A fast two-stage active contour model for intensity inhomogeneous image segmentation

This paper presents a fast two-stage image segmentation method for intensity inhomogeneous image using an energy function based on a local region-based active contour model with exponential family. In the first stage, we preliminary segment the down-sampled images by the local correntropy-based K-means clustering model with exponential family, which can fast obtain a coarse result with low computational complexity. Subsequently, by taking the up-sampled contour of the first stage as initialization, we precisely segment the original images by the improved local correntropy-based K-means clustering model with exponential family in the second stage. This stage can achieve accurate result rapidly as the result of the proper initialization. Meanwhile, we converge the energy function of two-stage by the Riemannian steepest descent method. Comparing with other statistical numerically methods, which are used to solve the partial differential equations(PDEs), this method can obtain the global minima with less iterations. Moreover, to promote regularity of energy function, we use a popular regular method which is an inner product and applies spatial smoothing to the gradient flow. Extensive experiments on synthetic and real images demonstrate that the proposed method is more efficient than the other state-of-art methods on intensity inhomogeneous images.

[1]  Sim Heng Ong,et al.  Integrating spatial fuzzy clustering with level set methods for automated medical image segmentation , 2011, Comput. Biol. Medicine.

[2]  Tony F. Chan,et al.  Active contours without edges , 2001, IEEE Trans. Image Process..

[3]  Frank Nielsen,et al.  Entropies and cross-entropies of exponential families , 2010, 2010 IEEE International Conference on Image Processing.

[4]  Xavier Bresson,et al.  Fast Global Minimization of the Active Contour/Snake Model , 2007, Journal of Mathematical Imaging and Vision.

[5]  Jerry L. Prince,et al.  Snakes, shapes, and gradient vector flow , 1998, IEEE Trans. Image Process..

[6]  Rick Chartrand,et al.  A Faster-converging Algorithm for Image Segmentation with a Modified Chan-Vese Model , 2007, IPCV.

[7]  Engin Mendi,et al.  Quasi-Newton Minimization for Active Contours with Chan-Vese Model , 2009, IPCV.

[8]  Chunming Li,et al.  Minimization of Region-Scalable Fitting Energy for Image Segmentation , 2008, IEEE Transactions on Image Processing.

[9]  Amar Mitiche,et al.  Unsupervised Variational Image Segmentation/Classification Using a Weibull Observation Model , 2006, IEEE Transactions on Image Processing.

[10]  Hadj Batatia,et al.  Exploiting Information Geometry to Improve the Convergence Properties of Variational Active Contours , 2013, IEEE Journal of Selected Topics in Signal Processing.

[11]  Mila Nikolova,et al.  Algorithms for Finding Global Minimizers of Image Segmentation and Denoising Models , 2006, SIAM J. Appl. Math..

[12]  C. Lamberti,et al.  Maximum likelihood segmentation of ultrasound images with Rayleigh distribution , 2005, IEEE Transactions on Ultrasonics, Ferroelectrics and Frequency Control.

[13]  M. García,et al.  Active contours driven by local and global fitted image models for image segmentation robust to intensity inhomogeneity , 2017, PloS one.

[14]  Z.J. Koles,et al.  Medical Image Segmentation: Methods and Software , 2007, 2007 Joint Meeting of the 6th International Symposium on Noninvasive Functional Source Imaging of the Brain and Heart and the International Conference on Functional Biomedical Imaging.

[15]  Asad Munir,et al.  Hybrid two-stage active contour method with region and edge information for intensity inhomogeneous image segmentation , 2018, PloS one.

[16]  Guillermo Sapiro,et al.  New Possibilities with Sobolev Active Contours , 2007, International Journal of Computer Vision.

[17]  Lei Zhang,et al.  Active contours driven by local image fitting energy , 2010, Pattern Recognit..

[18]  Chunhong Pan,et al.  Robust level set image segmentation via a local correntropy-based K-means clustering , 2014, Pattern Recognit..

[19]  Demetri Terzopoulos,et al.  Snakes: Active contour models , 2004, International Journal of Computer Vision.

[20]  Amar Mitiche,et al.  Multiregion level-set partitioning of synthetic aperture radar images , 2005, IEEE Transactions on Pattern Analysis and Machine Intelligence.

[21]  Lei Zhang,et al.  Fast Compressive Tracking , 2014, IEEE Transactions on Pattern Analysis and Machine Intelligence.

[22]  Anthony J. Yezzi,et al.  Gradient flows and geometric active contour models , 1995, Proceedings of IEEE International Conference on Computer Vision.

[23]  Laurent D. Cohen,et al.  On active contour models and balloons , 1991, CVGIP Image Underst..

[24]  Shun-ichi Amari,et al.  Differential-geometrical methods in statistics , 1985 .

[25]  Shun-ichi Amari,et al.  Why natural gradient? , 1998, Proceedings of the 1998 IEEE International Conference on Acoustics, Speech and Signal Processing, ICASSP '98 (Cat. No.98CH36181).

[26]  Elsevier Sdol,et al.  Journal of Visual Communication and Image Representation , 2009 .

[27]  Guillermo Sapiro,et al.  Generalized Newton-Type Methods for Energy Formulations in Image Processing , 2009, SIAM J. Imaging Sci..

[28]  Baba C. Vemuri,et al.  Shape Modeling with Front Propagation: A Level Set Approach , 1995, IEEE Trans. Pattern Anal. Mach. Intell..

[29]  Ke Chen,et al.  On Two Multigrid Algorithms for Modeling Variational Multiphase Image Segmentation , 2009, IEEE Transactions on Image Processing.

[30]  Bodo Rosenhahn,et al.  Analysis of Numerical Methods for Level Set Based Image Segmentation , 2009, ISVC.

[31]  Sim Heng Ong,et al.  Integrating machine learning with region-based active contour models in medical image segmentation , 2017, J. Vis. Commun. Image Represent..

[32]  Jitao Wu,et al.  Fast two-stage segmentation via non-local active contours in multiscale texture feature space , 2013, Pattern Recognit. Lett..

[33]  Hadj Batatia,et al.  Exploiting Information Geometry to Improve the Convergence of Nonparametric Active Contours , 2013, IEEE Transactions on Image Processing.

[34]  Mohamed-Jalal Fadili,et al.  Region-Based Active Contours with Exponential Family Observations , 2009, Journal of Mathematical Imaging and Vision.

[35]  Yangyang Song,et al.  Fast two-stage segmentation based on local correntropy-based K-means clustering , 2017, 2017 IEEE 9th International Conference on Communication Software and Networks (ICCSN).