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Coefficient of Variation Based Image Selective Segmentation Model Using Active Contours

Published online by Cambridge University Press:  28 May 2015

Noor Badshah ,
Ke Chen ,
Haider Ali  and
Ghulam Murtaza
Noor Badshah*
Affiliation:
Department of Basic Sciences, UET Peshawar, Pakistan
Ke Chen*
Affiliation:
Centre for Mathematical Imaging Techniques and Department of Mathematical Sciences, The University of Liverpool, United Kingdom
Haider Ali
Affiliation:
Department of Basic Sciences, UET Peshawar, Pakistan
Ghulam Murtaza
Affiliation:
Department of Basic Sciences, UET Peshawar, Pakistan
*
Corresponding author. Email: [email protected]
Corresponding author. Email: [email protected]
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Abstract

Most image segmentation techniques efficiently segment images with prominent edges, but are less efficient for some images with low frequencies and overlapping regions of homogeneous intensities. A recently proposed selective segmentation model often works well, but not for such challenging images. In this paper, we introduce a new model using the coefficient of variation as a fidelity term, and our test results show it performs much better in these challenging cases.

Keywords

68U1062G30SegmentationCoefficient of Variation (CoV)level setfunctional minimisiationTotal Variation (TV)
Type
Research Article
Information
East Asian Journal on Applied Mathematics , Volume 2 , Issue 2 , May 2012 , pp. 150 - 169
Copyright
Copyright © Global-Science Press 2012

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References

[1]Ahmed, S. E.. A pooling methodology for coefficient of variation. Sankhya: The Indian Journal of Statistics, 57(B1):5775, 1995.Google Scholar
[2]Adams, R. and Bischof, L.. Seeded region growing. IEEE Transactions on Pattern Analysis and Machine Intelligence, 16(6):641647, 1994.Google Scholar
[3]Badshah, N. and Chen, K.. Image selective segmentation under geometrical constraints using an active contour approach. Mathematics of Computation, 7:759778, 2010.Google Scholar
[4]Barash, D. and Kimmel, R. An accurate operator splitting scheme for nonlinear diffusion filtering. HP Laboratories Israel1 HPL-2000-48(R.1) August 1st, 2000Google Scholar
[5]Caselles, V., Kimmel, R., and Sapiro, G.. Geodesic active contours. International Jornal of Computervision, 22(1):6179, 1997.Google Scholar
[6]Chan, T. F. and Vese, L. A.. Active contours without edges. IEEE Transactions on Image Processing, 10(2):266277, 2001.CrossRefGoogle ScholarPubMed
[7]Chen, K.. Matrix Preconditioning Techniques and Applications. Cambridge University Press, 2005.Google Scholar
[8]Cohen, L. D.. On active contour models and balloons. Computer Vision, Graphics, and Image Processing: Image Understanding, 53(2):211218, 1991.Google Scholar
[9]Douglas, J. and Rachford, H. H.. On the numerical solution of heat conduction problems in two and three space variables. Transactions of the American Mathematical Society, 82:421439, 1956.CrossRefGoogle Scholar
[10]Gout, C., Guyader, C. L., and Vese, L. A.. Segmentation under geometrical conditions with geodesic active contour and interpolation using level set method. Numerical Algorithms, 39:155173, 2005.CrossRefGoogle Scholar
[11]Guyader, C. L. and Gout, C.. Geodesic active contour under geometrical conditions theory and 3D applications. Numerical Algorithms, 48:105133, 2008.Google Scholar
[12]Jeon, M., Alexander, M., Pedrycz, W., and Pizzi, N.. Unsupervised hierarchical image segmentation with level set and additive operator splitting. Pattern Recognition Letters, 26(10):14611469, 2005.CrossRefGoogle Scholar
[13]Kass, M., Witkin, A., and Terzopoulos, D.. Snakes: Active contours models. International Jornal of Computer Vision, 1:321331, 1988.Google Scholar
[14]Leclerc, Y.. Region growing using the MDL principle. In: DARPA Image Understanding Workshop, 1990.Google Scholar
[15]Li, Y. B. and Kim, J. S.. Multiphase image segmentation using a phase-field model. Computers and Mathematics with Applications, 62:737745, 2011.Google Scholar
[16]Lu, T., Neittaanmaki, P., and Tai, X. C.. A parallel splitting up method and its application to Navier-Stokes equations. Applied Mathematics Letters, 4(2):2529, 1991.Google Scholar
[17]Mora, M., Tauber, C., and Batatia, H.. Robust level set for heart cavities detection in ultrasound images. Computers in Cardiology, 32:235238, 2005.Google Scholar
[18]Mumford, D. and Shah, J.. Optimal approximation by piecewise smooth functions and associated variational problems. Communications on Pure Applied Mathematics, 42:577685, 1989.CrossRefGoogle Scholar
[19]Osher, S. and Fedkiw, R.. Level Set Methods and Dynamic Implicit Surfaces, Springer Verlag, 2003.CrossRefGoogle Scholar
[20]Osher, S. and Sethian, J. A.. Fronts propagating with curvature-dependent speed: Algorithms based on Hamilton-Jacobi formulations. Journal of Computational Physics, 79(1):1249, 1988.Google Scholar
[21]Schulze, M. A. and Wu, Q. X.. Nonlinear edge-preserving smoothing of synthetic aperture radar images. Proceedings of the New Zealand Image and Vision Computing '95 Workshop, pp. 6570, 1995.Google Scholar
[22]Sethian, J. A.. Level Set Methods and Fast Marching Methods: Evolving Interfaces in Computational Geometry, Fluid Mechanics, Computer Vision and Material Science, Cambridge University Press, 1999.Google Scholar
[23]Vese, L. A. and Chan, T. F.. A multiphase level set framework for image segmentation using the Mumford and Shah model. International Journal of Computer Vision, 50(3):271293, 2002.Google Scholar
[24]Vincent, L. and Soille, P. Watersheds in digital spaces – An efficient algorithm based on immersion. IEEE Transactions Pattern Analysis and Machine Learning, 13(6):583598, 1994.Google Scholar
[25]Weickert, J., Romeny, B. M. T. H., and Viergever, M. A.. Efficient and reliable schemes for nonlinear diffusion filtering. IEEE Transactions On Image Processing, 7:398410, 1998.Google Scholar
[26]Weickert, J. and Kühne, G.. Fast methods for implicit active contours models. Geometric Level Set Methods in Imaging, Vision, and Graphics, Part II, 4357, 2003.Google Scholar
[27]Yu, Y. and Acton, S. T.. Edge detection in ultrasound imagery using the instantaneous coefficient of variation. IEEE Transactions On Image Processing, 13(12):16401655, 2004.Google Scholar