Robust image segmentation using local robust statistics and correntropy-based K-means clustering

Abstract It is an important work to segment the real world images with intensity inhomogeneity such as magnetic resonance (MR) and computer tomography (CT) images. In practice, such images are often polluted by noise which make them difficult to be segmented by traditional level set based segmentation models. In this paper, we propose a robust level set image segmentation model combining local with global fitting energies to segment noised images. In the proposed model, the local fitting energy is based on the local robust statistics (LRS) information of an input image, which can efficiently reduce the effects of the noise, and the global fitting energy utilizes the correntropy-based K-means (CK) method, which can adaptively emphasize the samples that are close to their corresponding cluster centers. By integrating the advantages of global information and local robust statistics characteristics, the proposed model can efficiently segment images with intensity inhomogeneity and noise. Then, a level set regularization term is used to avoid re-initialization procedures in the process of curve evolution. In addition, the Gaussian filter is utilized to keep the level set smoothing in the curve evolution process. The proposed model first appeared as a two-phase model and then extended to a multi-phase one. Experimental results show the advantages of our model in terms of accuracy and robustness to the noise. In particular, our method has been applied on some synthetic and real images with desirable results.

[1]  Denis Friboulet,et al.  Compactly Supported Radial Basis Functions Based Collocation Method for Level-Set Evolution in Image Segmentation , 2007, IEEE Transactions on Image Processing.

[2]  Xiaofeng Wang,et al.  An efficient local Chan-Vese model for image segmentation , 2010, Pattern Recognit..

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

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

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

[6]  V. Caselles,et al.  A geometric model for active contours in image processing , 1993 .

[7]  ZhouWengang,et al.  Active contours with selective local or global segmentation , 2010 .

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

[9]  Liang Xiao,et al.  Active contour model for simultaneous MR image segmentation and denoising , 2013, Digit. Signal Process..

[10]  Chunming Li,et al.  Active contours driven by local Gaussian distribution fitting energy , 2009, Signal Process..

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

[12]  Aijun Zhang,et al.  A robust level set method based on local statistical information for noisy image segmentation , 2014 .

[13]  C VemuriBaba,et al.  Shape Modeling with Front Propagation , 1995 .

[14]  Tony F. Chan,et al.  A Multiphase Level Set Framework for Image Segmentation Using the Mumford and Shah Model , 2002, International Journal of Computer Vision.

[15]  Rachid Deriche,et al.  Geodesic Active Regions and Level Set Methods for Supervised Texture Segmentation , 2002, International Journal of Computer Vision.

[16]  Ron Kikinis,et al.  Simultaneous Multi-object Segmentation Using Local Robust Statistics and Contour Interaction , 2010, MCV.

[17]  Chunming Li,et al.  Computerized Medical Imaging and Graphics Active Contours Driven by Local and Global Intensity Fitting Energy with Application to Brain Mr Image Segmentation , 2022 .

[18]  Ying Li,et al.  A novel active contour model for image segmentation using distance regularization term , 2013, Comput. Math. Appl..

[19]  Bostjan Likar,et al.  A Review of Methods for Correction of Intensity Inhomogeneity in MRI , 2007, IEEE Transactions on Medical Imaging.

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

[21]  Chunming Li,et al.  A Level Set Method for Image Segmentation in the Presence of Intensity Inhomogeneities With Application to MRI , 2011, IEEE Transactions on Image Processing.

[22]  Jinwei Wang,et al.  A new level set method for inhomogeneous image segmentation , 2013, Image Vis. Comput..

[23]  Lei Zhang,et al.  Active contours with selective local or global segmentation: A new formulation and level set method , 2010, Image Vis. Comput..

[24]  Chunming Li,et al.  Distance Regularized Level Set Evolution and Its Application to Image Segmentation , 2010, IEEE Transactions on Image Processing.

[25]  Weifeng Liu,et al.  Correntropy: Properties and Applications in Non-Gaussian Signal Processing , 2007, IEEE Transactions on Signal Processing.

[26]  Shigang Liu,et al.  A local region-based Chan-Vese model for image segmentation , 2012, Pattern Recognit..

[27]  Guillermo Sapiro,et al.  Geodesic Active Contours , 1995, International Journal of Computer Vision.

[28]  J. Sethian,et al.  Fronts propagating with curvature-dependent speed: algorithms based on Hamilton-Jacobi formulations , 1988 .

[29]  W. D. Evans,et al.  PARTIAL DIFFERENTIAL EQUATIONS , 1941 .

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

[31]  D. Mumford,et al.  Optimal approximations by piecewise smooth functions and associated variational problems , 1989 .

[32]  Tien D. Bui,et al.  Image segmentation and selective smoothing by using Mumford-Shah model , 2005, IEEE Transactions on Image Processing.

[33]  Xavier Bresson,et al.  Completely Convex Formulation of the Chan-Vese Image Segmentation Model , 2012, International Journal of Computer Vision.

[34]  Kaleem Siddiqi,et al.  Flux Maximizing Geometric Flows , 2002, IEEE Trans. Pattern Anal. Mach. Intell..

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

[36]  Li Zeng,et al.  Segmentation of computer tomography image using local robust statistics and region-scalable fitting. , 2012, Journal of X-ray science and technology.

[37]  Chunming Li,et al.  Level set evolution without re-initialization: a new variational formulation , 2005, 2005 IEEE Computer Society Conference on Computer Vision and Pattern Recognition (CVPR'05).

[38]  Allen R. Tannenbaum,et al.  Localizing Region-Based Active Contours , 2008, IEEE Transactions on Image Processing.

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

[40]  Anthony J. Yezzi,et al.  Curve evolution implementation of the Mumford-Shah functional for image segmentation, denoising, interpolation, and magnification , 2001, IEEE Trans. Image Process..

[41]  Li Zeng,et al.  3D robust Chan–Vese model for industrial computed tomography volume data segmentation , 2013 .

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

[43]  Chunhong Pan,et al.  Medical Image Segmentation Based on Novel Local Order Energy , 2010, ACCV.

[44]  Ching Y. Suen,et al.  Iris segmentation using variational level set method , 2011 .

[45]  Liang Xiao,et al.  An active contour model driven by anisotropic region fitting energy for image segmentation , 2013, Digit. Signal Process..

[46]  S. Osher,et al.  A level set approach for computing solutions to incompressible two-phase flow , 1994 .

[47]  Chunming Li,et al.  Implicit Active Contours Driven by Local Binary Fitting Energy , 2007, 2007 IEEE Conference on Computer Vision and Pattern Recognition.