Maintaining multimodality through mixture tracking

In recent years particle filters have become a tremendously popular tool to perform tracking for nonlinear and/or nonGaussian models. This is due to their simplicity, generality and success over a wide range of challenging applications. Particle filters, and Monte Carlo methods in general, are however poor at consistently maintaining the multimodality of the target distributions that may arise due to ambiguity or the presence of multiple objects. To address this shortcoming this paper proposes to model the target distribution as a nonparametric mixture model, and presents the general tracking recursion in this case. It is shown how a Monte Carlo implementation of the general recursion leads to a mixture of particle filters that interact only in the computation of the mixture weights, thus leading to an efficient numerical algorithm, where all the results pertaining to standard particle filters apply. The ability of the new method to maintain posterior multimodality is illustrated on a synthetic example and a real world tracking problem involving the tracking of football players in a video sequence.

[1]  G. G. Stokes "J." , 1890, The New Yale Book of Quotations.

[2]  Petros G. Voulgaris,et al.  On optimal ℓ∞ to ℓ∞ filtering , 1995, Autom..

[3]  Simon J. Godsill,et al.  On sequential Monte Carlo sampling methods for Bayesian filtering , 2000, Stat. Comput..

[4]  A. Murat Tekalp,et al.  Tracking multiple objects in the presence of articulated and occluded motion , 2000, Proceedings Workshop on Human Motion.

[5]  Neil J. Gordon,et al.  Editors: Sequential Monte Carlo Methods in Practice , 2001 .

[6]  Thia Kirubarajan,et al.  Estimation with Applications to Tracking and Navigation: Theory, Algorithms and Software , 2001 .

[7]  Radek Grzeszczuk,et al.  A data-driven model for monocular face tracking , 2001, Proceedings Eighth IEEE International Conference on Computer Vision. ICCV 2001.

[8]  C. Rasmussen,et al.  Joint likelihood methods for mitigating visual tracking disturbances , 2001, Proceedings 2001 IEEE Workshop on Multi-Object Tracking.

[9]  Nando de Freitas,et al.  Sequential Monte Carlo Methods in Practice , 2001, Statistics for Engineering and Information Science.

[10]  Michael Isard,et al.  BraMBLe: a Bayesian multiple-blob tracker , 2001, Proceedings Eighth IEEE International Conference on Computer Vision. ICCV 2001.

[11]  Wolfram Burgard,et al.  Robust Monte Carlo localization for mobile robots , 2001, Artif. Intell..

[12]  P. Pérez,et al.  Tracking multiple objects with particle filtering , 2002 .

[13]  Javier Nicolás Sánchez,et al.  Robust global localization using clustered particle filtering , 2002, AAAI/IAAI.

[14]  Patrick Pérez,et al.  Color-Based Probabilistic Tracking , 2002, ECCV.