Bayesian filters are well adapted to estimate the successive {\it a posteriori} state distributions of a single moving target from a sequence of observations. However, when tracking several targets in a cluttered environment the previous techniques must be combined with dedicated procedures for validating and associating the measurements to their predictions. Gating validation techniques are used to increase reliability of the association technique by retaining only the measurements that could be originated from predicted measurements. In standard techniques, the only constrain imposed on the gate is to contain the correct measurement. However, as the shape of the validation gate is related to the covariance of the transition noise, it is of major importance to estimate it in a reliable manner. In this paper, we therefore review several methods to update the covariance of transition noise and we propose a new one that enables the validation gate to be adapted both to the smoothly evolving dynamic of a moving target and to an abruptly changing dynamic. All the methods are compared for performance on microscopy image sequences which typically contain objects that abruptly change their behaviors.

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