A Reversible Jump MCMC Sampler for Object Detection in Image Processing

Ortner, Mathias; Descombes, Xavier; Zerubia, Josiane

doi:10.1007/3-540-31186-6_23

A Reversible Jump MCMC Sampler for Object Detection in Image Processing

Mathias Ortner³,
Xavier Descombes³ &
Josiane Zerubia³

Conference paper

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Summary

To detect an unknown number of objects from high resolution images, we use spatial point processes models. The method is adapted to our image processing applications since it describes images as realizations of a point process whose points represent geometrical objects. We consider models made of two parts: a data term which quantifies the relevance of a set of objects with respect to the image and a prior term, containing strong geometrical interactions between objects. We use the Maximum A Posteriori estimator, which is obtained by combining a reversible Markov chain monte carlo (RJMCMC) point process sampler with a simulated annealing procedure. The quality of the results and the speed of the algorithm strongly depend on the used sampler. We present here an adaptation of Geyer-Møller sampler for point processes and show that the resulting Markov Chain keeps the required convergence properties. In particular, we design an updating scheme which allows the generation of points in the neighborhood of some others, and check the relevance of such moves on a toy example. We present experimental results on the difficult problem of the detection of buildings in a Digital Elevation Model of a dense urban area.

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References

A. Baddeley and M.N.M. Van Lieshout. Stochastic geometry models in highlevel vision. Statistics and Images, 1:233–258, 1993.
Google Scholar
J. Besag. On the statistical analysis of dirty pictures. Journal of Royal Statistic Society, B(68):259–302, 1986.
MATH MathSciNet Google Scholar
X. Descombes, F. Kruggel, G. Wollny, and H.J. Gertz. An object based approach for detecting small brain lesions: application to virchow-robin spaces. IEEE Transactions on Medical Imaging 23(2):246–255, feb 2004.
Article Google Scholar
C.J. Geyer. Likehood inference for spatial point processes. In O.E. Banorff-Nielsen, W.S Kendall, and M.N.M. Van Lieshout, editors, Stochastic Geometry Likehood and computation. Chapman and Hall, 1999.
Google Scholar
C.J. Geyer and J. Møller. Simulation and likehood inference for spatial point processes. Scandinavian Journal of Statistics, Series B, 21:359–373, 1994.
Google Scholar
P.J. Green. Reversible jump Markov chain Monte-Carlo computation and Bayesian model determination. Biometrika, 57:97–109, 1995.
Google Scholar
C. Lacoste, X. Descombes, and J. Zerubia. A comparative study of point processes for line network extraction in remote sensing. INRIA Research Report 4516, 2002.
Google Scholar
S. P. Meyn and R.L. Tweedie. Markov Chains and Stochastic Stability. Springer-Verlag, London, 1993.
Google Scholar
M. Ortner, X. Descombes, and J. Zerubia. Automatic 3D land register extraction from altimetric data in dense urban areas. INRIA Research Report 4919, August 2003.
Google Scholar
M. Ortner, X. Descombes, and J. Zerubia. Improved RJMCMC point process sampler for object detection by simulated annealing. INRIA Research Report 4900, August 2003.
Google Scholar
A. Pievatolo and P.J. Green. Boundary detection through dynamic polygons. Journal of the Royal Statistical Society, B(60):609–626, 1998.
MathSciNet Google Scholar
H. Rue and M. Hurn. Bayesian object identification. Biometrika, 3:649–660, 1999.
Article MathSciNet Google Scholar
R. Stoica, X. Descombes, and J. Zerubia. A gibbs point process for road extraction from remotely sensed images. Int. Journal on Computer Vision, 37(2):121–136, 2004.
Article Google Scholar
M.N.M. Van Lieshout. Markov Point Processes and their Applications. Imperial College Press, London, 2000.
Google Scholar

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Authors and Affiliations

Ariana Research Group (INRIA/I3S), INRIA, 2004 route des Lucioles BP 93, 06902, Sophia Antipolis Cedex, France
Mathias Ortner, Xavier Descombes & Josiane Zerubia

Authors

Mathias Ortner
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Xavier Descombes
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Josiane Zerubia
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Editors and Affiliations

Department of Mathematics, National University of Singapore, 2 Science Drive 2, Singapore, 117543, Republic of Singapore
Harald Niederreiter
INRIA Sophia Antipolis, route des lucioles 2004, 06902, Sophia Antipolis Cedex, France
Denis Talay

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Ortner, M., Descombes, X., Zerubia, J. (2006). A Reversible Jump MCMC Sampler for Object Detection in Image Processing. In: Niederreiter, H., Talay, D. (eds) Monte Carlo and Quasi-Monte Carlo Methods 2004. Springer, Berlin, Heidelberg. https://doi.org/10.1007/3-540-31186-6_23

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DOI: https://doi.org/10.1007/3-540-31186-6_23
Publisher Name: Springer, Berlin, Heidelberg
Print ISBN: 978-3-540-25541-3
Online ISBN: 978-3-540-31186-7
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